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VOD in Math
Total : 2173
Visitors : 428868
2010Non-archimedean dynamics in dimension one 1 - Rob Benedetto Associate Professor(Amherst College) 0000-00-00
Non-archimedean dynamics in dimension one 2 - Rob Benedetto Associate Professor(Amherst College) 0000-00-00
Non-archimedean dynamics in dimension one 3 - Rob Benedetto Associate Professor(Amherst College) 0000-00-00
Non-archimedean dynamics in dimension one 4 - Rob Benedetto Associate Professor(Amherst College) 0000-00-00
Non-archimedean dynamics in dimension one 5 - Rob Benedetto Associate Professor(Amherst College) 0000-00-00
Non-archimedean dynamics in dimension one 6 - Rob Benedetto Associate Professor(Amherst College) 0000-00-00
Non-archimedean dynamics in dimension one 7 - Rob Benedetto Associate Professor(Amherst College) 0000-00-00
Hecke operators and quantum unique ergodicity 1 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 2 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 3 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 4 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 5 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 6 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 7 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 8 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 9 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Hecke operators and quantum unique ergodicity 10 - Manfred Einsiedler Professor(ETH Z?rich, Departement Mathematik) 0000-00-00
Arithmetic dynamics 1 - Joseph Silverman Professor(Brown University) 0000-00-00
Arithmetic dynamics 2 - Joseph Silverman Professor(Brown University) 0000-00-00
Arithmetic dynamics 3 - Joseph Silverman Professor(Brown University) 0000-00-00
Arithmetic dynamics 4 - Joseph Silverman Professor(Brown University) 0000-00-00
Arithmetic dynamics 5 - Joseph Silverman Professor(Brown University) 0000-00-00
Arithmetic dynamics 6 - Joseph Silverman Professor(Brown University) 0000-00-00
Arithmetic dynamics 7 - Joseph Silverman Professor(Brown University) 0000-00-00
Quantum unique ergodicity and number theory 1 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Quantum unique ergodicity and number theory 2 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Quantum unique ergodicity and number theory 3 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Quantum unique ergodicity and number theory 4 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Quantum unique ergodicity and number theory 5 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Quantum unique ergodicity and number theory 6 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Quantum unique ergodicity and number theory 7 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Quantum unique ergodicity and number theory 8 - Kannan Soundararajan Professor(Stanford University) 0000-00-00
Back to top of page 2009Differentiation of measurable functions and Whitney–Lusin''s type structure theorems - B. Bojarski Professor(Institute of Mathematics of the Polish Academy of Sciences, Warsaw, Poland) 2009-06-04
Spectral properties of finite-dimensional operators and the problem of gyroscopic stabilization - V. V. Kozlov Doctor Phys.-Math. Sci., Professor, Academician, Director, Head of Department(Department of Mechanics,Steklov Mathematical Institute) 2009-05-21
1.1.1 - The Definition of a Set and Set Builder Notation - Julie Brown Professor(University of Idaho) 2009-00-00
1.1.2 - The Real Number System - Julie Brown Professor(University of Idaho) 2009-00-00
1.1.3 - The Definition of Absolute Value - Julie Brown Professor(University of Idaho) 2009-00-00
1.1.4 - An Introduction to Inequalities - Julie Brown Professor(University of Idaho) 2009-00-00
1.2.1 - Addition and Subtraction of Positive and Negative Numbers - Julie Brown Professor(University of Idaho) 2009-00-00
1.2.2 - More Examples (fractions) - Julie Brown Professor(University of Idaho) 2009-00-00
1.2.3 - Multiplication/Division of Signed Numbers and Division by Zero - Julie Brown Professor(University of Idaho) 2009-00-00
1.3.1 - Evaluating Exponents - Julie Brown Professor(University of Idaho) 2009-00-00
1.3.2 - Evaluating Square Roots and Higher Roots - Julie Brown Professor(University of Idaho) 2009-00-00
1.3.3 - Order of Operations: P.E.M.D.A.S - Julie Brown Professor(University of Idaho) 2009-00-00
1.4.1 - The Distributive Property and Combining Like Terms - Julie Brown Professor(University of Idaho) 2009-00-00
2.1.1 - Definition of a Linear Equation; Solving Linear Equations - Julie Brown Professor(University of Idaho) 2009-00-00
2.1.2 - Solving Linear Equations Involving Fractions - Julie Brown Professor(University of Idaho) 2009-00-00
2.1.3 - Solving Linear Equations Involving Decimals - Method Eliminating Decimal Point - Julie Brown Professor(University of Idaho) 2009-00-00
2.1.4 - Solving Linear Equations Involving Decimals - Method Keeping Decimal Point - Julie Brown Professor(University of Idaho) 2009-00-00
2.2.1 - Solving a Formula for a Specified Variable - Julie Brown Professor(University of Idaho) 2009-00-00
2.2.2 - Solving Percent Problems - Julie Brown Professor(University of Idaho) 2009-00-00
2.3.1 - Geometric Word Problems - Julie Brown Professor(University of Idaho) 2009-00-00
2.3.2 - Word Problems Involving Finding Unknown Quantities - Julie Brown Professor(University of Idaho) 2009-00-00
2.3.3 - Mixture Word Problems - Julie Brown Professor(University of Idaho) 2009-00-00
2.4.1 - Monetary Word Problems - Julie Brown Professor(University of Idaho) 2009-00-00
2.4.2 - Motion Word Problems - Julie Brown Professor(University of Idaho) 2009-00-00
3.1.1 - Set Notation, Interval Notation, and Graphing Inequalities - Julie Brown Professor(University of Idaho) 2009-00-00
3.1.2 - Properties of Inequalities - Julie Brown Professor(University of Idaho) 2009-00-00
3.1.3 - Solving Linear Inequalities - Julie Brown Professor(University of Idaho) 2009-00-00
3.1.4 - Solving a Three-Part Inequality (Double Inequality) - Julie Brown Professor(University of Idaho) 2009-00-00
3.2.1 - Solving Inequalities with the Word "And" - Julie Brown Professor(University of Idaho) 2009-00-00
3.2.2 - Solving Inequalities with the Word "Or" - Julie Brown Professor(University of Idaho) 2009-00-00
3.3.1 - Solving an Absolute Value Equation - Julie Brown Professor(University of Idaho) 2009-00-00
3.3.2 - Solving an Absolute Value Inequality Involving "Less Than" " - Julie Brown Professor(University of Idaho) 2009-00-00
3.3.3 - Solving an Absolute Value Inequality Involving "Greater Than" - Julie Brown Professor(University of Idaho) 2009-00-00
4.1.1 - An Introduction to the Rectangular Coordinate System - Julie Brown Professor(University of Idaho) 2009-00-00
4.1.2 - Standard Form of a Linear Equation Part A - Julie Brown Professor(University of Idaho) 2009-00-00
4.1.3 - Standard Form of a Linear Equation Part B - Julie Brown Professor(University of Idaho) 2009-00-00
4.1.4 - Graphing Linear Equations by Finding Intercepts Part A - Julie Brown Professor(University of Idaho) 2009-00-00
4.1.5 - Graphing Linear Equations by Finding Intercepts Part B - Julie Brown Professor(University of Idaho) 2009-00-00
4.1.6 - Graphing Horizontal and Vertical Lines - Julie Brown Professor(University of Idaho) 2009-00-00
4.2.1 - The Definition of Slope Part A - Julie Brown Professor(University of Idaho) 2009-00-00
4.2.2 - The Definition of Slope Part B - Julie Brown Professor(University of Idaho) 2009-00-00
4.2.3 - Determining the Slope of a Linear Equation Part A - Julie Brown Professor(University of Idaho) 2009-00-00
4.2.4 - Determining the Slope of a Linear Equation Part B - Julie Brown Professor(University of Idaho) 2009-00-00
4.2.5 - Graphing Lines Using the Slope and a Point - Julie Brown Professor(University of Idaho) 2009-00-00
4.2.6 - Parallel and Perpendicular Lines Part A - Julie Brown Professor(University of Idaho) 2009-00-00
4.2.7 - Parallel and Perpendicular Lines
Part B (6:38) - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.1 - Point-Slope Form - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.2 - Slope-Intercept Form - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.3 - Standard Form - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.4 - Finding equations of lines - overview. - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.5 - Point-Slope, Slope-intercept & Standard Form. Example when given the slope and a point. - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.6 - Example when given two points. - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.7 - Parallel & perpendicular Lines: Ex.1 in Point-Slope & Standard Form - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.8 - Parallel and perpendicular lines: test questions examples - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.9 - Vertical & horizontal lines - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.10 - Summary (of all equations in Section 4.3) - Julie Brown Professor(University of Idaho) 2009-00-00
4.3.11 - Applications of Lines & Equations: Modeling the purchase of gas and a car wash. - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.1 - Relations & Functions - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.2 - Functions as Ordered Pairs: Examples 1 & 2 - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.3 - Mapping: Example 1 & 2, Example 3, & Summary of Relations & Functions - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.4 - Vertical Line Test - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.5 - Domain & Range - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.6 - Domain & Range: Graph of Linear Function - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.7 - Domain & Range Graph of Nonlinear
Function - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.8 - Domain & Range Graph of Relation
Summary - Julie Brown Professor(University of Idaho) 2009-00-00
4.5.9 - Notation & Evaluating Functions - Julie Brown Professor(University of Idaho) 2009-00-00
4.6.0 - Linear Functions: (Graph, Domain, Range) - Julie Brown Professor(University of Idaho) 2009-00-00
4.6.1 - Application of Linear Function - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.1 - Overview of Systems, Types, Graphical Solution of Consistent Systems - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.1.a - Determining the Number of Solutions to a System by Comparing the Slope and the y-Intercept - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.1.b - Deciding Whether an Ordered Pair is a Solution of a Linear System - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.2 - Algebraic Solution of Consistent Systems by Substitution Ex.1 - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.3 - Algebraic Solution of Consistent Systems by Substitution Ex.2 - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.4 - Algebraic Solution of Consistent Systems by Elimination Ex.1 - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.5 - Algebraic Solution of Consistent Systems by Elimination Ex.2 - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.6 - Solving a Dependent System And Inconsistent System - Julie Brown Professor(University of Idaho) 2009-00-00
5.1.7 - Solving Systems Having Fractional Coefficients
- Julie Brown Professor(University of Idaho) 2009-00-00
5.3.1 - Perimeter - Julie Brown Professor(University of Idaho) 2009-00-00
5.3.2 - Mixture Problem - Julie Brown Professor(University of Idaho) 2009-00-00
5.3.3 - Solving DRT Problem Using Two Variables - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.1 - Overview of Bases and Powers - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.2 - Product Rule - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.3 - Zero Power and Negative Power Part A - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.4 - Zero Power and Negative Power Part B - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.5 - Quotient Rule - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.6 - Power rules-Power of a power, Power of a product, & Power of a Quotient - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.7 - Power rules-Example using all three power rules. - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.8 - Simplifying Expressions- Review of exponent rules & Examples - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.9 - Simplifying Expressions- More examples. - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.10 - Simplifying Expressions- One more example. - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.10.a - A More Complicated Exponents Example - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.10.b - Another Complicated Exponents Example - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.10.c - Yet Another Complicated Exponents Example - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.11 - Scientific Notation- Part A - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.12 - Scientific Notation- Part B - Julie Brown Professor(University of Idaho) 2009-00-00
6.1.13 - Scientific Notation- Part C - Julie Brown Professor(University of Idaho) 2009-00-00
6.2.1 - Definitions, Names & Degree of Polynomials Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.2.2 - Definitions, Names & Degree of Polynomials Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.2.3 - Adding Polynomials - Julie Brown Professor(University of Idaho) 2009-00-00
6.2.4 - Subtracting Polynomials - Julie Brown Professor(University of Idaho) 2009-00-00
6.3.1 - Evaluating a Polynomial Function Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.3.2- Evaluating a Polynomial Function Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.1 - Overview-Rules for Exponents & Distributive Property - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.2 - Multiplying Polynomials Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.3 - Multiplying Polynomials Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.4 - Multiplying 2 Polynomials Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.5 - Multiplying 2 Polynomials Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.6 - Multiplying 2 Polynomials Vertically Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.7 - Multiplying 2 Polynomials Vertically Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.8 - Special Multiplication Patterns Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.9 - Special Multiplication Patterns Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.10 - Special Multiplication Patterns Part 3 & Summary - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.11 - Multiplying Polynomials ex. 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.4.12 - Multiplying Polynomials ex. 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.5.1 - Division of a Polynomial by a Monomial Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.5.2 - Division of a Polynomial by a Monomial Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
6.5.3 - Long Division Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
6.5.4 - Long Division Part 2- Dividing a polynomial that has a missing term. - Julie Brown Professor(University of Idaho) 2009-00-00
6.5.5 - Long Division Part 3- Example with remainder. - Julie Brown Professor(University of Idaho) 2009-00-00
7.1.a - Identifying the Greatest Common Factor from a List of Terms - Julie Brown Professor(University of Idaho) 2009-00-00
7.1.1 - Factoring Out Greatest Common Factor Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
7.1.2 - Factoring Out Greatest Common Factor Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
7.1.3 - Factoring by Grouping Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
7.1.4 - Factoring by Grouping Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
7.2.1 - Part 1- Method and examples of form x**2+bx+c - Julie Brown Professor(University of Idaho) 2009-00-00
7.2.2 - Part 2- Examples of prime polynomial and of Form ax**2+bx+c - Julie Brown Professor(University of Idaho) 2009-00-00
7.2.3 - Part 3- More examples- GCF & trinomial. Trinomial of form ax**2+bxy+cy**2 - Julie Brown Professor(University of Idaho) 2009-00-00
7.2.4 - Part 4- Factoring a polynomial of form ax**4+bx**2+c - Julie Brown Professor(University of Idaho) 2009-00-00
7.2.5 - Part 5- Factoring by using substitution. - Julie Brown Professor(University of Idaho) 2009-00-00
7.3.1 - Difference of Two Squares Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
7.3.2 - Difference of Two Squares Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
7.4.1 - Using the Zero-Factor Property to Solve Equations - Julie Brown Professor(University of Idaho) 2009-00-00
7.4.2 - Factor and Solve Equations-Method & Examples Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
7.4.3 - Factor and Solve Equations-Method & Examples Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
7.4.4 - Applications: Writing Equations & Solving Word Problems Part 1- Cutting a uniform strip of paper. - Julie Brown Professor(University of Idaho) 2009-00-00
7.4.5 - Applications: Writing Equations & Solving Word Problems Part 2- Pythagorean Theorem. - Julie Brown Professor(University of Idaho) 2009-00-00
7.4.6 - Applications: Writing Equations and Solving Word Problems Part 3- An area problem. - Julie Brown Professor(University of Idaho) 2009-00-00
7.4.7 - Applications: Fence Problem - Julie Brown Professor(University of Idaho) 2009-00-00
8.1.1 - Domain of Rational Expressions - Julie Brown Professor(University of Idaho) 2009-00-00
8.1.2 - Simplifying Rational Expressions Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
8.1.3 - Simplifying Rational Expressions Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
8.1.4 - Multiplying Rational Expressions - Julie Brown Professor(University of Idaho) 2009-00-00
8.1.5 - Dividing Rational Expressions Part 1 - Julie Brown Professor(University of Idaho) 2009-00-00
8.1.6 - Dividing Rational Expressions Part 2 - Julie Brown Professor(University of Idaho) 2009-00-00
8.2.1 - Addition and Subtraction of Rational Expressions with the same denominator - Julie Brown Professor(University of Idaho) 2009-00-00
8.2.2 - Addition and Subtraction of Rational Expressions with different denominators - Julie Brown Professor(University of Idaho) 2009-00-00
8.2.3 - Addition and Subtraction of Rational Expressions with denominators which are more involved - Julie Brown Professor(University of Idaho) 2009-00-00
8.3.1 - Simplifying with Method I - Julie Brown Professor(University of Idaho) 2009-00-00
8.3.2 - Simplifying with Method II - Julie Brown Professor(University of Idaho) 2009-00-00
8.3.3 - Examples using both methods - Julie Brown Professor(University of Idaho) 2009-00-00
8.4.1 - Solving by Multiplying by the Lowest Common Denominator - Julie Brown Professor(University of Idaho) 2009-00-00
8.4.2 - An Example of a more involved Rational Equation - Julie Brown Professor(University of Idaho) 2009-00-00
8.4.3 - Warning: Distinguish between Simplifying a Rational Expression and Solving an Equation Involving Rational Expressions - Julie Brown Professor(University of Idaho) 2009-00-00
8.4.4 - Solving a Proportion - Julie Brown Professor(University of Idaho) 2009-00-00
8.5.1 - Formulas with Rational Expressions - Julie Brown Professor(University of Idaho) 2009-00-00
8.5.2 - Ratio Problems - Julie Brown Professor(University of Idaho) 2009-00-00
8.5.3 - Distance Problems-Example 1 - Julie Brown Professor(University of Idaho) 2009-00-00
8.5.4 - Distance Problems-Example 2 - Julie Brown Professor(University of Idaho) 2009-00-00
8.5.5 - Work Problems-Example 1 - Julie Brown Professor(University of Idaho) 2009-00-00
8.5.6 - Work Problems-Example 2 - Julie Brown Professor(University of Idaho) 2009-00-00
8.5.7 - Work Problems-Example 3 - Julie Brown Professor(University of Idaho) 2009-00-00
9.1.1 - Radicals-Introduction - Julie Brown Professor(University of Idaho) 2009-00-00
9.1.2 - More on Radicals - Julie Brown Professor(University of Idaho) 2009-00-00
9.2.1 - Definition, Evaluation of numbers with Rational Exponents - Julie Brown Professor(University of Idaho) 2009-00-00
9.2.2 - More on Rational Exponents - Julie Brown Professor(University of Idaho) 2009-00-00
9.2.3 - Simplifying Expressions with Rational Exponents-Properties of Exponents - Julie Brown Professor(University of Idaho) 2009-00-00
9.2.4 - Additional Examples of Simplifying with Rational Exponents - Julie Brown Professor(University of Idaho) 2009-00-00
9.2.5 - Summary for working with Rational Exponents - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.1 - Product and Quotient Rules for Radicals, four examples - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.2 - Example with Square Roots - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.3 - Example with Cubic Root of a Negative - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.4 - Example with a Quotient inside a Radical - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.5 - Example with a Cubic Root of a Quotient - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.6 - One more Example - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.7 - Applications-The Pythagorean Theorem and the Distance between two Points - Julie Brown Professor(University of Idaho) 2009-00-00
9.3.8 - Applications-The Distance Formula - Julie Brown Professor(University of Idaho) 2009-00-00
9.4.1 - Addition & Subtraction of Radical Expressions - Julie Brown Professor(University of Idaho) 2009-00-00
9.4.2 - Adding and Subtracting Radicals with Fractions - Numerical Denominator - Julie Brown Professor(University of Idaho) 2009-00-00
9.4.3 - Adding Subtracting Radicals with Fractions - Variables in Denominator - Julie Brown Professor(University of Idaho) 2009-00-00
9.5.1 - Multiplication and Division of Radical Expressions - Julie Brown Professor(University of Idaho) 2009-00-00
9.5.2 - Rationalizing Radical Expressions-involving Square Roots - Julie Brown Professor(University of Idaho) 2009-00-00
9.5.3 - Rationalizing Radical Expressions-involving Cubic Roots - Julie Brown Professor(University of Idaho) 2009-00-00
9.5.4 - Another example - Julie Brown Professor(University of Idaho) 2009-00-00
9.5.5 - Rationalizing Denominators with Binomials Involving Radicals - Julie Brown Professor(University of Idaho) 2009-00-00
9.5.6 - Writing Radical Expressions in Lowest Terms - Julie Brown Professor(University of Idaho) 2009-00-00
9.6.1 - One Example - Julie Brown Professor(University of Idaho) 2009-00-00
9.6.2 - Two more involved Examples - Julie Brown Professor(University of Idaho) 2009-00-00
9.6.3 - An Equation with Two Radicals - Julie Brown Professor(University of Idaho) 2009-00-00
9.7.1 - Imaginary Unit, i, and Definition of a Complex Number - Julie Brown Professor(University of Idaho) 2009-00-00
9.7.2 - Addition, Subtraction, Multiplication of Complex Numbers - Julie Brown Professor(University of Idaho) 2009-00-00
9.7.3 - Division of Complex Numbers - Julie Brown Professor(University of Idaho) 2009-00-00
10.1.1 - Solving by Factoring, Solving by the Square Root Property - Julie Brown Professor(University of Idaho) 2009-00-00
10.1.2 - Solving by Completing The Square-an Example - Julie Brown Professor(University of Idaho) 2009-00-00
10.1.3 - Summary of Completing The Square-another Example - Julie Brown Professor(University of Idaho) 2009-00-00
10.2.1 - The Quadratic Formula-an Example with two real solutions - Julie Brown Professor(University of Idaho) 2009-00-00
10.2.2 - Example with two non-real solutions; Example with one solution; the discriminant - Julie Brown Professor(University of Idaho) 2009-00-00
10.2.3 - Summary of Techniques for solving Quadratic Equations - Julie Brown Professor(University of Idaho) 2009-00-00
10.3.1 - Example involving a Radical - Julie Brown Professor(University of Idaho) 2009-00-00
10.3.2 - Two other Examples - Julie Brown Professor(University of Idaho) 2009-00-00
10.3.3 - Example involving negative exponents - Julie Brown Professor(University of Idaho) 2009-00-00
10.4.1 - Position Function - Julie Brown Professor(University of Idaho) 2009-00-00
10.4.2 - Work - Julie Brown Professor(University of Idaho) 2009-00-00
0.5.1 - Factoring a Common Factor - Holly Dickin Professor(University of Idaho) 2009-00-00
0.5.2 - Special Factoring: Difference of Squares - Holly Dickin Professor(University of Idaho) 2009-00-00
0.5.3 - Special Factoring: Difference of Cubes - Holly Dickin Professor(University of Idaho) 2009-00-00
0.5.4 - Special Factoring: Sum of Cubes - Holly Dickin Professor(University of Idaho) 2009-00-00
0.5.5 - Factoring by Grouping - Holly Dickin Professor(University of Idaho) 2009-00-00
0.5.6 - Factoring a Trinomial of the Form Part 1 - Holly Dickin Professor(University of Idaho) 2009-00-00
0.5.7 - Factoring a Trinomial of the Form Part 2 - Holly Dickin Professor(University of Idaho) 2009-00-00
0.6.1 - Long division of polynomials and Synthetic division - Holly Dickin Professor(University of Idaho) 2009-00-00
1.1.1 - Solving Simple Linear Equations - Holly Dickin Professor(University of Idaho) 2009-00-00
1.1.2 - Solving Linear Equations Involving Fractions - Holly Dickin Professor(University of Idaho) 2009-00-00
1.1.3 - Solving Linear Equations Involving Decimals - Holly Dickin Professor(University of Idaho) 2009-00-00
1.1.4 - Solving Rational Equations - Holly Dickin Professor(University of Idaho) 2009-00-00
1.2.1 - Solving Quadratic Equations by taking square roots - Holly Dickin Professor(University of Idaho) 2009-00-00
1.2.2 - Solving Quadratic Equations by factoring - Holly Dickin Professor(University of Idaho) 2009-00-00
1.2.3 - Solving Quadratic Equations by completing the square - Holly Dickin Professor(University of Idaho) 2009-00-00
1.2.4 - Solving Quadratic Equations by the Quadratic Formula - Holly Dickin Professor(University of Idaho) 2009-00-00
1.2.5 - Applications of Quadratic Equations - Holly Dickin Professor(University of Idaho) 2009-00-00
1.3.1 - An introduction to complex numbers. The definition of I - Holly Dickin Professor(University of Idaho) 2009-00-00
1.3.2 - Addition, Subtraction of complex numbers - Holly Dickin Professor(University of Idaho) 2009-00-00
1.3.3 - Multiplication and division of complex numbers. The complex conjugate. - Holly Dickin Professor(University of Idaho) 2009-00-00
1.3.4 - The discriminant of the quadratic formula. Quadratic equations with a negative discriminant. - Holly Dickin Professor(University of Idaho) 2009-00-00
1.4.1 - Solving equations containing radicals - Holly Dickin Professor(University of Idaho) 2009-00-00
1.4.1.5 Solving equations containing two radicals - Holly Dickin Professor(University of Idaho) 2009-00-00
1.4.2 - Solving Equations Quadratic in form - Holly Dickin Professor(University of Idaho) 2009-00-00
1.4.3 - Solving Equations by Factoring and Using the Zero Product Property - Holly Dickin Professor(University of Idaho) 2009-00-00
1.5.1 - A review of inequalities and interval notation
- Holly Dickin Professor(University of Idaho) 2009-00-00
1.5.2 - Solving linear inequalities - Holly Dickin Professor(University of Idaho) 2009-00-00
1.6.1 - The definition of absolute value - Holly Dickin Professor(University of Idaho) 2009-00-00
1.6.2 - Absolute value equations - Holly Dickin Professor(University of Idaho) 2009-00-00
1.6.3 - Absolute value less than inequalities - Holly Dickin Professor(University of Idaho) 2009-00-00
1.6.4 - Absolute value greater than inequalities - Holly Dickin Professor(University of Idaho) 2009-00-00
1.6.5 - A summary of absolute value equations and inequalities - Holly Dickin Professor(University of Idaho) 2009-00-00
1.7.1 - Uniform Motion (s=vt) - Holly Dickin Professor(University of Idaho) 2009-00-00
1.7.2 - Mixture Problems - Holly Dickin Professor(University of Idaho) 2009-00-00
1.7.3 - Working Together on a Job Problems - Holly Dickin Professor(University of Idaho) 2009-00-00
2.1.1 - An introduction to the rectangular coordinate system; Plotting points - Holly Dickin Professor(University of Idaho) 2009-00-00
2.1.2 - The Distance Formula - Holly Dickin Professor(University of Idaho) 2009-00-00
2.1.2.5 - Determining if three points form a right triangle - Holly Dickin Professor(University of Idaho) 2009-00-00
2.1.3 - The Midpoint Formula - Holly Dickin Professor(University of Idaho) 2009-00-00
2.2.1 - Graphing equations by plotting points - Holly Dickin Professor(University of Idaho) 2009-00-00
2.2.2 - Finding X and Y intercepts - Holly Dickin Professor(University of Idaho) 2009-00-00
2.2.3 - Symmetry - Holly Dickin Professor(University of Idaho) 2009-00-00
2.3.1 - Slope of a line and the point-slope equation of a line - Holly Dickin Professor(University of Idaho) 2009-00-00
2.3.2 - The equation of a line in slope-intercept form - Holly Dickin Professor(University of Idaho) 2009-00-00
2.3.3 - The equations of horizontal and vertical lines - Holly Dickin Professor(University of Idaho) 2009-00-00
2.3.4 - The equation of a line in general form - Holly Dickin Professor(University of Idaho) 2009-00-00
2.3.5 - Parallel and perpendicular lines - Holly Dickin Professor(University of Idaho) 2009-00-00
2.3.6 - Determining if two lines are parallel, perpendicular or neither - Holly Dickin Professor(University of Idaho) 2009-00-00
2.4.1 - The equation of a circle in standard form - Holly Dickin Professor(University of Idaho) 2009-00-00
2.4.2 - Completing the square to find the equation of a circle in standard form - Holly Dickin Professor(University of Idaho) 2009-00-00
2.4.3 - Finding the equation of a circle given its graph - Holly Dickin Professor(University of Idaho) 2009-00-00
3.1.1 - Definition of a Function; Evaluating functions at a specific point - Holly Dickin Professor(University of Idaho) 2009-00-00
3.1.2 - Finding the Domain of a Function - Holly Dickin Professor(University of Idaho) 2009-00-00
3.1.3 - Operations on Functions - Holly Dickin Professor(University of Idaho) 2009-00-00
3.1.4 - Finding the Domain of Functions with Operators - Holly Dickin Professor(University of Idaho) 2009-00-00
3.2.1 - Finding the Domain and Range of a Function given its Graph (Vertical Line Test) - Holly Dickin Professor(University of Idaho) 2009-00-00
3.3.1 - Increasing, Decreasing and Constant functions - Holly Dickin Professor(University of Idaho) 2009-00-00
3.3.1.5 - Definition of Local Extremes - Holly Dickin Professor(University of Idaho) 2009-00-00
3.3.2 - Even and odd functions - Holly Dickin Professor(University of Idaho) 2009-00-00
3.4.1 - A Library of Functions - Holly Dickin Professor(University of Idaho) 2009-00-00
3.4.2 - Piecewise defined functions - Holly Dickin Professor(University of Idaho) 2009-00-00
3.5.1 - Vertical and horizontal shifts - Holly Dickin Professor(University of Idaho) 2009-00-00
3.5.2 - Compressing and Stretching a function - Holly Dickin Professor(University of Idaho) 2009-00-00
3.5.3 - Reflection of functions about the x-axis and y-axis - Holly Dickin Professor(University of Idaho) 2009-00-00
3.5.4 - Horizontal Stretches and Compressions - Holly Dickin Professor(University of Idaho) 2009-00-00
3.5.5 - A summary of transformations - Holly Dickin Professor(University of Idaho) 2009-00-00
3.6.1 - An example of a demand equation - Holly Dickin Professor(University of Idaho) 2009-00-00
3.6.2 - Enclosing a rectangular field - Holly Dickin Professor(University of Idaho) 2009-00-00
3.6.3 - Constructing an open box - Holly Dickin Professor(University of Idaho) 2009-00-00
3.6.4 - Constructing an open box with a fixed volume - Holly Dickin Professor(University of Idaho) 2009-00-00
3.6.5 - Constructing geometric shapes with a wire - Holly Dickin Professor(University of Idaho) 2009-00-00
4.3.1 - An introduction to quadratic functions - Holly Dickin Professor(University of Idaho) 2009-00-00
4.3.2 - Sketching the graph of a quadratic function using transformations - Holly Dickin Professor(University of Idaho) 2009-00-00
4.3.3 - Finding the vertex, intercepts and axis of symmetry - Holly Dickin Professor(University of Idaho) 2009-00-00
4.4.1 - The Demand Equation - Holly Dickin Professor(University of Idaho) 2009-00-00
4.4.2 - Enclosing a rectangular fence - Holly Dickin Professor(University of Idaho) 2009-00-00
4.4.3 - Analyzing the motion of a projectile - Holly Dickin Professor(University of Idaho) 2009-00-00
5.1.1 - The definition of a polynomial function - Holly Dickin Professor(University of Idaho) 2009-00-00
5.1.2 - Power functions and their graphs - Holly Dickin Professor(University of Idaho) 2009-00-00
5.1.3 - What the degree of a polynomial and the leading coefficient of a polynomial tell us - Holly Dickin Professor(University of Idaho) 2009-00-00
5.1.4 - The zeros of a polynomial and multiplicity - Holly Dickin Professor(University of Idaho) 2009-00-00
5.1.5 - Sketching the graph of a polynomial that is in factored form - Holly Dickin Professor(University of Idaho) 2009-00-00
5.1.6 - Determining the behavior of a graph near its x-intercepts ( - Holly Dickin Professor(University of Idaho) 2009-00-00
5.4.1 - Solve polynomial inequalities - Holly Dickin Professor(University of Idaho) 2009-00-00
5.4.2 - Solve polynomial inequalities by graphing - Holly Dickin Professor(University of Idaho) 2009-00-00
5.4.3 - Solve rational inequalities - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.1 - The Division Algorithm - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.2 - The Remainder Theorem - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.3 - The Factor Theorem - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.4 - Using the Rational Zeros Theorem to list potential rational zeros of a polynomial - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.5 - Finding the zeros of a polynomial - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.6 - Solving equations - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.7 - The Intermediate Value Theorem - Holly Dickin Professor(University of Idaho) 2009-00-00
5.5.8 - Descartes' rule of signs - Holly Dickin Professor(University of Idaho) 2009-00-00
5.6.1 - Definition of a complex polynomial and The Fundamental Theorem. - Holly Dickin Professor(University of Idaho) 2009-00-00
5.6.2 - The Conjugate Pairs Theorem - Holly Dickin Professor(University of Idaho) 2009-00-00
5.6.3 - Finding all zeros of a complex polynomial - Holly Dickin Professor(University of Idaho) 2009-00-00
5.6.4 - Use one zero to find the remaining zeros of a polynomial function - Holly Dickin Professor(University of Idaho) 2009-00-00
6.1.1 - The composite function - Holly Dickin Professor(University of Idaho) 2009-00-00
6.1.2 - Finding the domain of a composite function - Holly Dickin Professor(University of Idaho) 2009-00-00
6.2.1 - The definition of one-to-one functions, the horizontal line test and some examples - Holly Dickin Professor(University of Idaho) 2009-00-00
6.2.2 - Inverse functions; The domain and range of one-to-one functions and inverse functions and some examples - Holly Dickin Professor(University of Idaho) 2009-00-00
6.2.3 - Verifying that two functions are inverses of each other - Holly Dickin Professor(University of Idaho) 2009-00-00
6.2.4 - Finding an inverse function - Holly Dickin Professor(University of Idaho) 2009-00-00
6.3.1 - A Review of the Laws of Exponents - Holly Dickin Professor(University of Idaho) 2009-00-00
6.3.2 - The Definition of an Exponential Function - Holly Dickin Professor(University of Idaho) 2009-00-00
6.3.3 - Sketching the Graphs of Exponential Functions - Holly Dickin Professor(University of Idaho) 2009-00-00
6.3.4 - The Definition of the Function e^x - Holly Dickin Professor(University of Idaho) 2009-00-00
6.3.5 - Solving exponential equations by relating bases - Holly Dickin Professor(University of Idaho) 2009-00-00
6.3.6 - More examples of exponential equations - Holly Dickin Professor(University of Idaho) 2009-00-00
6.3.7 - Applications of Exponential Functions - Holly Dickin Professor(University of Idaho) 2009-00-00
6.4.1 - The Definition of the Logarithmic Function & Some Examples - Holly Dickin Professor(University of Idaho) 2009-00-00
6.4.2 - Changing Exponential Expressions Into Logarithmic Expressions and Vice-versa - Holly Dickin Professor(University of Idaho) 2009-00-00
6.4.3 - Finding the Domain and Intercepts of a Logarithmic Function - Holly Dickin Professor(University of Idaho) 2009-00-00
6.4.4 - Graphs of Logarithmic Functions - Holly Dickin Professor(University of Idaho) 2009-00-00
6.4.5 - Solving logarithmic equations by rewriting as an exponent - Holly Dickin Professor(University of Idaho) 2009-00-00
6.4.6 - Solving exponential equations involving base e - Holly Dickin Professor(University of Idaho) 2009-00-00
6.4.7 - Applications of Logarithmic Functions - Holly Dickin Professor(University of Idaho) 2009-00-00
6.5.1 - The Properties of Logarithms - Holly Dickin Professor(University of Idaho) 2009-00-00
6.5.2 - Rewriting Logarithmic Expressions as the Sum And/Or Difference of Logarithms Using Properties of Log - Holly Dickin Professor(University of Idaho) 2009-00-00
6.5.3 - Rewriting the Sum And/Or Difference of Logarithms as a Single Logarithm - Holly Dickin Professor(University of Idaho) 2009-00-00
6.5.4 - The Change of Base Formula - Holly Dickin Professor(University of Idaho) 2009-00-00
6.6.1 - Solving logarithmic equations by comparing logarithms - Holly Dickin Professor(University of Idaho) 2009-00-00
6.6.2 - Solving logarithmic equations using log properties - Holly Dickin Professor(University of Idaho) 2009-00-00
6.6.3 - Solving Exponential Equations - Holly Dickin Professor(University of Idaho) 2009-00-00
6.6.4 - Solving Logarithmic Equations By Using the Change of Base Formula - Holly Dickin Professor(University of Idaho) 2009-00-00
6.7.1 - Compound Interest - Holly Dickin Professor(University of Idaho) 2009-00-00
6.7.2 - Continuous Compound Interest - Holly Dickin Professor(University of Idaho) 2009-00-00
6.7.3 - Present Value - Holly Dickin Professor(University of Idaho) 2009-00-00
6.8.1 - Exponential Growth - Holly Dickin Professor(University of Idaho) 2009-00-00
6.8.2 - Exponential Decay (Radioactive Decay) - Holly Dickin Professor(University of Idaho) 2009-00-00
6.8.3 - Newton's Law of Cooling - Holly Dickin Professor(University of Idaho) 2009-00-00
7.1.1 - An introduction to conic sections - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.1 - The Parabola; The definition and parts of a
Parabola - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.2 - The equation of a Parabola opening up or down (axis of symmetry is parallel to y-axis) - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.3 - The equation of a Parabola opening left or right (axis of symmetry is parallel to x-axis) - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.4 - A summary of the two equations of the
Parabola - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.5 - Finding the equation of a parabola given the focus and vertex - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.6 - Finding the equation of a parabola given the focus and directrix or given the vertex and directrix - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.7 - Finding the equation of a parabola given the vertex and a point on the parabola - Holly Dickin Professor(University of Idaho) 2009-00-00
7.2.8 - Completing the square to find the vertex, focus and directrix of a parabola ( - Holly Dickin Professor(University of Idaho) 2009-00-00
7.3.1 - The Ellipse; The definition of the ellipse and parts of an ellipse
- Holly Dickin Professor(University of Idaho) 2009-00-00
7.3.2 - The equation of an ellipse with major axis parallel to the x-axis - Holly Dickin Professor(University of Idaho) 2009-00-00
7.3.3 - The equation of an ellipse with major axis parallel to the y-axis - Holly Dickin Professor(University of Idaho) 2009-00-00
7.3.4 - Finding the equation of an ellipse given its
graph - Holly Dickin Professor(University of Idaho) 2009-00-00
7.3.5 - Finding the equation of an ellipse given the center, a vertex and a focus point - Holly Dickin Professor(University of Idaho) 2009-00-00
7.3.6 - Finding the equation of an ellipse given the center, a vertex and one other point on the ellipse - Holly Dickin Professor(University of Idaho) 2009-00-00
7.3.7 - Finding the center, foci, and vertices of the equation of an ellipse by completing the
square - Holly Dickin Professor(University of Idaho) 2009-00-00
Difference Methods for Ordinary Differential Equations - Gilbert Strang Professor(MIT) 2009-00-00
Finite Differences, Accuracy, Stability, Convergence - Gilbert Strang Professor(MIT) 2009-00-00
The One-way Wave Equation and CFL / von Neumann Stability - Gilbert Strang Professor(MIT) 2009-00-00
Comparison of Methods for the Wave Equation - Gilbert Strang Professor(MIT) 2009-00-00
Second-order Wave Equation (including leapfrog) - Gilbert Strang Professor(MIT) 2009-00-00
Wave Profiles, Heat Equation / point source - Gilbert Strang Professor(MIT) 2009-00-00
Finite Differences for the Heat Equation - Gilbert Strang Professor(MIT) 2009-00-00
Convection-Diffusion / Conservation Laws - Gilbert Strang Professor(MIT) 2009-00-00
Conservation Laws / Analysis / Shocks - Gilbert Strang Professor(MIT) 2009-00-00
Shocks and Fans from Point Source - Gilbert Strang Professor(MIT) 2009-00-00
Level Set Method - Gilbert Strang Professor(MIT) 2009-00-00
Matrices in Difference Equations (1D, 2D, 3D) - Gilbert Strang Professor(MIT) 2009-00-00
Elimination with Reordering: Sparse Matrices - Gilbert Strang Professor(MIT) 2009-00-00
Financial Mathematics / Black-Scholes Equation - Gilbert Strang Professor(MIT) 2009-00-00
Iterative Methods and Preconditioners - Gilbert Strang Professor(MIT) 2009-00-00
General Methods for Sparse Systems - Gilbert Strang Professor(MIT) 2009-00-00
Multigrid Methods - Gilbert Strang Professor(MIT) 2009-00-00
Krylov Methods / Multigrid Continued - Gilbert Strang Professor(MIT) 2009-00-00
Conjugate Gradient Method - Gilbert Strang Professor(MIT) 2009-00-00
Fast Poisson Solver - Gilbert Strang Professor(MIT) 2009-00-00
Optimization with constraints - Gilbert Strang Professor(MIT) 2009-00-00
Weighted Least Squares - Gilbert Strang Professor(MIT) 2009-00-00
Calculus of Variations / Weak Form - Gilbert Strang Professor(MIT) 2009-00-00
Error Estimates / Projections - Gilbert Strang Professor(MIT) 2009-00-00
Saddle Points / Inf-sup condition - Gilbert Strang Professor(MIT) 2009-00-00
Two Squares / Equality Constraint Bu = d - Gilbert Strang Professor(MIT) 2009-00-00
Regularization by Penalty Term - Gilbert Strang Professor(MIT) 2009-00-00
Linear Programming and Duality - Gilbert Strang Professor(MIT) 2009-00-00
Duality Puzzle / Inverse Problem / Integral Equations - Gilbert Strang Professor(MIT) 2009-00-00
Introduction - Benedict H. Gross Professor(Havard Univ.) 2009-00-00
Pythogorean Triples - Benedict H. Gross Professor(Havard Univ.) 2009-00-00
Quadratic and Cubic Equations - Benedict H. Gross Professor(Havard Univ.) 2009-00-00
Rational Solutions - Benedict H. Gross Professor(Havard Univ.) 2009-00-00
Modular Prime - Benedict H. Gross Professor(Havard Univ.) 2009-00-00
Conclusion: Gross-Zagier Theorem - Benedict H. Gross Professor(Havard Univ.) 2009-00-00
Audience Question and Answer - Benedict H. Gross Professor(Havard Univ.) 2009-00-00
Calculus II - Lecture1 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture2 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture3 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture4 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture5 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture6 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture7 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture8 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture9 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture10 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture11 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture12 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture13 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture14 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture15 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture16 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture17 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture18 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture19 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture20 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture21 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture22 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture23 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture24 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture25 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture26 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture27 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture28 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture29 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture30 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture31 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture32 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture33 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture34 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture35 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture36 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture37 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture38 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture39 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture40 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture41 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture42 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture43 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture44 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture45 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture46 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture47 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture48 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture49 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture50 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture51 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture52 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture53 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture54 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture55 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture56 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture57 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture58 - John Griggs Professor(North Carolina State University) 2009-00-00
Calculus II - Lecture59 - John Griggs Professor(North Carolina State University) 2009-00-00
Random points uniformly distributed on an isotropic convex body - Tomczak-Jaegermann, Nicole Professor(University of Alberta) 2009-00-00
Lifting the Curse of Slivers from Surface Reconstruction - Dey, Tamal Professor(Ohio State University) 2009-00-00
Integral geometry of random sets - the Gaussian Kinematic Formula - Taylor, Jonathan Professor(Stanford University) 2009-00-00
Generalized Persistence Noise and Statistical Significance - Carlsson, Gunnar Professor(Stanford University) 2009-00-00
Fast Reconstruction Algorithms for Deterministic Sensing Matrices and Applications - Calderbank, Robert Professor(Princeton University) 2009-00-00
Some non-linear frame theoretic problems - Benedetto, John Professor(University of Maryland) 2009-00-00
p-ranks of nets - Moorhouse, Eric Professor(University of Wyoming) 2009-00-00
Anderson localization for random Schr?dinger operators - Germinet, Francois Professor(Universite de Cergy-Pontoise) 2009-00-00
Statistics of eigenvalues for the Anderson model - Combes, Jean Michel Professor(Universite de Sud Toulon_Var) 2009-00-00
The Skeleton of the MJO and Moist Multiscale Models for the Hurricane Embryo - Majda, Andrew Professor(New York University - Courant Institute of Mathematical Sciences) 2009-00-00
Forcing of Convectively Coupled Kelvin Waves by Extratropical Wave Activity - Kiladis, George Professor(National Atmospheric and Oceanic Administration) 2009-00-00
The Tropical Biases in IPCC AR4 Coupled GCMs - Lin, Jia-Lin Professor(Ohio State University) 2009-00-00
The Mathematics of Cause and Counterfactuals - Pearl, Judea Professor(UCLA) 2009-00-00
Pluri-polar sets in almost complex manifolds - Rosay, Jean-Pierre Professor(University of Wisconsin) 2009-00-00
Tribute to Keith Worsley and Introduction - Valdes-Sosa, Pedro A. Professor(Cuban Neuroscience Center) 2009-00-00
Why Hearts Don't Love and Brains Don't Pump - Nunez, Paul Professor(Tulane University. USA) 2009-00-00
Lumped-parameter and detailed models in Epilepsy - Wendling, Fabrice Professor(INSERM. France) 2009-00-00
Entropy and Chaos in the Kac Model - Carlen, Eric Professor(Rutgers University) 2009-00-00
Asymptotically correct finite difference schemes for highly oscillatory ODEs - Anton, Arnold Professor(Technical University Vienna) 2009-00-00
Mobile Image Matching: Recognition Meets Compression - Girod, Bernd Professor(Stanford University) 2009-00-00
Statistical Methods for Speech, Language and Image Processing: Achievements and Open Problems - Ney, Herman Professor(RWTH Aachen University) 2009-00-00
Traps, Patches, Spots, and Stripes: An Asymptotic Analysis of Localized Solutions to Some Diffusive and Reaction-Diffusion Systems I - Ward, Michael Professor(University of British Columbia) 2009-00-00
Traps, Patches, Spots, and Stripes II - Ward, Michael Professor(University of British Columbia) 2009-00-00
Algebra & Trigonometry - 1.1 Linear Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 1.2 Quadratic Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 1.4 Radical Equations; Quadratic-Type Equations; Factorable Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 1.5 Linear Inequalities - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 1.6 Absolute Value Equations and Inequalities - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 2.1 Rectangular Coordinates - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 2.2 Graphs of Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 2.3 Lines - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 2.4 Circles - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 3.1-3.2-3.3 Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 3.4-3.5 Piecewise Functions and Graphing Techniques - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 4.1 Linear Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 4.3 Quadratic Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 4.5 Inequalities Involving Quadratic Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 5.1 Polynomial Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 5.2-5.3 Rational Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 5.4 Polynomial and Rational Inequalities - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.1 Composite Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.2 One-to-One Functions; Inverse Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.3 Exponential Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.4 Logarithmic Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.5 Logarithmic Properties - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.6 Solving Logarithmic and Exponential Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.7 Compound Interest Applications - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 6.8 Exponential Growth and Decay Applications - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 7.1 Angles and Their Measure - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 7.2 Right Triangle Trigonometry - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 7.3 Computing the Values of Trigonometric Functions of Acute Angles - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 7.4 Trigonometric Functions of General Angles - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 7.5 Unit Circle Approach: Properties of the Trigonometric Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 7.6, 7.8 Graphing Sine and Cosine Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 7.7 Graphing Tangent, Cotangent, Secant and Cosecant Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 8.1-8.2 Inverse Trigonometric Functions - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 8.3 Trigonometric Identities - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 8.4 Sum and Difference Formulas - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 8.5 Double-angle and Half-angle Formulas - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 8.7-8.8 Trig Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 9.1 Applications Involving Right Triangles - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 9.2 The Law of Sines - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 9.3 The Law of Cosines - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 9.4 Area of a Triangle - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 10.1 Polar Coordinates - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 10.2 Polar Graphs (Part 1) - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 10.2 Polar Graphs (Part 2) - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 10.4 Vectors (Part 1) - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 10.4 Vectors (Part 2) - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 11.2 The Parabola - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 11.3 The Ellipse - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 11.4 The Hyperbola - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 11.7 Plane Curves and Parametric Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 12.1 Systems of Linear Equations - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Algebra & Trigonometry - 12.5 Partial Fraction Decomposition - P.Rouse, Karla Neal, G.Fitch Professor(Louisiana State University) 2009-00-00
Opening Derive for Windows - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Entering Algebraic Expressions and Constants - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Functions - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Basic Graphing - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Substituting - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Using `Solve' - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Differentiating and Integrating - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Limits - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
More about Graphing - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
The Vector Function - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Iterates, applied to non-overlapping generations - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Matrix Operations - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Inserting Text Objects, Families of Tangent Lines - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
Euler's Method, Foxes and Hares - Karl Heinz Dovermann Professor(University of Hawaii) 2009-00-00
DNA Topology - Lecture 3 (Part 1) - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 3 (part 2) - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 4 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 5 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 6 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 7 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 8 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 9 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 10 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 11 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 12 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 13 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 14 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 15 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 16 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 17 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 19 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 20 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 21 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 22 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 23 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
DNA Topology - Lecture 24 - Mariel Vazquez Professor(San Francisco State University) 2009-00-00
A lecture from Colloquia - Cosmic Origins: How Unseen Forces Led to the Rise of Stars, Planets, and Carbon - Andisheh Mahdavi Professor(San Francisco State University) 2009-00-00
A lecture from Colloquia - Diophantine approximation on the Cantor set, generalizations, and open problems - Barak Weiss Professor(San Francisco State University) 2009-00-00
A lecture from Colloquia - Binomial Primary Decomposition - Laura Matusevich Professor(San Francisco State University) 2009-00-00
A lecture from Colloquia - A mathematics textbook of the future - Arek Goetz Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 2 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 4 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 5 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 6 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 7 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 8 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 9 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 11 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 12 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 13 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 14 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 15 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 16 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 17 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 18 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 19 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 20 - Federico Ardila Professor(San Francisco State University) 2009-00-00
A lecture from Combinatorial Commutative Algebra - Lecture 21 - Federico Ardila Professor(San Francisco State University) 2009-00-00
Back to top of page 2008A Wilsonian point of view on renormalization of quantum field theories - Kevin Costello (Clay Mathematics Institute) 2008-00-00 Clay Mathematics Institute(CMI)
A generalized Fredholm theory and some new ideas in nonlinear analysis and geometry - Helmut Hofer (Clay Mathematics Institute) 2008-00-00 Clay Mathematics Institute(CMI)
Local integrability of holomorphic functions - János Kollár (Clay Mathematics Institute) 2008-00-00 Clay Mathematics Institute(CMI)
Monopoles, closed Reeb orbits and spectral flow: Taubes' work on the Weinstein conjecture - Tom Mrowka () 2008-00-00 Clay Mathematics Institute(CMI)
Probabilistic reasoning in quantitative geometry - Assaf Naor (Clay Mathematics Institute) 2008-00-00 Clay Mathematics Institute(CMI)
Curve counting via stable pairs in the derived category - Rahul Pandharipande (Clay Mathematics Institute) 2008-00-00 Clay Mathematics Institute(CMI)
Quantum gravity and the Schramm-Loewner evolution - Scott Sheffield (Clay Mathematics Institute) 2008-00-00 Clay Mathematics Institute(CMI)
Hodge structures, cohomology algebras and the Kodaira problem - Claire Voisin (Clay Mathematics Institute) 2008-00-00 Clay Mathematics Institute(CMI)
Topological Automorphic Forms - Lawson, Tyler (University of Minnesota) 2008-00-00
Topological logarithmic structures II - Rognes, John (University of Oslo) 2008-00-00
- Thorpe, Michael (Arizona State University) 2008-00-00
Classical modular forms and associated Galois representations in the light of automorphic representations of GL(2) - Skinner, Christopher (Princeton University) 2008-00-00
Automorphic representations of GL(n) and classical groups - Cogdell, James (Ohio State University) 2008-00-00
Introduction to Langlands reciprocity for Galois representations - Harris, Michael (Universite de Paris 7) 2008-00-00
Introduction to Langlands functoriality for classical groups - Gee, Toby (Northwestern University) 2008-00-00
Introduction to representation theory of p-adic classical groups - Minguez, Alberto (University of East Anglia) 2008-00-00
Introduction to harmonic analysis on p-adic groups - Arthur, James (University of Toronto) 2008-00-00
Unitary groups and discrete series representation - Shelstad, Diana (Rutgers University) 2008-00-00
Local Langlands correspondence for GL(n) over p-adic fields - Harris, Michael (Universite de Paris 7) 2008-00-00
The trace formula for cocompact groups - Bella?che, Joel (Brandeis University) 2008-00-00
The simple trace formula - Labesse, Jean-Pierre (Universite Aix-Marseille II) 2008-00-00
Applications of the simple trace formula - Lapid, Erez (Hebrew University) 2008-00-00
Introduction to stable conjugacy - Hales, Thomas C. (University of Pittsburgh) 2008-00-00
The stable trace formula part I - Shin, Sug Woo (Institute for Advanced Study) 2008-00-00
The stable trace formula part II - Labesse, Jean-Pierre (Universite Aix-Marseille II) 2008-00-00
Endoscopic transfer of unramified representations - Bella?che, Joel (Brandeis University) 2008-00-00
Comments (Stable Trace Formula) - Harris, Michael (Universite de Paris 7) 2008-00-00
Endoscopy for real groups - Shelstad, Diana (Rutgers University) 2008-00-00
Course Introduction 1.1 Four ways to represent a function 1.2 Mathematical Models 1.3 New Functions from Old (graph shifts, composite functions) - John Griggs Professor(North Carolina State University.) 2008-00-00
1.1 Four ways to represent a function 1.2 Mathematical Models 1.3 New Functions from Old (graph shifts, composite functions) - John Griggs Professor(North Carolina State University.) 2008-00-00
1.1 Four ways to represent a function (Symmetry, Increasing - Decreasing) 1.2 Mathematical Models (polynomials, asymptotes, intercepts, power, log, transcendental) - John Griggs Professor(North Carolina State University.) 2008-00-00
1.2 Mathematical Models (Inverse) Appendix B Coordinate Geometry (Lines, Circles) - John Griggs Professor(North Carolina State University.) 2008-00-00
Questions Covering 1.1 through 1.5 Appendix B Coordinate Geometry (Conic Sections) - John Griggs Professor(North Carolina State University.) 2008-00-00
Appendix B Coordinate Geometry (Conic Sections) cont. 1.5 Exponential Functions - John Griggs Professor(North Carolina State University.) 2008-00-00
1.5 Exponential Functions cont. (e, hyperbolic) 1.6 Inverse Functions and Logs - John Griggs Professor(North Carolina State University.) 2008-00-00
Question on Inverse Problem 1.7 Parametric Curves (plotting, eliminating t, cycloid) 2.1 Tangent and Velocity problems (Secant and Tangent slopes) - John Griggs Professor(North Carolina State University.) 2008-00-00
Question on Inverse Problem 1.7 Parametric Curves (plotting, eliminating t, cycloid) 2.1 Tangent and Velocity problems (Secant and Tangent slopes) - John Griggs Professor(North Carolina State University.) 2008-00-00
2.2 The limit of a function (cont) 2.3 Calculating the limits using the limit laws - John Griggs Professor(North Carolina State University.) 2008-00-00
2.3 Calculating the limits using the limit laws cont. (Squeeze Theorem) 2.4 Continuity - John Griggs Professor(North Carolina State University.) 2008-00-00
2.4 Continuity cont. (Intermediate Value Theorem) 2.5 Limits Involving Infinity - John Griggs Professor(North Carolina State University.) 2008-00-00
2.5 Limits Involving Infinity (cont.) 2.6 Tangents, Velocities and Other Rates of Change - John Griggs Professor(North Carolina State University.) 2008-00-00
2.6 Tangents, Velocities and Other Rates of Change cont (Estimates) Instantaneous Rate of Change 2.7 Derivatives (Definition of derivative) - John Griggs Professor(North Carolina State University.) 2008-00-00
2.7 Derivatives cont (Higher Order Derivatives) Review for Test #1 - John Griggs Professor(North Carolina State University.) 2008-00-00
2.8 Derivative as a Function - John Griggs Professor(North Carolina State University.) 2008-00-00
2.8 Derivative as a Function cont 2.9 What does f' say about f - John Griggs Professor(North Carolina State University.) 2008-00-00
2.9 What does f' say about f cont 3.1 Derivatives of Polynomials and Exponential Functions - John Griggs Professor(North Carolina State University.) 2008-00-00
Review of several questions that were on Test 1 (Fall 2008) 3.1 Derivatives of Polynomials and Exponential Functions cont - John Griggs Professor(North Carolina State University.) 2008-00-00
3.2 Product and Quotient Rules - John Griggs Professor(North Carolina State University.) 2008-00-00
3.4 Derivatives of Trigonometric Functions - John Griggs Professor(North Carolina State University.) 2008-00-00
3.4 Derivatives of Trigonometric Functions cont (Examples) 3.5 Chain Rule - John Griggs Professor(North Carolina State University.) 2008-00-00
3.5 Chain Rule cont (Examples, Parametric Equations) - John Griggs Professor(North Carolina State University.) 2008-00-00
3.5 Chain Rule cont (Examples) 3.6 Implicit Differentiation - John Griggs Professor(North Carolina State University.) 2008-00-00
3.6 Implicit Differentiation cont (Examples, Derivative of Inverse Trigonometric Functions) - John Griggs Professor(North Carolina State University.) 2008-00-00
3.6 Implicit Differentiation cont (Orthogonal Trajectories) - John Griggs Professor(North Carolina State University.) 2008-00-00
3.7 Derivatives of Logarithmic Functions - John Griggs Professor(North Carolina State University.) 2008-00-00
Review for Test #2 - John Griggs Professor(North Carolina State University.) 2008-00-00
3.8 Linear Approximation and Derivatives - John Griggs Professor(North Carolina State University.) 2008-00-00
4.1 Related Rates (Method , Examples) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.1 Related Rates (Examples) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.1 Related Rates (Example) 4.2 Maximum and Minimum Values - John Griggs Professor(North Carolina State University.) 2008-00-00
4.2 Maximum and Minimum Values cont 4.3 Derivative and the Shapes of Curves (f', Mean Value Theorem) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.2 Maximum and Minimum Values cont 4.3 Derivative and the Shapes of Curves (Mean Value Theorem) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.3 Derivative and the Shapes of Curves cont - John Griggs Professor(North Carolina State University.) 2008-00-00
4.3 Derivative and the Shapes of Curves cont (examples) 4.5 Intermediate Forms and L'Hopitals Rule (0/0, Infinity/Infinity) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.5 Intermediate Forms and L'Hopitals Rule cont (0/0, Infinity/Infinity, other forms) Intro to Optimization Problems - John Griggs Professor(North Carolina State University.) 2008-00-00
4.6 Optimization Problems (Method, Examples) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.6 Optimization Problems (Examples) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.6 Optimization Problems (Examples) - John Griggs Professor(North Carolina State University.) 2008-00-00
4.6 Optimization Problems (Example) 4.8 Newton's Method - John Griggs Professor(North Carolina State University.) 2008-00-00
4.8 Newton's Method cont - John Griggs Professor(North Carolina State University.) 2008-00-00
Review for Test #3 - John Griggs Professor(North Carolina State University.) 2008-00-00
4.9 Antiderivatives - John Griggs Professor(North Carolina State University.) 2008-00-00
4.9 Antiderivatives (Problems) Appendix F Sigma Notation - John Griggs Professor(North Carolina State University.) 2008-00-00
Appendix F Sigma Notation (Problem) 5.1 Areas and Distance - John Griggs Professor(North Carolina State University.) 2008-00-00
5.2 Definite Integral (Reimann Sum) - John Griggs Professor(North Carolina State University.) 2008-00-00
5.2 Definite Integral - John Griggs Professor(North Carolina State University.) 2008-00-00
5.3 Evaluating Definite Integrals - John Griggs Professor(North Carolina State University.) 2008-00-00
Review of several questions that were on Test 3 (Fall 2008) 5.3 Evaluating Definite Integrals 5.4 Fundamental Theorem of Calculus - John Griggs Professor(North Carolina State University.) 2008-00-00
5.5 The substitution Rule - John Griggs Professor(North Carolina State University.) 2008-00-00
5.5 The substitution Rule - John Griggs Professor(North Carolina State University.) 2008-00-00
5.6 Integration by Parts - John Griggs Professor(North Carolina State University.) 2008-00-00
5.6 Integration by Parts cont. 5.7 and Appendix G Partial Fractions Case #1 Linear Factors in Denominator (none are repeated) Case #2 Linear Factors in Denominator (some are repeated - squared, cubed, etc.) - John Griggs Professor(North Carolina State University.) 2008-00-00
5.7 and Appendix G Partial Fractions cont. Case #2 Liner Factors in Denominator (some are repeated - squared, cubed, etc.) Case #3 and 4 Irreducible Quadratic Factor in Denominator 5.7 Partial Fractions when Numerator is greater than Denominator - John Griggs Professor(North Carolina State University.) 2008-00-00
5.7 Trigonometric Integrals Cos and Sin with One or more as Odd Powers Cos and Sin with all Even Powers Intro to Sec and Tan - John Griggs Professor(North Carolina State University.) 2008-00-00
5.7 Trigonometric Integrals Sec and Tan Review for Test 4 - John Griggs Professor(North Carolina State University.) 2008-00-00
5.7 Trigonometric Substitution - John Griggs Professor(North Carolina State University.) 2008-00-00
Review of several questions that were on Test 4 (Fall 2008) - John Griggs Professor(North Carolina State University.) 2008-00-00
5.8 Table of Integrals - John Griggs Professor(North Carolina State University.) 2008-00-00
5.8 Table of Integrals cont. - John Griggs Professor(North Carolina State University.) 2008-00-00
Final Exam Review - John Griggs Professor(North Carolina State University.) 2008-00-00
Equations and Functions - Tom Lada Professor(North Carolina State University) 2008-00-00
Slope and Linear Functions - Tom Lada Professor(North Carolina State University) 2008-00-00
Other Functions - Tom Lada Professor(North Carolina State University) 2008-00-00
Limits and Continuity - Tom Lada Professor(North Carolina State University) 2008-00-00
Limits, Algebraically - Tom Lada Professor(North Carolina State University) 2008-00-00
Difference Quotients - Tom Lada Professor(North Carolina State University) 2008-00-00
Derivatives - Tom Lada Professor(North Carolina State University) 2008-00-00
Power, Sum-Difference Rules - Tom Lada Professor(North Carolina State University) 2008-00-00
Instantaneous Rate of Change - Tom Lada Professor(North Carolina State University) 2008-00-00
Review - Tom Lada Professor(North Carolina State University) 2008-00-00
Product and Quotient Rules - Tom Lada Professor(North Carolina State University) 2008-00-00
Chain Rule - Tom Lada Professor(North Carolina State University) 2008-00-00
Higher Order Derivatives - Tom Lada Professor(North Carolina State University) 2008-00-00
First Derivative Test for Relative Extrema - Tom Lada Professor(North Carolina State University) 2008-00-00
Second Derivative Test - Tom Lada Professor(North Carolina State University) 2008-00-00
Graph Sketching - Tom Lada Professor(North Carolina State University) 2008-00-00
Graph Sketching - Tom Lada Professor(North Carolina State University) 2008-00-00
Absolute Max and Min - Tom Lada Professor(North Carolina State University) 2008-00-00
Max and Min - Tom Lada Professor(North Carolina State University) 2008-00-00
Review - Tom Lada Professor(North Carolina State University) 2008-00-00
Exponential Functions - Tom Lada Professor(North Carolina State University) 2008-00-00
Logarithmic Functions - Tom Lada Professor(North Carolina State University) 2008-00-00
Exponential Growth - Tom Lada Professor(North Carolina State University) 2008-00-00
Exponential Decay - Tom Lada Professor(North Carolina State University) 2008-00-00
a x , Log a x - Tom Lada Professor(North Carolina State University) 2008-00-00
Antiderivatives - Tom Lada Professor(North Carolina State University) 2008-00-00
Area - Tom Lada Professor(North Carolina State University) 2008-00-00
Accumulations - Tom Lada Professor(North Carolina State University) 2008-00-00
Definite Integrals - Tom Lada Professor(North Carolina State University) 2008-00-00
Review - Tom Lada Professor(North Carolina State University) 2008-00-00
Integration by Substitution - Tom Lada Professor(North Carolina State University) 2008-00-00
Consumer, Producer Surplus - Tom Lada Professor(North Carolina State University) 2008-00-00
Continuous, Money Flow - Tom Lada Professor(North Carolina State University) 2008-00-00
Improper Integrals - Tom Lada Professor(North Carolina State University) 2008-00-00
Volumes - Tom Lada Professor(North Carolina State University) 2008-00-00
Differential Equations - Tom Lada Professor(North Carolina State University) 2008-00-00
Partial Derivatives - Tom Lada Professor(North Carolina State University) 2008-00-00
Second Order Partial Derivatives - Tom Lada Professor(North Carolina State University) 2008-00-00
Introduction to functoriality for classical groups - Cogdell, James Professor(Ohio State University) 2008-00-00
Functorial transfer for classical groups statements - Arthur, James Professor(University of Toronto) 2008-00-00
Functorial transfer for classical groups - sketch of proofs - Arthur, James Professor(University of Toronto) 2008-00-00
Simple stable base change and descent for U(n) following Labesse - Harris, Michael Professor(Universite de Paris 7) 2008-00-00
Introduction to Shimura varieties - Fargues, Laurent Professor(Universite Paris-Sud) 2008-00-00
Integral models of PEL Shimura varieties - Fargues, Laurent Professor(Universite Paris-Sud) 2008-00-00
Statement of the Counting Point Formula - Morel, Sophie Professor(Institute for Advanced Study) 2008-00-00
Outline of the proof of counting point theorem - Morel, Sophie Professor(Institute for Advanced Study) 2008-00-00
Newton stratification of special fibers of PEL Shimura varieties - Mantovan, Elena Professor(California Institute of Technology) 2008-00-00
Points on special fibers of PEL Shimura varieties and introduction to vanishing cycles - Shin, Sug Woo Professor(Institute for Advanced Study) 2008-00-00
On the cohomology of certain non-compact Shimura varieties - Morel, Sophie Professor(Institute for Advanced Study) 2008-00-00
Functorial transfer for classical groups I - Arthur, James Professor(University of Toronto) 2008-00-00
Stable simple base change for unitary groups - Labesse, Jean-Pierre Professor(Universite Aix-Marseille II) 2008-00-00
Simple endoscopic transfer for unitary groups - Clozel, Laurent Professor(Universite Paris-Sud) 2008-00-00
Endoscopic tempered points on unitary eigenvarieties - Bella?che, Joel Professor(Brandeis University) 2008-00-00
Functorial transfer for classical groups II - Arthur, James Professor(University of Toronto) 2008-00-00
Introduction to B.C. Ngo's proof - Dac Tuan, Ngo Professor(Universite Paris-Nord) 2008-00-00
The fundamental lemma for weighted orbital integrals - Chaudouard, Pierre-Henri Professor(Universite Paris-Sud) 2008-00-00
Change of characteristic for the fundamental lemma - Hales, Thomas C. Professor(University of Pittsburgh) 2008-00-00
Le lemme fondamental tordu pour les integrales orbitales ponderees - Waldspurger, Jean-Loup Professor(Institut de Mathematiques de Jussieu) 2008-00-00
Local Arthur packets - Moeglin, Colette Professor(Institut de Mathematiques de Jussieu) 2008-00-00
On some aspects of Arthurs non-invariant trace formula - Lapid, Erez Professor(Hebrew University) 2008-00-00
Integral models for toroidal compactifications of Shimura varieties - Mantovan, Elena Professor(California Institute of Technology) 2008-00-00
The p-adic geometry of moduli spaces of abelian varieties and p-divisible groups - Fargues, Laurent Professor(Universite Paris-Sud) 2008-00-00
Test functions for some Shimura varieties with bad reduction - Haines, Thomas Professor(University of Maryland) 2008-00-00
Construction of Galois representations - Shin, Sug Woo Professor(Institute for Advanced Study) 2008-00-00
Conformal field theory and modular differential operators for weak Jacobi forms - Keller, Christoph Professor(Eidgenossische Technische Hochschule Zurich) 2008-00-00
Binary Matroid Minors - Geelen, Jim Professor(University of Waterloo) 2008-00-00
Kt-minors - Thomas, Robin Professor(Georgia Institute of Technology) 2008-00-00
High energy estimates on the analytic continuation of the resolvent and wave propagation on the De Sitter-Schwarzschild space - Vasy, Andras Professor(Stanford University) 2008-00-00
Distribution of resonances on locally symmetric spaces of finite volume - Muller, Werner Professor(Universitat Bonn) 2008-00-00
Hamilton paths in vertex-transitive graphs - Alspach, Brian Professor(University of Newcastle) 2008-00-00
Two variants of Ramsey's theorem - Hirst, Jeffry Professor(Appalachian State University) 2008-00-00
The Goedel Hierarchy and Reverse Mathematics - Simpson, Stephen Professor(Pennsylvania State University) 2008-00-00
Single-variable Calculus - 1. Limits and Graphs - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 2. Calculation of Limits - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 3. Trigonometric Limits - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 4. Continuity - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 5. The Derivative - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 6. Calculation of Derivatives - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 7. Derivatives of Trigonometric Functions - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 8. Leibniz Notation and the Chain Rule - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 9. Rates of Change and Related Rates - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 10. Implicit Differentiation - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - ET1. e.x and ln x - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - ET2. Inverse Trig Functions - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 11. Rectilinear Motion - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 12. Higher-Order Derivatives - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 13. The Mean-Value Theorem and Related Results - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 14. Critical Numbers and the First Derivative Test - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 15. Concavity and the Second Derivative Test - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 16. Limits at ±∞ and Horizontal Asymptotes - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 17. Curve Sketching - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 18. Extreme Values on Intervals - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 19. Applied Optimization Problems - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 20. Newton's Method - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 21. The Area Under a Curve - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 22. The Integral - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 23. The Fundamental Theorem of Calculus - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 24. Antidifferentiation and Inde?nite Integrals - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 25. Change of Variables - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 26. Areas Between Curves - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 27. Volumes I - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 28. Volumes II - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 29. Volumes III - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 30. The Centroid of a Planar Region - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 31. The Natural Logarithm - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 32. The Exponential Function - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 33. The Inverse Trigonometric Functions - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 34. Integration by Parts - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 35. Integration of Powers and Products of Sine and Cosine - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 36. Integration of Powers and Products of Secant and Tangent, Cosecant and Cotangent - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 37. Trigonometric Substitutions - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 38. Partial Fraction Expansions - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 39. Numerical Integration - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 40. Arc Length and Surface Area - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 41. Polar Coordinates and Graphs - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 42. Areas and Lengths Using Polar Coordinates - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 45. Improper Integrals - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 46. Indeterminate Forms and L?H?pital?s Rule - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 47. Sequences I - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 48. Sequences II - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 49. Series - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 50. The Integral Test - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 51. Comparison Tests - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 52. Alternating Series and Absolute Convergence - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 53. Power Series - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 54. Taylor and Maclaurin Series - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
Single-variable Calculus - 55. Taylor's Theorem - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
1.Introduction - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
2.First-order Des 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
3.First-order Des 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
4.First-order Des 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
5.First-order Des 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
6.First-order Des 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
7.Linear Second- and Higher-order DEs 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
8.Linear Second- and Higher-order DEs 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
9.Linear Second- and Higher-order DEs 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
10.Linear Second- and Higher-order DEs 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
11.Linear Second- and Higher-order DEs 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
12.Linear Second- and Higher-order DEs 6 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
13.Linear Second- and Higher-order DEs 7 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
14.Laplace Transforms 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
15.Laplace Transforms 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
16.Laplace Transforms 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
17.Linear Algebra 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
18.Linear Algebra 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
19.Linear Algebra 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
20.Linear Algebra 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
21.Linear Algebra 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
22.Linear Algebra 6 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
23.Linear Differential Systems 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
24.Linear Differential Systems 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
25.Linear Differential Systems 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
26.Linear Differential Systems 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
27.Exponential Growth & Decay; Logistic Growth 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
28.Exponential Growth & Decay; Logistic Growth 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
29.Exponential Growth & Decay; Logistic Growth 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
30.Exponential Growth & Decay; Logistic Growth 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
31.Exponential Growth & Decay; Logistic Growth 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
32.Draining Tanks 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
33.Draining Tanks 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
34.Draining Tanks 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
35.Draining Tanks 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
36.Draining Tanks 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
37.Spring-Mass Systems 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
38.Spring-Mass Systems 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
39.Spring-Mass Systems 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
40.Spring-Mass Systems 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
41.Spring-Mass Systems 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
42.Spring-Mass Systems 6 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
43.Spring-Mass Systems 7 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
44.Spring-Mass Systems 8 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
45.Spring-Mass Systems 9 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
46.Spring-Mass Systems 10 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
47.Spring-Mass Systems 11 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
48.Spring-Mass Systems 12 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
49.Spring-Mass Systems 13 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
50.Spring-Mass Systems 14 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
51.Spring-Mass Systems 15 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
52.Spring-Mass Systems 16 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
53.Approximation 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
54.Approximation 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
55.Approximation 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
56.Approximation 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
57.Graphs and Phase Plane Orbits 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
58.Graphs and Phase Plane Orbits 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
59.Bifurcations 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
60.Bifurcations 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
61.Biological Systems 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
62.Biological Systems 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
63.Biological Systems 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
64.Biological Systems 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
65.Biological Systems 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
66.Biological Systems 6 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
67.Biological Systems 7 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
68.Biological Systems 8 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
69.Mechanical Systems 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
70.Mechanical Systems 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
71.Mechanical Systems 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
72.Mechanical Systems 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
73.Mechanical Systems 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
74.Mechanical Systems 6 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
75.Mechanical Systems 7 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
76.Mechanical Systems 8 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
77.Mechanical Systems 9 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
78.Mechanical Systems 10 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
79.Mechanical Systems 11 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
80.Mechanical Systems 12 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
81.Mechanical Systems 13 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
82.Mechanical Systems 14 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
83.Mechanical Systems 15 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
84.Three Dimensional Systems 1 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
85.Three Dimensional Systems 2 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
86.Three Dimensional Systems 3 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
87.Three Dimensional Systems 4 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
88.Three Dimensional Systems 5 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
89.Three Dimensional Systems 6 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
90.Three Dimensional Systems 7 - Selwyn Hollis Professor(Armstrong Atlantic State University) 2008-00-00
A millennium of mathematical puzzles - Robin Wilson Professor(Gresham College) 2008-00-00
From Hilbert\'s problems to the future - Robin Wilson Professor(Gresham College) 2008-00-00
400 years of geometry at Gresham College
- Robin Wilson Professor(Gresham College) 2008-00-00
Topics in the History of Financial Mathematics: Early commerce to chaos in modern stock markets - Part 1 - Mark Davis Professor(Gresham College) 2008-00-00
Topics in the History of Financial Mathematics: Early commerce to chaos in modern stock markets - Part 2 - Mark Davis Professor(Gresham College) 2008-00-00
Topics in the History of Financial Mathematics: Early commerce to chaos in modern stock markets - Part 3 - Mark Davis Professor(Gresham College) 2008-00-00
Topics in the History of Financial Mathematics: Early commerce to chaos in modern stock markets - Part 4 - Mark Davis Professor(Gresham College) 2008-00-00
Computational Science and Engineering I 1 Four special matrices - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 2 Recitation 1 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 3 Differential eqns and Difference eqns - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 4 Solving a linear system - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 5 Delta function day! - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 6 Recitation 2 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 7 Eigenvalues (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 8 Eigenvalues (part 2); positive definite (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 9 Positive definite day! - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 10 Recitation 3 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 11 Springs and masses; the main framework - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 12 Oscillation - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 13 Recitation 4 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 14 Finite differences in time; least squares (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 15 Least squares (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 16 Graphs and networks - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 17 Recitation 5 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 18 Kirchhoff\'s Current Law - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 19 Exam Review - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 20 Recitation 6 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 21 Trusses and ATCA - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 22 Trusses (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 23 Finite elements in 1D (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 24 Recitation 7 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 25 Finite elements in 1D (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 26 Quadratic/cubic elements - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 27 Element matrices; 4th order bending equations - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 28 Recitation 8 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 29 Boundary conditions, splines, gradient and divergence (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 30 Gradient and divergence (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 31 Laplace\'s equation (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 32 Recitation 9 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 33 Laplace\'s equation (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 34 Fast Poisson solver (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 35 Fast Poisson solver (part 2); finite elements in 2D (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 36 Recitation 10 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 37 Finite elements in 2D (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 38 Fourier series (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 39 Recitation 11 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 40 Fourier series (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 41 Discrete Fourier series - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 42 Examples of discrete Fourier transform; fast Fourier transform; convolution (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 43 Recitation 12 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 44 Convolution (part 2); filtering - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 45 Filters; Fourier integral transform (part 1) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 46 Fourier integral transform (part 2) - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 47 Recitation 13 - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 48 Convolution equations: deconvolution; convolution in 2D - Gilbert Strang Professor(MIT) 2008-00-00
Computational Science and Engineering I 49 Sampling Theorem - Gilbert Strang Professor(MIT) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 1 The quantum cohomology of Fano stacks (I) - Alessio Corti (Imperial College London) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 2 Derived equivalences of K3 surfaces and their deformations - Daniel Huybrechts (Bonn University and Imperial College London) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 3 The quantum cohomology of Fano stacks (II) - Alessio Corti (Imperial College London) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 4 Algebro-geometric counting invariants (I) - Richard Thomas (Imperial College London) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 5 Poisson deformations and symplectic varieties - Yoshinori Namikawa (Osaka University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 6 Stringy cohomology of the symmetric product of an orbifold - Tomoo Matsumura (Max Planck Institute for Mathematics) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 7 On relationships between multiplier ideal subschemes and Futaki invariant on toric Fano manifolds - Yuji Sano (Institut des Hautes ?tudes Scientifiques) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 8 The Futaki invariant and Hamiltonian dynamics - Egor Shelukhin (Tel Aviv University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 9 Generalized geometry (I) Skew torsion - Nigel Hitchin (Oxford University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 10 Algebro-geometric counting invariants (II) - Richard Thomas (Imperial College London) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 11 Quantum cohomology and flops of rationally connected varieties - Andrei Mustata (University College Cork) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 12 K?hler-Ricci solitons in Sasakian geometry - Toshiki Mabuchi (Osaka University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 13 Generalized geometry (II) Generalized complex structures - Nigel Hitchin (Oxford University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 14 Algebro-geometric counting invariants (III) - Richard Thomas (Imperial College London) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 15 Stability conditions and Stokes factors - Tom Bridgeland (Sheffield University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 16 On remarks of terminations of D-flops on symplectic manifolds - Daisuke Matsushita (Hokkaido University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 17 Crepant resolution via Frobenius morphisms - Takehiko Yasuda (Kyoto University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 18 Generalized geometry (III) Holomorphic Poisson manifolds - Nigel Hitchin (Oxford University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 19 Algebro-geometric counting invariants (IV) - Richard Thomas (Imperial College London) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 20 Enumerative invariants of non-commutative Calabi-Yau algebras - Bal?zs Szendr?i (Oxford University) 2008-00-00
UK-Japan Winter School(Algebraic and Symplectic Geometry) 21 Deformations of generalized K?hler structures, Poisson structures and bihermitian structures - Ryushi Goto (Osaka University) 2008-00-00
Financial Markets - 1. Finance and Insurance as Powerful Forces in Our Economy and Society - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 2. The Universal Principle of Risk Management: Pooling and the Hedging of Risks - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 3. Technology and Invention in Finance - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 4. Portfolio Diversification and Supporting Financial Institutions (CAPM Model) - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 5. Insurance: The Archetypal Risk Management Institution - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 6. Efficient Markets vs. Excess Volatility - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 7. Behavioral Finance: The Role of Psychology - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 8. Human Foibles, Fraud, Manipulation, and Regulation - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 9. Guest Lecture by David Swensen - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 10. Debt Markets: Term Structure - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 11. Stocks - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 12. Real Estate Finance and Its Vulnerability to Crisis - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 13. Banking: Successes and Failures - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 14. Guest Lecture by Andrew Redleaf - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 15. Guest Lecture by Carl Icahn - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 16. The Evolution and Perfection of Monetary Policy - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 17. Investment Banking and Secondary Markets - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 18. Professional Money Managers and Their Influence - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 19. Brokerage, ECNs, etc. - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 20. Guest Lecture by Stephen Schwarzman - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 21. Forwards and Futures - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 22. Stock Index, Oil and Other Futures Markets - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 23. Options Markets - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 24. Making It Work for Real People: The Democratization of Finance - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 25. Learning from and Responding to Financial Crisis, Part I (Guest Lecture by Lawrence Summers) - Robert J. Shiller Professor(Yale University) 2008-00-00
Financial Markets - 26. Learning from and Responding to Financial Crisis, Part II (Guest Lecture by Lawrence Summers) - Robert J. Shiller Professor(Yale University) 2008-00-00
A lecture from Coxeter Groups - Lecture 1 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 2 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 3 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 4 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 5 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 6 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 7 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 8 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 9 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 10 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 11 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 12 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 13 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 14 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 15 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 16 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 17 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 18 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 19 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 20 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 21 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 22 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 23 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 24 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 25 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 26 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 27 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 28 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 29 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 30 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 31 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 32 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 33 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 34 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 35 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 36 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 37 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 38 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 39 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 40 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 41 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Coxeter Groups - Lecture 42 - Federico Ardila Professor(San Francisco State University) 2008-00-00
A lecture from Colloquia - Analysis on the Worm Domain - Steven Krantz Professor(San Francisco State University) 2008-00-00
Back to top of page 2007Dot product - Denis Auroux Professor(MIT) 2007-00-00
Determinants; cross product - Denis Auroux Professor(MIT) 2007-00-00
Matrices; inverse matrices - Denis Auroux Professor(MIT) 2007-00-00
Square systems; equations of planes - Denis Auroux Professor(MIT) 2007-00-00
Parametric equations for lines and curves - Denis Auroux Professor(MIT) 2007-00-00
Velocity, acceleration - Kepler''s second law - Denis Auroux Professor(MIT) 2007-00-00
Review - Denis Auroux Professor(MIT) 2007-00-00
Level curves; partial derivatives; tangent plane approximation - Denis Auroux Professor(MIT) 2007-00-00
Max-min problems; least squares - Denis Auroux Professor(MIT) 2007-00-00
Second derivative test; boundaries and infinity - Denis Auroux Professor(MIT) 2007-00-00
Differentials; chain rule - Denis Auroux Professor(MIT) 2007-00-00
Gradient; directional derivative; tangent plane - Denis Auroux Professor(MIT) 2007-00-00
Lagrange multipliers - Denis Auroux Professor(MIT) 2007-00-00
Non-independent variables - Denis Auroux Professor(MIT) 2007-00-00
Partial differential equations; review - Denis Auroux Professor(MIT) 2007-00-00
Double integrals - Denis Auroux Professor(MIT) 2007-00-00
Double integrals in polar coordinates; applications - Denis Auroux Professor(MIT) 2007-00-00
Change of variables - Denis Auroux Professor(MIT) 2007-00-00
Vector fields and line integrals in the plane - Denis Auroux Professor(MIT) 2007-00-00
Path independence and conservative fields - Denis Auroux Professor(MIT) 2007-00-00
Gradient fields and potential functions - Denis Auroux Professor(MIT) 2007-00-00
Green's theorem - Denis Auroux Professor(MIT) 2007-00-00
Flux; normal form of Green''s theorem - Denis Auroux Professor(MIT) 2007-00-00
Simply connected regions; review - Denis Auroux Professor(MIT) 2007-00-00
Triple integrals in rectangular and cylindrical coordinates - Denis Auroux Professor(MIT) 2007-00-00
Spherical coordinates; surface area - Denis Auroux Professor(MIT) 2007-00-00
Vector fields in 3D; surface integrals and flux - Denis Auroux Professor(MIT) 2007-00-00
Divergence theorem - Denis Auroux Professor(MIT) 2007-00-00
Divergence theorem (cont.): applications and proof - Denis Auroux Professor(MIT) 2007-00-00
Line integrals in space, curl, exactness and potentials - Denis Auroux Professor(MIT) 2007-00-00
Stokes'' theorem - Denis Auroux Professor(MIT) 2007-00-00
Stokes'' theorem (cont.); review - Denis Auroux Professor(MIT) 2007-00-00
Topological considerations - Maxwell's equations - Denis Auroux Professor(MIT) 2007-00-00
Final review - Denis Auroux Professor(MIT) 2007-00-00
Final review (cont.) - Denis Auroux Professor(MIT) 2007-00-00
Holomorphic disks and knot invariants - Peter Ozsváth (Columbia University) 2007-00-00 Clay Mathematics Institute(CMI)
Recent progress in higher dimensional algebraic geometry I - Shigefumi Mori (Univeristy of Kyoto, RIMS) 2007-00-00 Clay Mathematics Institute(CMI)
Recent Progress in Highert Dimensional Algebraic Geometry II - Alessio Corti (Imperial College London) 2007-00-00 Clay Mathematics Institute(CMI)
Modularity of 2-dimensional Galois representaions - Mark Kisin (University of Chicago) 2007-00-00 Clay Mathematics Institute(CMI)
The Sato-Tate conjecture - Richard Taylor (Harvard University) 2007-00-00 Clay Mathematics Institute(CMI)
Algebraic dynamics on surfaces - Curtis McMullen Professor(Harvard University) 2007-00-00 Clay Mathematics Institute(CMI)
Dynamics of rational billiards - Alex Eskin (University of Chicago) 2007-00-00 Clay Mathematics Institute(CMI)
Coarse differentiation and quasi-isometries of solvable groups - David Fisher Professor(Indiana University) 2007-00-00 Clay Mathematics Institute(CMI)
The story of pi - Robin Wilson Professor(Gresham College) 2007-00-00
The story of i - Robin Wilson Professor(Gresham College) 2007-00-00
The story of e - Robin Wilson Professor(Gresham College) 2007-00-00
Euler - 300th anniversay lecture - Robin Wilson Professor(Gresham College) 2007-00-00
4000 Years of Geometry - Robin Wilson Professor(Gresham College) 2007-00-00
4000 Years of Algebra - Robin Wilson Professor(Gresham College) 2007-00-00
4000 years of numbers - Robin Wilson Professor(Gresham College) 2007-00-00
Squaring the circle and other impossibilities - Robin Wilson Professor(Gresham College) 2007-00-00
Goedel, Escher, Bach: A Mental Space Odyssey - Introduction - Justin Curry Professor(MIT) 2007-00-00
Goedel, Escher, Bach: A Mental Space Odyssey - Introduction to recursion and fractals - Justin Curry Professor(MIT) 2007-00-00
Goedel, Escher, Bach: A Mental Space Odyssey - Goedel\'s Incompleteness theorem - Justin Curry Professor(MIT) 2007-00-00
Goedel, Escher, Bach: A Mental Space Odyssey - The Meaning of Meaning - Justin Curry Professor(MIT) 2007-00-00
Goedel, Escher, Bach: A Mental Space Odyssey - Apology for the reading - Justin Curry Professor(MIT) 2007-00-00
Goedel, Escher, Bach: A Mental Space Odyssey - Review of Goedel\'s incompleteness theorem - Justin Curry Professor(MIT) 2007-00-00
Game Theory - 1. Introduction: five first lessons - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 2. Putting yourselves into other people\'s shoes - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 3. Iterative deletion and the median-voter theorem - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 4. Best responses in soccer and business partnerships - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 5. Nash equilibrium: bad fashion and bank runs - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 6. Nash equilibrium: dating and Cournot - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 7. Nash equilibrium: shopping, standing and voting on a line - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 8. Nash equilibrium: location, segregation and randomization - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 9. Mixed strategies in theory and tennis - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 10. Mixed strategies in baseball, dating and paying your taxes - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 11. Evolutionary stability: cooperation, mutation, and equilibrium - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 12. Evolutionary stability: social convention, aggression, and cycles - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 13. Sequential games: moral hazard, incentives, and hungry lions - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 14. Backward induction: commitment, spies, and first-mover advantages - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 15. Backward induction: chess, strategies, and credible threats - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 16. Backward induction: reputation and duels - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 17. Backward induction: ultimatums and bargaining - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 18. Imperfect information: information sets and sub-game perfection - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 19. Subgame perfect equilibrium: matchmaking and strategic investments - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 20. Subgame perfect equilibrium: wars of attrition - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 21. Repeated games: cooperation vs. the end game - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 22. Repeated games: cheating, punishment, and outsourcing - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 23. Asymmetric information: silence, signaling and suffering education - Ben Polak Professor(Yale University) 2007-00-00
Game Theory - 24. Asymmetric information: auctions and the winner\'s curse - Ben Polak Professor(Yale University) 2007-00-00
Matroid Theory - Lecture 23 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 24 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 26 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 27 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 28 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 29 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 30 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 31 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 32 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 33 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 34 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 35 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 36 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 37 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 38 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 39 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 40 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 41 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 43 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 44 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 45 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Matroid polytopes as Minkowski sums - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 1 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 2 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 3 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 4 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 5 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 6 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 7 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 8 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 9 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 10 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 11 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 12 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 13 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 14 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 15 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 16 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 17 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 18 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 19 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 20 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 21 - Federico Ardila Professor(San Francisco State University) 2007-00-00
Matroid Theory - Lecture 22 - Federico Ardila Professor(San Francisco State University) 2007-00-00
1 Multivariable Calculus I. Vectors and matrices Dot product - Denis Auroux Professor(MIT) 2007-00-00
2 Multivariable Calculus I. Vectors and matrices Determinants; cross product - Denis Auroux Professor(MIT) 2007-00-00
3 Multivariable Calculus I. Vectors and matrices Matrices; inverse matrices - Denis Auroux Professor(MIT) 2007-00-00
4 Multivariable Calculus I. Vectors and matrices - Square systems; equations of planes - Denis Auroux Professor(MIT) 2007-00-00
5 Multivariable Calculus I. Vectors and matrices - Parametric equations for lines and curves - Denis Auroux Professor(MIT) 2007-00-00
6 Multivariable Calculus I. Vectors and matrices - Velocity, acceleration - Kepler\'s second law - Denis Auroux Professor(MIT) 2007-00-00
7 Multivariable Calculus I. Vectors and matrices - Review - Denis Auroux Professor(MIT) 2007-00-00
8 Multivariable Calculus II. Partial derivatives - Level curves; partial derivatives; tangent plane approximation - Denis Auroux Professor(MIT) 2007-00-00
9 Multivariable Calculus II. Partial derivatives - Max-min problems; least squares - Denis Auroux Professor(MIT) 2007-00-00
10 Multivariable Calculus II. Partial derivatives - Second derivative test; boundaries and infinity - Denis Auroux Professor(MIT) 2007-00-00
11 Multivariable Calculus II. Partial derivatives - Differentials; chain rule - Denis Auroux Professor(MIT) 2007-00-00
12 Multivariable Calculus II. Partial derivatives - Gradient; directional derivative; tangent plane - Denis Auroux Professor(MIT) 2007-00-00
13 Multivariable Calculus II. Partial derivatives - Lagrange multipliers - Denis Auroux Professor(MIT) 2007-00-00
14 Multivariable Calculus II. Partial derivatives - Non-independent variables - Denis Auroux Professor(MIT) 2007-00-00
15 Multivariable Calculus II. Partial derivatives - Partial differential equations; review - Denis Auroux Professor(MIT) 2007-00-00
16 Multivariable Calculus III. Double integrals and line integrals in the plane - Double integrals - Denis Auroux Professor(MIT) 2007-00-00
17 Multivariable Calculus III. Double integrals and line integrals in the plane - Double integrals in polar coordinates; applications - Denis Auroux Professor(MIT) 2007-00-00
18 Multivariable Calculus III. Double integrals and line integrals in the plane - Change of variables - Denis Auroux Professor(MIT) 2007-00-00
19 Multivariable Calculus III. Double integrals and line integrals in the plane - Vector fields and line integrals in the plane - Denis Auroux Professor(MIT) 2007-00-00
20 Multivariable Calculus III. Double integrals and line integrals in the plane - Path independence and conservative fields - Denis Auroux Professor(MIT) 2007-00-00
21 Multivariable Calculus III. Double integrals and line integrals in the plane - Gradient fields and potential functions - Denis Auroux Professor(MIT) 2007-00-00
22 Multivariable Calculus III. Double integrals and line integrals in the plane - Green\'s theorem - Denis Auroux Professor(MIT) 2007-00-00
23 Multivariable Calculus III. Double integrals and line integrals in the plane - Flux; normal form of Green\'s theorem - Denis Auroux Professor(MIT) 2007-00-00
24 Multivariable Calculus III. Double integrals and line integrals in the plane - Simply connected regions; review - Denis Auroux Professor(MIT) 2007-00-00
25 Multivariable Calculus IV. Triple integrals and surface integrals in 3-space - Triple integrals in rectangular and cylindrical coordinates - Denis Auroux Professor(MIT) 2007-00-00
26 Multivariable Calculus IV. Triple integrals and surface integrals in 4-space - Spherical coordinates; surface area - Denis Auroux Professor(MIT) 2007-00-00
27 Multivariable Calculus IV. Triple integrals and surface integrals in 5-space - Vector fields in 3D; surface integrals and flux - Denis Auroux Professor(MIT) 2007-00-00
28 Multivariable Calculus IV. Triple integrals and surface integrals in 6-space - Divergence theorem - Denis Auroux Professor(MIT) 2007-00-00
29 Multivariable Calculus IV. Triple integrals and surface integrals in 7-space - Divergence theorem (cont.): applications and proof - Denis Auroux Professor(MIT) 2007-00-00
30 Multivariable Calculus IV. Triple integrals and surface integrals in 8-space - Line integrals in space, curl, exactness and potentials - Denis Auroux Professor(MIT) 2007-00-00
31 Multivariable Calculus IV. Triple integrals and surface integrals in 9-space - Stokes\' theorem - Denis Auroux Professor(MIT) 2007-00-00
32 Multivariable Calculus IV. Triple integrals and surface integrals in 10-space - Stokes\' theorem (cont.); review - Denis Auroux Professor(MIT) 2007-00-00
33 Multivariable Calculus IV. Triple integrals and surface integrals in 11-space - Topological considerations - Maxwell\'s equations - Denis Auroux Professor(MIT) 2007-00-00
34 Multivariable Calculus IV. Triple integrals and surface integrals in 12-space - Final review - Denis Auroux Professor(MIT) 2007-00-00
35 Multivariable Calculus IV. Triple integrals and surface integrals in 13-space - Final review (cont.) - Denis Auroux Professor(MIT) 2007-00-00
Back to top of page 2006Introduction - Y. Tschinkel () 2006-00-00 Clay Mathematics Institute(CMI)
Rational surfaces over algebraically closed fields - B. Hassett () 2006-00-00 Clay Mathematics Institute(CMI)
Brauer groups, Galois cohomology - A. Kresch () 2006-00-00 Clay Mathematics Institute(CMI)
Hypersurfaces - Y. Tschinkel () 2006-00-00 Clay Mathematics Institute(CMI)
Rational surfaces over non-closed fields I - B. Hassett () 2006-00-00 Clay Mathematics Institute(CMI)
Brauer-Manin obstruction with quaternion algebras - A. Kresch () 2006-00-00 Clay Mathematics Institute(CMI)
Toric varieties I - Y. Tschinkel () 2006-00-00 Clay Mathematics Institute(CMI)
Rational surfaces over non-closed fields II - B. Hassett () 2006-00-00 Clay Mathematics Institute(CMI)
Descent, torsors - A. Kresch () 2006-00-00 Clay Mathematics Institute(CMI)
Toric varieties II - Y. Tschinkel () 2006-00-00 Clay Mathematics Institute(CMI)
Singular Del Pezzo surfaces - B. Hassett () 2006-00-00 Clay Mathematics Institute(CMI)
Hasse principle and Brauer-Manin obstruction - A. Kresch () 2006-00-00 Clay Mathematics Institute(CMI)
Flag varieties - Y. Tschinkel () 2006-00-00 Clay Mathematics Institute(CMI)
Cox rings and universal torsors - B. Hassett () 2006-00-00 Clay Mathematics Institute(CMI)
Further examples - A. Kresch () 2006-00-00 Clay Mathematics Institute(CMI)
Arithmetic of curves: overview - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Tsen-Lang theorem - J. Starr () 2006-00-00 Clay Mathematics Institute(CMI)
Special values of L-functions - C. Popescu () 2006-00-00 Clay Mathematics Institute(CMI)
Faltings' theorem I - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Arithmetic over function fields of curves - J. Starr () 2006-00-00 Clay Mathematics Institute(CMI)
Compactifications of additive groups - Y. Tschinkel () 2006-00-00 Clay Mathematics Institute(CMI)
Circle method I - B. Moroz () 2006-00-00 Clay Mathematics Institute(CMI)
Faltings' Theorem II - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Arithmetic over function fields of surfaces - J. Starr () 2006-00-00 Clay Mathematics Institute(CMI)
Nonabelian descent - D. Harari () 2006-00-00 Clay Mathematics Institute(CMI)
Modular curves and Mazur's Theorem - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Bielliptic surfaces - D. Harari () 2006-00-00 Clay Mathematics Institute(CMI)
Merel's theorem - M. Rebolledo () 2006-00-00 Clay Mathematics Institute(CMI)
Circle method II - B. Moroz () 2006-00-00 Clay Mathematics Institute(CMI)
Merel's theorem, continued - M. Rebolledo () 2006-00-00 Clay Mathematics Institute(CMI)
Enriques surfaces - D. Harari () 2006-00-00 Clay Mathematics Institute(CMI)
Geometry over small fields - F. Bogomolov () 2006-00-00 Clay Mathematics Institute(CMI)
Fermat curves and Wiles' Theorem - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Elliptic curves and modular forms - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Geometry and arithmetic of curves - D. Abramovich () 2006-00-00 Clay Mathematics Institute(CMI)
Equidistribution on the projective line - A. Chambert-Loir () 2006-00-00 Clay Mathematics Institute(CMI)
The theorems of Gross-Zagier and Kolyvagin - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Kodaira dimension - D. Abramovich () 2006-00-00 Clay Mathematics Institute(CMI)
Some diophantine applications of Heegner points - J. Voight () 2006-00-00 Clay Mathematics Institute(CMI)
Proof of Kolyvagin's Theorem - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Campana's program - D. Abramovich () 2006-00-00 Clay Mathematics Institute(CMI)
Arakelov geometry and equidistribution - A. Chambert-Loir () 2006-00-00 Clay Mathematics Institute(CMI)
p-adic uniformisation - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
The minimal model program - D. Abramovich () 2006-00-00 Clay Mathematics Institute(CMI)
Calculating Heegner points via overconvergent modular symbols - M. Greenberg () 2006-00-00 Clay Mathematics Institute(CMI)
Stark-Heegner points - H. Darmon () 2006-00-00 Clay Mathematics Institute(CMI)
Vojta, Campana and ABC - D. Abramovich () 2006-00-00 Clay Mathematics Institute(CMI)
Equidistribution on Berkovich spaces - A. Chambert-Loir () 2006-00-00 Clay Mathematics Institute(CMI)
Introduction: Density of Hecke orbits - F. Oort () 2006-00-00 Clay Mathematics Institute(CMI)
Serre-Tate theory - C.-L. Chai () 2006-00-00 Clay Mathematics Institute(CMI)
The André-Oort conjecture and Manin-Mumford - E. Ullmo () 2006-00-00 Clay Mathematics Institute(CMI)
Theory of displays I - W. Messing () 2006-00-00 Clay Mathematics Institute(CMI)
The Tate-conjecture - F. Oort () 2006-00-00 Clay Mathematics Institute(CMI)
Dieudonné and Cartier modules - C.-L. Chai () 2006-00-00 Clay Mathematics Institute(CMI)
Varieties over finite fields I - B. Poonen () 2006-00-00 Clay Mathematics Institute(CMI)
Theory of displays II - W. Messing () 2006-00-00 Clay Mathematics Institute(CMI)
A conjecture of Manin and the weak Grothendieck conjecture - F. Oort () 2006-00-00 Clay Mathematics Institute(CMI)
Hilbert modular varieties - C.-L. Chai () 2006-00-00 Clay Mathematics Institute(CMI)
Equidistribution of special varieties - E. Ullmo () 2006-00-00 Clay Mathematics Institute(CMI)
Iterated modular symbols I - Y. I. Manin () 2006-00-00 Clay Mathematics Institute(CMI)
Purity and deformations of p-divisible groups - F. Oort () 2006-00-00 Clay Mathematics Institute(CMI)
Varieties over finite fields II - B. Poonen () 2006-00-00 Clay Mathematics Institute(CMI)
Iterated modular symbols II - Yu. I. Manin () 2006-00-00 Clay Mathematics Institute(CMI)
Cartier isomorphism I - D. Kaledin () 2006-00-00
Proof of the density of ordinary Hecke orbits - F. Oort () 2006-00-00 Clay Mathematics Institute(CMI)
Proof of the Grothendieck conjecture - C.-L. Chai () 2006-00-00 Clay Mathematics Institute(CMI)
Iterated modular symbols III - Yu. I. Manin () 2006-00-00 Clay Mathematics Institute(CMI)
Cartier isomorphism II - D. Kaledin () 2006-00-00 Clay Mathematics Institute(CMI)
1. Difference Methods for Ordinary Differential Equations - Gilbert Strang
Professor(MIT) 2006-00-00
2. Finite Differences, Accuracy, Stability, Convergence - Gilbert Strang
Professor(MIT) 2006-00-00
3. The One-way Wave Equation and CFL / von Neumann Stability - Gilbert Strang Professor(MIT) 2006-00-00
4. Comparison of Methods for the Wave Equation - Gilbert Strang
Professor(MIT) 2006-00-00
5. Second-order Wave Equation (including leapfrog) - Gilbert Strang
Professor(MIT) 2006-00-00
6. Wave Profiles, Heat Equation / point source - Gilbert Strang
Professor(MIT) 2006-00-00
7. Finite Differences for the Heat Equation - Gilbert Strang
Professor(MIT) 2006-00-00
8. Convection-Diffusion / Conservation Laws - Gilbert Strang
Professor(MIT) 2006-00-00
9. Conservation Laws / Analysis / Shocks - Gilbert Strang
Professor(MIT) 2006-00-00
10. Shocks and Fans from Point Source - Gilbert Strang
Professor(MIT) 2006-00-00
11. Level Set Method - Gilbert Strang
Professor(MIT) 2006-00-00
12. Matrices in Difference Equations (1D, 2D, 3D) - Gilbert Strang
Professor(MIT) 2006-00-00
13. Elimination with Reordering: Sparse Matrices - Gilbert Strang
Professor(MIT) 2006-00-00
14. Financial Mathematics / Black-Scholes Equation - Gilbert Strang
Professor(MIT) 2006-00-00
15. Iterative Methods and Preconditioners - Gilbert Strang
Professor(MIT) 2006-00-00
16. General Methods for Sparse Systems - Gilbert Strang
Professor(MIT) 2006-00-00
17. Multigrid Methods - Gilbert Strang
Professor(MIT) 2006-00-00
18. Krylov Methods / Multigrid Continued - Gilbert Strang
Professor(MIT) 2006-00-00
19. Conjugate Gradient Method - Gilbert Strang
Professor(MIT) 2006-00-00
20. Fast Poisson Solver - Gilbert Strang
Professor(MIT) 2006-00-00
21. Optimization with constraints - Gilbert Strang
Professor(MIT) 2006-00-00
22. Weighted Least Squares - Gilbert Strang
Professor(MIT) 2006-00-00
23. Calculus of Variations / Weak Form - Gilbert Strang
Professor(MIT) 2006-00-00
24. Error Estimates / Projections - Gilbert Strang
Professor(MIT) 2006-00-00
25. Saddle Points / Inf-sup condition - Gilbert Strang
Professor(MIT) 2006-00-00
26. Two Squares / Equality Constraint Bu = d - Gilbert Strang
Professor(MIT) 2006-00-00
27. Regularization by Penalty Term - Gilbert Strang
Professor(MIT) 2006-00-00
28. Linear Programming and Duality - Gilbert Strang
Professor(MIT) 2006-00-00
29. Duality Puzzle / Inverse Problem / Integral Equations - Gilbert Strang
Professor(MIT) 2006-00-00
1. Introduction - Benedict H. Gross Professor(Havard Univ.) 2006-00-00
2. Pythogorean Triples - Benedict H. Gross Professor(Havard Univ.) 2006-00-00
3. Quadratic and Cubic Equations - Benedict H. Gross Professor(Havard Univ.) 2006-00-00
4. Rational Solutions - Benedict H. Gross Professor(Havard Univ.) 2006-00-00
5. Modular Prime - Benedict H. Gross Professor(Havard Univ.) 2006-00-00
6. Conclusion: Gross-Zagier Theorem - Benedict H. Gross Professor(Havard Univ.) 2006-00-00
7. Audience Question and Answer - Benedict H. Gross Professor(Havard Univ.) 2006-00-00
Introduction - Y. Tschinkel (Mathematisches Institut Georg-August-Universit?t G?ttingen) 2006-00-00
Rational surfaces over algebraically closed fields - B. Hassett (Rice University) 2006-00-00
Brauer groups, Galois cohomology - A. Kresch (University of Pennsylvania) 2006-00-00
Hypersurfaces - Y. Tschinkel (Mathematisches Institut Georg-August-Universit?t G?ttingen) 2006-00-00
Rational surfaces over non-closed fields I - B. Hassett (Rice University) 2006-00-00
Brauer-Manin obstruction with quaternion algebras - A. Kresch (University of Pennsylvania) 2006-00-00
Toric varieties I - Y. Tschinkel (Mathematisches Institut Georg-August-Universit?t G?ttingen) 2006-00-00
Rational surfaces over non-closed fields II - B. Hassett (Rice University) 2006-00-00
Descent, torsors - A. Kresch (University of Pennsylvania) 2006-00-00
Toric varieties II - Y. Tschinkel (Mathematisches Institut Georg-August-Universit?t G?ttingen) 2006-00-00
Singular Del Pezzo surfaces - B. Hassett (Rice University) 2006-00-00
Hasse principle and Brauer-Manin obstruction - A. Kresch (University of Pennsylvania) 2006-00-00
Flag varieties - Y. Tschinkel (Mathematisches Institut Georg-August-Universit?t G?ttingen) 2006-00-00
Cox rings and universal torsors - B. Hassett (Rice University) 2006-00-00
Further examples - A. Kresch (University of Pennsylvania) 2006-00-00
Arithmetic of curves: overview - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Tsen-Lang theorem - J. Starr (Stony Brook Mathematics) 2006-00-00
Special values of L-functions - C. Popescu (University of California, San Diego) 2006-00-00
Faltings' theorem I - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Arithmetic over function fields of curves - J. Starr (Stony Brook Mathematics) 2006-00-00
Compactifications of additive groups - Y. Tschinkel (Mathematisches Institut Georg-August-Universit?t G?ttingen) 2006-00-00
Circle method I - B. Moroz (Clay Mathematics Institute) 2006-00-00
Faltings' Theorem II - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Arithmetic over function fields of surfaces - J. Starr (Stony Brook Mathematics) 2006-00-00
Nonabelian descent - D. Harari (Universit? de Paris-Sud (Orsay)) 2006-00-00
Modular curves and Mazur's Theorem - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Bielliptic surfaces - D. Harari (Universit? de Paris-Sud (Orsay)) 2006-00-00
Merel's theorem - M. Rebolledo (Clay Mathematics Institute) 2006-00-00
Circle method II - B. Moroz (Clay Mathematics Institute) 2006-00-00
Merel's theorem, continued - M. Rebolledo (Clay Mathematics Institute) 2006-00-00
Enriques surfaces - D. Harari (Universit? de Paris-Sud (Orsay)) 2006-00-00
Geometry over small fields - F. Bogomolov () 2006-00-00
Fermat curves and Wiles' Theorem - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Elliptic curves and modular forms - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Geometry and arithmetic of curves - D. Abramovich (Brown University) 2006-00-00
Equidistribution on the projective line - A. Chambert-Loir (Universit? de Rennes 1) 2006-00-00
The theorems of Gross-Zagier and Kolyvagin - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Kodaira dimension - D. Abramovich (Brown University) 2006-00-00
Some diophantine applications of Heegner points - J. Voight () 2006-00-00
Proof of Kolyvagin's Theorem - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Campana's program - D. Abramovich (Brown University) 2006-00-00
Arakelov geometry and equidistribution - A. Chambert-Loir (Universit? de Rennes 1) 2006-00-00
p-adic uniformisation - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
The minimal model program - D. Abramovich (Brown University) 2006-00-00
Calculating Heegner points via overconvergent modular symbols - M. Greenberg () 2006-00-00
Stark-Heegner points - H. Darmon (James McGill Professor,?Department of Mathematics.) 2006-00-00
Vojta, Campana and ABC - D. Abramovich (Brown University) 2006-00-00
Equidistribution on Berkovich spaces - A. Chambert-Loir (Universit? de Rennes 1) 2006-00-00
Introduction: Density of Hecke orbits - F. Oort (University of Utrecht) 2006-00-00
Serre-Tate theory - C.-L. Chai (University of Pennsylvania) 2006-00-00
The Andr?-Oort conjecture and Manin-Mumford - E. Ullmo (Universit? Paris-Sud 11) 2006-00-00
Theory of displays I - W. Messing () 2006-00-00
The Tate-conjecture - F. Oort (University of Utrecht) 2006-00-00
Dieudonn? and Cartier modules - C.-L. Chai (University of Pennsylvania) 2006-00-00
Varieties over finite fields I - B. Poonen (MIT) 2006-00-00
Theory of displays II - W. Messing () 2006-00-00
A conjecture of Manin and the weak Grothendieck conjecture - F. Oort (University of Utrecht) 2006-00-00
Hilbert modular varieties - C.-L. Chai (University of Pennsylvania) 2006-00-00
Equidistribution of special varieties - E. Ullmo (Universit? Paris-Sud 11) 2006-00-00
Iterated modular symbols I - Y. I. Manin (Max-Planck-Institut f?r Mathematik, Germany) 2006-00-00
Purity and deformations of p-divisible groups - F. Oort (University of Utrecht) 2006-00-00
Varieties over finite fields II - B. Poonen () 2006-00-00
Iterated modular symbols II - Yu. I. Manin (Max-Planck-Institut f?r Mathematik, Germany) 2006-00-00
Cartier isomorphism I - D. Kaledin () 2006-00-00
Proof of the density of ordinary Hecke orbits - F. Oort (University of Utrecht) 2006-00-00
Proof of the Grothendieck conjecture - C.-L. Chai (University of Pennsylvania) 2006-00-00
Iterated modular symbols III - Yu. I. Manin (Max-Planck-Institut f?r Mathematik, Germany) 2006-00-00
Cartier isomorphism II - D. Kaledin () 2006-00-00
Counting bivariate polynomials - reducible exceptional and singular ones
- Gathen, Joachim von zur (B-IT, University of Bonn, Germany) 2006-00-00
Constructing finite fields
- Lenstra, H.W. (University of Leiden) 2006-00-00
Overview of the course Supplements (not textbook): 10.1 Intro to Differential Equations 10.2 Solutions to Differential Equations - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Difference Equations Finish Problem at end of Lecture 1 Buy House or Car, How much can you afford? Page 384 #20 Algebra Review: Solve for N a=bn Graphing by plotting points and analysis (page 399) - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Clean up Difference Equations (10.1, 10.2, 10.3, 10.4) Textbook 1.1 Review slopes of lines and equations of lines Textbook 1.2 Intro to the derivative: slope of a curve at a point. - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
1.2 Slopes of curves at points 1.3 The derivative: Notations, Rules Power Rule (page 81) Excercises in textbook (pages 75-76) Excercises in textbook (pages 89-90) 1.4 Limits - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
1.3 and 1.4 Limits and the limit definition of the derivative (page 87) 1.5 Continuity and differentiability at a point 1.6 More rules for derivatives General Power Rule (page 110) - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Limit and limit definition of the derivative (Page 87) Continuity and differentiability (Section 1.5) - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Test 1 Review Difference Equations Textbook 1.1 - 1.7 New for Test 2: 1.8 Derivatives as a rate of change 2.1 and 2.2 Describing graphs using words and derivaives - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Review Lecture 7, Answers to Webassign Begin Test 2 Material 1.8 Derivatives as a rate of change 2.1 and 2.2 Describing graphs using words and derivatives - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Solving Inequalities Finish drill in Ch 2, Sec 2 (Page 159) 2.3 and 2.4 Using Derivatives for Curve Sketching 2.5 Begin Optimization Problems (Applications of the derivative) ? - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Curve Sketching using derivatives Jump to 3.1 Product and Quotient Rule for finding the derivative 2.5 - 2.7 Optimization: Geometric, Inventory, Business and Economics - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Optimization: 2.5 Geometric, 2.6 Inventory, 2.7 Business and Economics Chapter 4 Natural Exponential Functions 4.1 Review 4.2 Derivative of f(x) = ex - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
1.8 HW Questions 4.1 and 4.2 Natural Exponential Functions 3.2 Chain Rule for derivatives 4.3 Derivatives of y = e u where u = f(x) - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Test 2 Review 1.8, 2.1 - 2.7, 3.1, 3.2, 4.1 - 4.3 Begin Test 3 Material 4.4 Natural Logarithms (Review) 4.1 Derivative y = ln x - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Begin Test 3 Material 4.4 - 4.6 Review of Natural Logarithms: identities and properties Derivative of y = ln x Derivative of y = ln u, u = f(x) (Chain Rule) - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
5.1 and 5.2 Applications of the Natural Exponential Function (Differential Equations) 6.1 and 9.1 Antidifferentiation (Integration) - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
6.1 and 9.1 Integration 6.2 and 6.3 Riemann Sums and the Definite Integral - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Page 455 #25 6.2 and 6.3 Riemann Sums: Area under the curve using Definite Integral 9.3 Evaluating Definite Integrals ( with u substitution) - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Evaluate definite integrals (9.3 u substitution) 6.4 Application of the definite integral: Area of regions bounded by curves End of Test 3 material - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Review for Test 3 4.4 - 5.2, 6.1 - 6.4, 9.1, 9.3 - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Applications of the Definite Integral 6.5 Consumer's and Producer's Surplus 6.5 Future Value of a Continuous Stream 9.5 Present value of a Continuous Stream - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Final Exam Review - Marilyn McCollum Profeesor(North Carolina State University) 2006-00-00
Calculus and Probability for Life Sciences Students 1 Lecture 1 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 2 Lecture 1 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 3 Lecture 2 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 4 Lecture 2 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 5 Lecture 3 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 6 Lecture 3 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 7 Lecture 4 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 8 Lecture 4 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 9 Lecture 5 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 10 Lecture 5 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 11 Lecture 6 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 12 Lecture 6 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 13 Lecture 7 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 14 Lecture 7 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 15 Lecture 8 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 16 Lecture 8 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 17 Lecture 9 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 18 Lecture 9 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 19 Lecture 10 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 20 Lecture 10 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 21 Lecture 11 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 22 Lecture 11 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 23 Lecture 13 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 24 Lecture 13 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 25 Lecture 14?Sorry for the inconvenience. Due to technical difficulty audio cuts out 38 minutes into lecture. (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 26 Lecture 14?Sorry for the inconvenience. Due to technical difficulty audio cuts out 38 minutes into lecture. (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 27 Lecture 15 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 28 Lecture 15 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 29 Lecture 16 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 30 Lecture 16 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 31 Lecture 17 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 32 Lecture 17 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 33 Lecture 18 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 34 Lecture 18 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 35 Lecture 19 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 36 Lecture 19 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 37 Lecture 20 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 38 Lecture 20 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 39 Lecture 21 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 40 Lecture 21 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 41 Lecture 22 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 42 Lecture 22 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 43 Lecture 23 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 44 Lecture 23 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 45 Lecture 24 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 46 Lecture 24 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 47 Lecture 26 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 48 Lecture 26 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 49 Lecture 27 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 50 Lecture 27 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 51 Lecture 28 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 52 Lecture 28 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 53 Lecture 29 (LAN) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Calculus and Probability for Life Sciences Students 54 Lecture 29 (DSL) - Herbert B. Enderton Professor(UCLA) 2006-00-00
Wallpaper patterns and buckyballs - Robin Wilson Professor(Gresham College) 2006-00-00
How to grow trees - Robin Wilson Professor(Gresham College) 2006-00-00
Problems with schoolgirls - Robin Wilson Professor(Gresham College) 2006-00-00
YEA, WHY TRY HER RAW WET HAT? - Robin Wilson Professor(Gresham College) 2006-00-00
Mathematics in the modern age - The 18th century: Crossing bridges - Robin Wilson Professor(Gresham College) 2006-00-00
Mathematics in the modern age - The 19th century: Revolution or evolution? - Robin Wilson Professor(Gresham College) 2006-00-00
Introduction to Statistics - 01. Introduction, Histograms - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 02. Average, Median - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 03. SD, Normal Approximation - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 04. Correlation I - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 05. Correlation II - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 06. Regression - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 07. RMS Error - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 08. Regression Line - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 09. Obs Studies, Experiment - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 10. Review I - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 11. Review II - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 12. Probability I - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 13. Probability II - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 14. Box Models - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 15. Expected Value, Standard Error, Normal Approximation - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 16. Exp Val, SE I - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 17. Sampling - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 18. SE II - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 19. Review - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 20. Confidence Intervals - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 21. Confidence Interval for Average - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 22. Hypothesis Testing I - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 23. T-test - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 24. Two Sample Z-test - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 25. Hypotheses Test II - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 26. Review I (audio problems first 2 minutes) - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Introduction to Statistics - 27. Review II - Fletcher Ibser Professor(UC Berkeley) 2006-00-00
Mathematics in the 20th century: Chaos, codes and colouring - Robin Wilson Professor(Gresham College) 2006-00-00
Mathematical Methods for Engineers II 1 Difference Methods for Ordinary Differential Equations - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 2 Finite Differences, Accuracy, Stability, Convergence - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 3 The One-way Wave Equation and CFL / von Neumann Stability - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 4 Comparison of Methods for the Wave Equation - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 5 Second-order Wave Equation (including leapfrog) - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 6 Wave Profiles, Heat Equation / point source - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 7 Finite Differences for the Heat Equation - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 8 Convection-Diffusion / Conservation Laws - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 9 Conservation Laws / Analysis / Shocks - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 10 Shocks and Fans from Point Source - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 11 Level Set Method - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 12 Matrices in Difference Equations (1D, 2D, 3D) - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 13 Elimination with Reordering: Sparse Matrices - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 14 Financial Mathematics / Black-Scholes Equation - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 15 Iterative Methods and Preconditioners - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 16 General Methods for Sparse Systems - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 17 Multigrid Methods - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 18 Krylov Methods / Multigrid Continued - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 19 Conjugate Gradient Method - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 20 Fast Poisson Solver - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 21 Optimization with constraints - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 22 Weighted Least Squares - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 23 Calculus of Variations / Weak Form - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 24 Error Estimates / Projections - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 25 Saddle Points / Inf-sup condition - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 26 Two Squares / Equality Constraint Bu = d - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 27 Regularization by Penalty Term - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 28 Linear Programming and Duality - Gilbert Strang Professor(MIT) 2006-00-00
Mathematical Methods for Engineers II 29 Duality Puzzle / Inverse Problem / Integral Equations - Gilbert Strang Professor(MIT) 2006-00-00
Differential Equations 1 The Geometrical View of y\'=f(x,y): Direction Fields, Integral Curves. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 2 Euler\'s Numerical Method for y\'=f(x,y) and its Generalizations. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 3 Solving First-order Linear ODE\'s; Steady-state and Transient Solutions. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 4 First-order Substitution Methods: Bernouilli and Homogeneous ODE\'s. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 5 First-order Autonomous ODE\'s: Qualitative Methods, Applications. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 6 Complex Numbers and Complex Exponentials. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 7 First-order Linear with Constant Coefficients: Behavior of Solutions, Use of Complex Methods. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 8 Continuation; Applications to Temperature, Mixing, RC-circuit, Decay, and Growth Models. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 9 Solving Second-order Linear ODE\'s with Constant Coefficients: The Three Cases. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 10 Continuation: Complex Characteristic Roots; Undamped and Damped Oscillations. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 11 Theory of General Second-order Linear Homogeneous ODE\'s: Superposition, Uniqueness, Wronskians. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 12 Continuation: General Theory for Inhomogeneous ODE\'s. Stability Criteria for the Constant-coefficient ODE\'s. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 13 Finding Particular Sto Inhomogeneous ODE\'s: Operator and Solution Formulas Involving Ixponentials. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 14 Interpretation of the Exceptional Case: Resonance. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 15 Introduction to Fourier Series; Basic Formulas for Period 2(pi). - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 16 Continuation: More General Periods; Even and Odd Functions; Periodic Extension. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 17 Finding Particular Solutions via Fourier Series; Resonant Terms; Hearing Musical Sounds. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 18 Introduction to the Laplace Transform; Basic Formulas. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 19 Derivative Formulas; Using the Laplace Transform to Solve Linear ODE\'s. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 20 Convolution Formula: Proof, Connection with Laplace Transform, Application to Physical Problems. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 21 Using Laplace Transform to Solve ODE\'s with Discontinuous Inputs. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 22 Use with Impulse Inputs; Dirac Delta Function, Weight and Transfer Functions. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 23 Introduction to First-order Systems of ODE\'s; Solution by Elimination, Geometric Interpretation of a System. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 24 Homogeneous Linear Systems with Constant Coefficients: Solution via Matrix Eigenvalues (Real and Distinct Case). - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 25 Continuation: Repeated Real Eigenvalues, Complex Eigenvalues. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 26 Sketching Solutions of 2x2 Homogeneous Linear System with Constant Coefficients. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 27 Matrix Methods for Inhomogeneous Systems: Theory, Fundamental Matrix, Variation of Parameters. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 28 Matrix Exponentials; Application to Solving Systems. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 29 Decoupling Linear Systems with Constant Coefficients. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 30 Non-linear Autonomous Systems: Finding the Critical Points and Sketching Trajectories; the Non-linear Pendulum. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 31 Limit Cycles: Existence and Non-existence Criteria. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Differential Equations 32 Relation Between Non-linear Systems and First-order ODE\'s; Structural Stability of a System, Borderline Sketching Cases; Illustrations Using Volterra\'s Equation and Principle. - Arthur Mattuck, Haynes Miller (MIT) 2006-00-00
Single Variable Calculus 1 Differentiation - Derivatives, slope, velocity, rate of change - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 2 Differentiation - Limits, continuity - Trigonometric limits - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 3 Differentiation - Derivatives of products, quotients, sine, cosine - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 4 Differentiation - Chain rule - Higher derivatives - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 5 Differentiation - Implicit differentiation, inverses - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 6 Differentiation - Exponential and log - Logarithmic differentiation; hyperbolic functions - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 7 Differentiation - Hyperbolic functions (cont.) and exam 1 review - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 8 Applications of Differentiation - Linear and quadratic approximations - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 9 Applications of Differentiation - Curve sketching - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 10 Applications of Differentiation - Max-min problems - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 11 Applications of Differentiation - Related rates - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 12 Applications of Differentiation - Newton's method and other applications - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 13 Applications of Differentiation - Mean value theorem, Inequalities - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 14 Applications of Differentiation - Differentials, antiderivatives - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 15 Applications of Differentiation - Differential equations, separation of variables - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 16 Integration - Definite integrals - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 17 Integration - First fundamental theorem of calculus - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 18 Integration - Second fundamental theorem - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 19 Integration - Applications to logarithms and geometry - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 20 Integration - Volumes by disks and shells - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 21 Integration - Work, average value, probability - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 22 Integration - Numerical integration - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 23 Integration - Exam 3 review - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 24 Techniques of Integration - Trigonometric integrals and substitution - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 25 Techniques of Integration - Integration by inverse substitution; completing the square - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 26 Techniques of Integration - Partial fractions - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 27 Techniques of Integration - Integration by parts, reduction formulae - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 28 Techniques of Integration - Parametric equations, arclength, surface area - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 29 Techniques of Integration - Polar coordinates; area in polar coordinates - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 30 Techniques of Integration - Exam 4 review - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 31 Techniques of Integration - Indeterminate forms - L\'H?spital\'s rule - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 32 Techniques of Integration - Improper integrals - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 33 Techniques of Integration - Infinite series and convergence tests - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 34 Techniques of Integration - Taylor\'s series - David Jerison Professor(MIT) 2006-00-00
Single Variable Calculus 35 Techniques of Integration - Final review - David Jerison Professor(MIT) 2006-00-00
A lecture from Colloquia - A proof of Sharkovsky\'s theorem - Keith Burns Professor(San Francisco State University) 2006-00-00
A lecture from Colloquia - Convex Dynamics - The invariant sets for piecewise-isometric transformations - Tomasz Nowicki Professor(San Francisco State University) 2006-00-00
A lecture from Colloquia - Schmidt\'s game, its modifications, and a conjecture of Margulis - Barak Weiss Professor(San Francisco State University) 2006-00-00
A lecture from Colloquia - Mathematical Modeling and Implementation of Human-Computer Interaction Using Mathematica - Inho Choi Professor(San Francisco State University) 2006-00-00
A lecture from Colloquia - Mathematical Rx - Helen Moore Professor(San Francisco State University) 2006-00-00
Back to top of page 2005Statistics-Lecture(NCSU) 1 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 1 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 1 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 2 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 3 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 4 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 2 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 2 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 5 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 6 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 7 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 8 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 9 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 3 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 3 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 10 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 11 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 12 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 4 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 13 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 14 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 15 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 5 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 4 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 16 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 17 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 18 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 19 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 20 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 21 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 6 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 22 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 23 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 24 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 7 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 5 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 25 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 26 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 27 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 8 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 6 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 28 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 29 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 30 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 9 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 7 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 31 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 32 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 33 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 34 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 35 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 36 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 10 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 8 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 37 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 38 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 39 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 11 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-JMP Lab(NCSU) 9 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 40 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 41 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 42 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-General Lab(NCSU) 12 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 43 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Statistics-Lecture(NCSU) 44 - Petruta C. Caragea Assistant Professor(Department of Statistics Iowa State University) 2005-00-00
Introduction to Algorithms - Administrivia - Introduction - Analysis of Algorithms, Insertion Sort, Mergesort - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Asymptotic Notation - Recurrences - Substitution, Master Method - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Divide-and-Conquer: Strassen, Fibonacci, Polynomial Multiplication - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Quicksort, Randomized Algorithms - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Linear-time Sorting: Lower Bounds, Counting Sort, Radix Sort - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Order Statistics, Median - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Hashing, Hash Functions - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Universal Hashing, Perfect Hashing - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Relation of BSTs to Quicksort - Analysis of Random BST - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Red-black Trees, Rotations, Insertions, Deletions - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Augmenting Data Structures, Dynamic Order Statistics, Interval Trees - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Skip Lists - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Amortized Algorithms, Table Doubling, Potential Method - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Competitive Analysis: Self-organizing Lists - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Dynamic Programming, Longest Common Subsequence - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Greedy Algorithms, Minimum Spanning Trees - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Shortest Paths I: Properties, Dijkstra's Algorithm, Breadth-first Search - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Shortest Paths II: Bellman-Ford, Linear Programming, Difference Constraints - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Shortest Paths III: All-pairs Shortest Paths, Matrix Multiplication, Floyd-Warshall, Johnson - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Advanced Topics - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Advanced Topics (cont.1) - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Advanced Topics (cont.2) - Erik Demaine Professor(MIT) 2005-00-00
Introduction to Algorithms - Advanced Topics (cont.3) - Discussion of Follow-on Classes - Erik Demaine Professor(MIT) 2005-00-00
Periodic Homology of Infinite Loopspaces - Kuhn, Nick (University of Virginia) 2005-00-00
Statistical Problems in Gene Clustering From High-Throughput Data - Bryan, Jennifer (University of British Columbia) 2005-00-00
Toward Binary Blackhole Simulations in Numerical Relativity - Pretorius, Frans (University of Alberta) 2005-00-00
Understanding Inequality: Separating Uncertainty from Heterogeneity in Life Cycle Earnings - Heckman, Jim (University of Chicago) 2005-00-00
Loop-ensembles and loop-soups - Werner, Wendelin (University of Paris Sud, Orsay) 2005-00-00
Molecular dynamics with long time steps: Analysis and design of non-Hamiltonian dynamical systems - Tuckerman, Mark (New York University) 2005-00-00
NA - Conway, John (Princeton University) 2005-00-00
Inverse Problems in anisotropic media - Uhlmann, Gunther (University of Washington) 2005-00-00
Workshop on Analytic and Algebraic Methods in Complex and CR Geometry
- Christ, Michael (University of California, Berkeley) 2005-00-00
Introduction Section 2.2 Functions Section 2.3 Graph of a Function Section 2.4 Properties of Functions - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 2.3 Graphs of a Function Section 2.4 Properties of Functions Section 2.5 Linear Functions and Applications - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 2.5 Linear Functions and Models Review graphing Linear Functions Applications - Straight line Depreciation Applications - Supply and Demand Applications: Direct Variation Section 2.6 Library of Functions - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 2.7 Graphing Techniques Library of Functions Vertical: Shifts, Compressions, Stretches Horizontal: Shifts, Compressions, Stretches Reflections : Shifts, Compressions, Stretches - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Professor says it is lecture 6a, but it is lecture 5. Section 2.8 Constructing Functions Geometric, Solids and Demand Equation Cumulative Review Section 3.1 Quadratic Functions - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 3.1 Review of y = a (x-h)^2 + k Graphing y = ax^2 + bk + C Regions bounded by curves - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Review for Test 1 Section 2.2 - 3.1 Regions bounded by Curves Test 2 Material Section 3.2 Polynomial Functions - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 3.2 Polynomial Functions - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 3.3 Properties of Rational Functions Section 3.5 Review of Sign Charts - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 3.6 Real Zeroes of a Polynomial Function Remainder Theorem and Factor Theorem Rational Zeroes Theorem and Intermediate Value Theorem Section 3.7 Complex Zeroes of a Polynomial Functions Fundamental Theorem of Algebra Calculus Related Factorin - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Calculus Related Factoring in Textbook Cumulative Review Section 4.1 Composition of Functions Section 4.2 - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 4.2 One-to-One, Inverse Functions, Find algebraically, Verify Inverses Section 4.3 Exponential Functions - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Review for Test 2 Section 4.4 Logarithmic Function - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 4.4 Logarithmic Functions Section 4.5 Properties of Logarithms - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 4.6 Solving Logarithmic and exponential Equations Section 4.7 Compound Interest Section 4.8 Exponential Growth and Exponential Decay - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Section 4.8 Exponential Growth and Decay Cumulative Review A = P e^{rt} Compound Cont. - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Review of Angles in Standar Position Section 6.2 Right Triangle Trigonometry - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Review of exact values of trignometric functions and solving acute right triangles. Section 6.4 Extend definition of trig. functions to general angles - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Review for Test 3 - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Graphing y=A sin bx Graphing y=A cos bx Graphing y=A tan bx Section 6.5 Unit Circle Section 6.6 Graph of the Sine and Cosine Functions Section 6.7 Graph of the Tangent Function - Marilyn McCollum Professor(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Introduction to matrices and matrix addition (10:15) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Introduction to the matrix tool (4:09) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Submitting answers in WebAssign (4:12) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Matrix multiplication (12:06) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Matrix multiplication using the Matrix Tool (2:20) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Systems of equations (30:51) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Using the row operation tool to solve a system of equations (7:55) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Past Due Assignments and Extensions (2:27) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Matrix Inverses (17:52) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Finding an inverse with either tool (1:43) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Using a matrix inverse to solve a system of equations (2:32) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Summary of strategy for row operations (3:31) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Why the method for finding the inverse of a matrix works (6:30) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Don't let symbols throw you for a loop (2:47) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Modeling population dynamics with matrices (7:19) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Applying the matrix tool to population dynamics (2:55) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Graphing Linear Inequalities (15:18) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Setting up linear programming problems (19:11) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Using the row operation tool to find corner points (1:14) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Solving linear programming problems graphically (24:46) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Manufacturing checkers and chess sets (7:33) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - More applications of linear programming (14:19) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Setting up the initial simplex tableau (13:41) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Solving a standard problem (21:40) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Solving a standard problem with the row operation tool (6:07) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - More standard problems (20:14) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Nonstandard problems (20:20) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Solving a nonstandard problem with the row operation tool (7:31) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - How the simplex method works for nonstandard problems (9:27) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - A more complex problem (18:03) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Some final tips (10:52) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Introduction to sets (13:34) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Set operations and Venn diagrams (17:49) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Venn diagrams and data (15:50) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Multiplication principle and tree diagrams (19:10) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Permutations and Combinations (29:29) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Some review problems (17:43) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - More review problems (14:50) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Sample space and events (17:30) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - What is probability? (29:09) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Uniform probability distributions (43:19) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Conditional probability (41:58) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Combining conditional probabilities and tree diagrams (21:56) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Independence and independent trials (39:56) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Expected value (16:58) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - What is a Markov chain? (13:33) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Multi-step transition probabilities (9:24) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Multi-step probabilities via the Matrix Tool (3:55) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Regular Markov chains (19:48) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - The matrix tool and steady-state distributions (2:11) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Absorbing Markov chains (28:57) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Absorbing states and the matrix algebra tool (7:10) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Introduction to Finite Mathematics with Applications (NCSU) - Markov chain review (17:05) - Lavon B. Page Professot(North Carolina State University) 2005-00-00
Who invented algebra? - Robin Wilson Professor(Gresham College) 2005-00-00
Prime-time mathematics - Robin Wilson Professor(Gresham College) 2005-00-00
How hard is a hard problem? - Robin Wilson Professor(Gresham College) 2005-00-00
Who invented the equals sign?
- Robin Wilson Professor(Gresham College) 2005-00-00
Who invented the calculus? - and other 17th century topics - Robin Wilson Professor(Gresham College) 2005-00-00
Introduction to Algorithms 1 Administrivia - Introduction - Analysis of Algorithms, Insertion Sort, Mergesort - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 2 Asymptotic Notation - Recurrences - Substitution, Master Method - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 3 Divide-and-Conquer: Strassen, Fibonacci, Polynomial Multiplication - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 4 Quicksort, Randomized Algorithms - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 5 Linear-time Sorting: Lower Bounds, Counting Sort, Radix Sort - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 6 Order Statistics, Median - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 7 Hashing, Hash Functions - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 8 Universal Hashing, Perfect Hashing - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 9 Relation of BSTs to Quicksort - Analysis of Random BST - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 10 Red-black Trees, Rotations, Insertions, Deletions - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 11 Augmenting Data Structures, Dynamic Order Statistics, Interval Trees - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 12 Skip Lists - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 13 Amortized Algorithms, Table Doubling, Potential Method - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 14 Competitive Analysis: Self-organizing Lists - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 15 Dynamic Programming, Longest Common Subsequence - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 16 Greedy Algorithms, Minimum Spanning Trees - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 17 Shortest Paths I: Properties, Dijkstra\'s Algorithm, Breadth-first Search - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 18 Shortest Paths II: Bellman-Ford, Linear Programming, Difference Constraints - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 19 Shortest Paths III: All-pairs Shortest Paths, Matrix Multiplication, Floyd-Warshall, Johnson - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 20 Advanced Topics - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 21 Advanced Topics (cont.) - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 22 Advanced Topics (cont.) - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Introduction to Algorithms 23 Advanced Topics (cont.) - Discussion of Follow-on Classes - Erik Demaine; Charles Leiserson Professor(MIT) 2005-00-00
Linear Algebra 01 The Geometry of Linear Equations - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 02 Elimination with Matrices - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 03 Multiplication and Inverse Matrices - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 04 Factorization into A = LU - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 05 Transposes, Permutations, Spaces R^n - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 06 Column Space and Nullspace - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 07 Solving Ax = 0: Pivot Variables, Special Solutions - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 08 Solving Ax = b: Row Reduced Form R - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 09 Independence, Basis, and Dimension - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 10 The Four Fundamental Subspaces - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 11 Matrix Spaces; Rank 1; Small World Graphs - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 12 Graphs, Networks, Incidence Matrices - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 13 Quiz 1 Review - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 14 Orthogonal Vectors and Subspaces - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 15 Projections onto Subspaces - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 16 Projection Matrices and Least Squares - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 17 Orthogonal Matrices and Gram-Schmidt - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 18 Properties of Determinants - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 19 Determinant Formulas and Cofactors - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 20 Cramer\'s Rule, Inverse Matrix, and Volume - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 21 Eigenvalues and Eigenvectors - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 22 Diagonalization and Powers of A - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 23 Differential Equations and exp(At) - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 24 Markov Matrices; Fourier Series - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 25 Quiz 2 Review - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 26 Symmetric Matrices and Positive Definiteness - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 27 Complex Matrices; Fast Fourier Transform - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 28 Positive Definite Matrices and Minima - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 29 Similar Matrices and Jordan Form - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 30 Singular Value Decomposition - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 31 Linear Transformations and Their Matrices - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 32 Change of Basis; Image Compression - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 33 Quiz 3 Review - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 34 Left and Right Inverses; Pseudoinverse - Gilbert Strang Professor(MIT) 2005-00-00
Linear Algebra 35 Final Course Review - Gilbert Strang Professor(MIT) 2005-00-00
A lecture from Colloquia - Infinite dimensional algebras - Efim Zelmanov Professor(San Francisco State University) 2005-00-00
A lecture from Colloquia - Anosov flows, suspensions, and a conjecture of Verjovsky - Slobodan Simic Professor(San Francisco State University) 2005-00-00
A lecture from Colloquia - Recent work on Serre\'s Conjecture - Ken Ribet Professor(San Francisco State University) 2005-00-00
Some remarks about axions and other pseudoscalar particles - Raul Rabadan (Duke University) 2005-00-00 Duke University
Topological Correlators from the Coulomb Branch - Ilarion Melnikov (Duke University) 2005-00-00 Duke University
Back to top of page 2004EI in valued fields tutorial 4 - Haskell, Deirdre (McMaster University) 2004-00-00
Interactions between model theory and geometry - Scanlon, Thomas (University of California at Berkeley) 2004-00-00
Model Reduction Problems and Matrix Methods - Petzold, Linda (University of California, Santa Barbara) 2004-00-00
Model Reduction Problems and Matrix Methods - White, Jacob (Massachusetts Institute of Technology) 2004-00-00
Analytic and Geometric Aspects of Stochastic Processes - Lyons, Terry (Oxford University) 2004-00-00
Algebraic transversality and noncommutative localization - Ranicki, Andrew (University of Edinburgh) 2004-00-00
New developments on variational methods and their applications - Li, Yanyan (Rutgers University) 2004-00-00
Aperiodic Order: Dynamical Systems, Combinatorics, and Operators - Berthe, Valerie (University of Montpellier) 2004-00-00
Aperiodic Order: Dynamical Systems, Combinatorics, and Operators - Moody, Robert (University of Victoria) 2004-00-00
Experimental View of the Very Early Universe - Bond, Richard (CITA and University of Toronto) 2004-00-00
Inflationary Universe - Linde, Andrei (Stanford Univ.) 2004-00-00
Statistical issues 3 (super-spreading events) - Yan, Ping (Public Health Agency of Canada) 2004-00-00
On convexified packing and entropy duality - Artstein, Shiri (Tel Aviv University) 2004-00-00
Flexibilty and Rigidity for Protein - Whiteley, Walter (Department of Mathematics and Statistics York University) 2004-00-00
Structure theorems and the mathematics of gene regulation in NCR circuit - Gedeon, Tomas (Montana State University) 2004-00-00
Tight Closure operations and big Cohen-Macaulay algebras - Hochster, Mel (University of Michigan) 2004-00-00
Image Denoising with Unsupervised, Information-Theoretic, Adaptive Filtering - Whitaker, Ross T. (University of Utah) 2004-00-00
On the Topology of the Kasparov Groups and its Applications - Dadarlat, Marius (Purdue University) 2004-00-00
Calculus III(NCSU) - Overview of the course.
Begin Section 9.1: Cartesian Coordinates in space - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Begin Section 9.2: Vectors - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Review of discussion on Vectors, with a number of worked example problems.
Begin Section 9.3: The Dot Product - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue discussion of the Dot Product, with examples - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Brief review of the Dot Product.
Begin discussion of Section 9.4: The Cross Product - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Brief review of the Cross Product.
Begin Section 9.5: Equations of Lines and Planes - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue with discussion of equations of lines and planes, with worked examples - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish working examples on lines and planes.
Begin Section 10.1: Vector Functions and Space Curves - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish space curves.
Begin Section 10.2: Derivatives and Integrals of Vector Functions - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish discussion of section 10.2.
Begin Section 10.3: Arc Length and Curvature - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish 10.3
Begin Section 10.4: Motion in Space - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Covers Section 9.6: Functions and surfaces, and
Section 11.1: Functions of several variables - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Covers Section 11.1: level curves of f(x,y)and level surfaces of f(x,y,z) - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Review day for Test #1
Test #1 covers lectures 1 - 11, with lecture 14 the “review day” for test #1. On this test I am not testing section 9.6 or 11.1 which are covered in lectures 12 and 13. - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Covers Section 11.2: Limits and continuity of f(x,y) and f(x,y,z) - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Covers Section 11.3: partial derivatives - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Begin Section 11.4: differentiability of f(x,y) and f(x,y,z)
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finishes up Section 11.4 - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Covers Section 11.5: The Chain Rule - Mentions a pdf for distance ed students that is on Norris’ web page - problem 9, page 788 (third edition).
Begin 11.6: Directional derivatives and the gradient vector. - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continues discussion of section 11.6 on Directional derivatives - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finishes discussion of 11.6
Begins 11.7: optimization - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finishes Section 11.7 on optimization
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Mentions test 2 will be on 11.1 - 11.7, although additional material will be covered before the test. Covers absolute max and absolute min.
Last 7 minutes begins Section 12.1: Double Integrals over Rectangles
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish 12.1
Begin 12.2: Iterated integrals - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish discussion of 12.2
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Review day for test #2
Test #2 will cover the material in sections 9.6, and 11.1 - 11.7. That material is covered in lectures 12, 13, 15-23, and Lecture #26 = ”Review day for test #2”.
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Begin Section 12.3: Double Integrals over general regions - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue with 12.3
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish Section 12.3.
Begin Section 12.4: Double integrals in polar coordinates
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue with double integrals in polar coordinates.
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish 12.4. Discuss 12.5 : Applications of double integrals
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Begin Section 12.7: Triple integrals in Cartesian coordinates - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue with 12.7
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish examples from Section 12.7.
Begin Section 9.7: Cylindrical coordinates and
Section 12.8: Triple integrals in cylindrical coordinates - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish examples in cyclindrical coordinates.
Continue with Section 9.7: Spherical coordinates and
Continue with Section 12.8: Triple integrals in spherical coordinates
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish up discussion of triple integrals in spherical coordinates: do three example problems.
Begin (briefly) Section 13.1: Vector Fields - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish 13.1 on vector fields and conservative vector fields.
Begin 13.2: Line integrals. - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue with 13.2: Line integrals of functions along parameterized curves. - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish 13.2: Line integrals of vector fields along parameterized curves; The defintion of the work done by a force. - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Review day for Test #3:
Test #3 will cover the material in all sections of chapter 12 except section 12.6 (which will be covered later). This material is covered in DVD Lectures #24 - #36. Lecture #40 is the Review day for Tes - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Begin Section 13.3: The fundamental theorem for Line Integrals - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue with section 13.3 - includes a number of worked example problems - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish Section 13.3. Show how Newton’s second law combined with conservative forces leads to the law of conservation of total energy.
Begin 13.4: Green’s Theorem - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish Section 13.4 - Green’s Theorem.
Begin section 13.5: Divergence and Curl - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish Section 13.5 on Divergence and Curl.
Begin Section 10.5: Parametric Surfaces - BEGIN MAPLE ASSIGNMENT #4 - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish discussion of Section 10.5 on parametric surfaces.
Begin study of “tangent planes to parametrized surfaces” (Pg 787-788). - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Review discussion of “tangent planes to parametrized surfaces” (Pg 787-788)
Begin Section 12.6: Surface area of Parameterized Surfaces - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish discussion of surface area (Section 12.6).
Begin several day study of Section 13.6: Surface Integrals - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Continue with Section 13.6. Finish “surface integral of a function”
Begin “surface integral of a vector field”. NOTE: A slide with the title “Line integral of Vector Fields” in this lecture. The title of that slide should be “Su - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Review day for Test #4. Contains a number of worked examples.
Test #4 will cover the material in all sections of chapter 13 except sections 13.7 and 13.8 (which will be covered later). Morever, the test includes the materials in - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Begin Section 13.7: Stoke’s Theorem - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish discussion of Section 13.7 - Stokes' Theorem.
Begin discussion of Section 13.8: The Divergence Theorem
- Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Finish Section 13.8 - The Divergence Theorem of Guass. - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Semester Review Day: Questions and answers with worked example problems - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Calculus III(NCSU) - Semester Review Day: Questions and answers with worked example problems - Larry K. Norris Professor(North Carolina State University) 2004-00-00
Keep taking the tablets - Robin Wilson Professor(Gresham College) 2004-00-00
Here’s looking at Euclid - Robin Wilson Professor(Gresham College) 2004-00-00
Much ado about zero - Robin Wilson Professor(Gresham College) 2004-00-00
A lecture from Colloquia - From Postage Stamps to Chicken McNuggets: A Fast Solution to an Old Integer Programming Problem - Stan Wagon Professor(San Francisco State University) 2004-00-00
A lecture from Colloquia - Interpolation and Sampling in Complex Analysis - Dror Varolin Professor(San Francisco State University) 2004-00-00
Back to top of page 2003The Fate of Four Dimension - Giddings, Steve (University of California) 2003-00-00
de Sitter Vacua in String Theory - Kachru, Shamit (Stanford University) 2003-00-00
Hagedorn Transition in Free Yang-Mills (Part 1) - Minwalla, Shiraz (Harvard University) 2003-00-00
Hagedorn Transition in Free Yang-Mills (Part 2) - Minwalla, Shiraz (Harvard University) 2003-00-00
Nonplanar Diagrams - Ooguri, Hirosi (California Institute of Technology) 2003-00-00
Mesoscopic Quantum Measurements - Averin, Dmitri (SUNY Stony Brook) 2003-00-00
Mesoscopic Detectors and the Quantum Limit - Clerk, Aashish (Yale Dept. Applied Physics) 2003-00-00
Understanding proton conduction in the polymer electrolyte membrane through molecular and statistical mechanical modeling (Part 2) - Paddison, Stephen (Los Alamos National Laboratory) 2003-00-00
Understanding proton conduction in the polymer electrolyte membrane through molecular and statistical mechanical modeling (Part 1) - Paddison, Stephen (Los Alamos National Laboratory) 2003-00-00
Examples of Mahler measures as multiple polylogarithms - Lalin, Matilde (Institute for Advanced Study) 2003-00-00
A new proof that .16666666... = 1/6 - Villegas, Fernando Rodriguez (University of Texas at Austin) 2003-00-00
Minimal transitive factorizations of permutations - Bousquet-Melou, Mireille (CNRS - Universite Bordeaux 1) 2003-00-00
Eigenvalues, singular values, and Schubert calculus (Part 1) - Fomin, Sergey (University of Michigan) 2003-00-00
Eigenvalues, singular values, and Schubert calculus (Part 2) - Fulton, William (University of Michigan) 2003-00-00
Random Co-polymers Near Interfaces - den Hollander, Frank (University of Leiden and EURANDOM) 2003-00-00
Polymer Models - Guttmann, Tony (University of Melbourne) 2003-00-00
Adaptive Numerical Methods for PDEs - DeVore, Ronald (University of South Carolina) 2003-00-00
Non-conventional Ergodic Averages - Kra, Bryna (Penn State University) 2003-00-00
Invariant Measures & Multi-parameter Flows - Lindenstrauss, Elon (Stanford University) 2003-00-00
The robustness of genetic networks - Odell, Garry (University of Washington) 2003-00-00
How the immune system can cope with its overlapping and conflicting goals - Segel, Lee (The Weizmann Institute of Science) 2003-00-00
Quasi-Local Mass in General Relativity - Bray, Hugh (Columbia University) 2003-00-00
Smoothing Einstien Orbifolds - Mazzeo, Rafe (Stanford University) 2003-00-00
Nonlinear Superposition Principles for Exterior Differential Systems - Anderson, Ian (Utah State University) 2003-00-00
Open Problems on the Mumford-Shah Functional - David, Guy (University of Paris-Sud, France) 2003-00-00
Some connections between fully nonlinear and higher order equations in geometry - Gursky, M. (Univ. of Notre Dam) 2003-00-00
Alexandrov type inequalities for Cartan-Hadamard manifolds - Spruck, Joel (Johns Hopkins University) 2003-00-00
Patterns and Waves for Discrete and Continuum Bistable Equations with Indefinite Interaction - Bates, Peter (Brigham Young Univ.) 2003-00-00
From Individual to Collective Behavior in Bacterial Chemotaxis - Othmer, Hans (University of Minnesota) 2003-00-00
A hybrid Monte Carlo Method for Computation of Epitaxial Growth - Smereka, Peter (University of Michigan) 2003-00-00
Challenges in DNS of Multiphase Flows with Complex Physics - Tryggvason, Gretar (Worcester Polytechnic Institute) 2003-00-00
Bandwidth Selection using Multiresolution Schemes - Davies, P. Laurie (University of Duisburg-Essen) 2003-00-00
Knots, von Neumann Signatures, and Grope Cobordism - Teichner, P. (Unviersity of California-San Diego) 2003-00-00
Colourings of Graphs on Surfaces - Mohar, Bojan (Simon Fraser University) 2003-00-00
An introduction to the algebraic theory of p-forms - Hoffmann, Detlev (Universit? de Franche-Comte) 2003-00-00
Artin-Tate Motives - Voevodsky, Vladimir (Institute for Advanced Study) 2003-00-00
Current trends in representation theory of finite groups - Kleshchev, Alexander (University of Oregon) 2003-00-00
The Structure of High Redshift Absorption Galaxies from Gravitatioal Lensing - Ellison, Sara (P. Universidad Catolica de Chile) 2003-00-00
Galaxy Formation: More Questions than Answers - Ostriker, Jeremiah (University of Cambridge) 2003-00-00
Rest-frame Optical Spectra of z~2 Galaxies-Evidence for Disks and Super-solor Metallicity - Shapley, Alice (California Institute of Technology) 2003-00-00
The interaction of finite type and Gromov-Witten invariants (part 1) - Marino, Marcos (Harvard University) 2003-00-00
The interaction of finite type and Gromov-Witten invariants (part 4) - Marino, Marcos (Harvard University) 2003-00-00
Theory and Numerics of Matrix Eigenvalue Problems - Golub, Gene (Stanford University) 2003-00-00
Numerical solution of parametric eigenvalue problems in robust control - Mehrmann, Volker (Technische Universitat Berlin) 2003-00-00
New Structures in free surface flows - Bush, John (Massachusetts Institute of Technology) 2003-00-00
Exact solution for the extensional flow of a viscoelastic fluid - Smolka, Linda (Duke University) 2003-00-00
Integral Structures, Toric Geometry, and Homological Mirror Symmetry - Doran, Charles (University of Washington) 2003-00-00
Examples of Non-Rigid Modular Calabai-Yau Manifolds Part 1 - Hulek, Klaus (Fachbereich Mathematik Universitat Hannover) 2003-00-00
Examples of Non-Rigid Modular Calabi-Yau Manifolds Part 2 - Verrill, H. (Universitaet Essen) 2003-00-00
Geometric Galois representations attached to overconvergent eigenforms - Iovita, Adrian (Concordia University) 2003-00-00
A Kaplansky theorem for free semigroup algebras - Davidson, Kenneth (University of Waterloo) 2003-00-00
Applied Differential Equations I(NCSU)-Applied Differential Equations I(NCSU)-Lecture 1 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 2 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 3 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 4 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 5 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 6 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 7 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 8 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 9 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 10 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 11 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 12 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 13 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 14 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 15 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 16 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 17 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 18 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 19 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 20 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 21 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 22 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 23 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 24 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 25 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 26 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 27 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Applied Differential Equations I(NCSU)-Lecture 28 - Harvey Charlton Professor(North Carolina State University) 2003-00-00
Introduction and Overview - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Babylonian and Egyptian Mathematics - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Greek Mathematics - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Axiomatic Systems - Geometry, Arithmetic, Set Theory - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Axiomatic Systems - Goedel' Incompleteness Theorem - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Limits - Part I (I apologize for the poor audio quality!) - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Limits - Part II - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Limits - Part III - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Functions - Part I - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Functions - Part II - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Geometry - Part I - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Geometry - Part II - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Geometry - Part III (beginning at 20:00 hw#4 is discussed) - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Geometry - Part IV (Summary) - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Calculus of Variations - Part I - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Calculus of Variations - Part II - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Optimization - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Complex Arithmetic - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Computer Graphics - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Historically Important Problems [Ideas for Final Projects] - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
More Historically Important Problems - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Recent results in distribution of primes. - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Proof of Fermat's (Little) Theorem - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Cryptography, Prime Factorizations and Public Key Encryption - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Problems and Puzzles involving Primes - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
Special Videos: Limit Example - Michael S. Pilant Professor(Texas A&M University) 2003-00-00
A lecture from Colloquia - A study of rationality and evolution in games of bargaining under threat - Amy Morrow Professor(San Francisco State University) 2003-00-00
A lecture from Colloquia - Piecewise Isometries - Dynamics in the microscopic world of geometric structures - Arek Goetz Professor(San Francisco State University) 2003-00-00
Back to top of page 2002Preference Ballots: plurality Borda Count - Tom Lada Professor(North Carolina State University) 2002-00-00
Plurality with Elimination - Tom Lada Professor(North Carolina State University) 2002-00-00
Ranking - Tom Lada Professor(North Carolina State University) 2002-00-00
Weighted Voting Systems - Tom Lada Professor(North Carolina State University) 2002-00-00
Banzhaf Power Index - Tom Lada Professor(North Carolina State University) 2002-00-00
Shapley Shubik Power Index - Tom Lada Professor(North Carolina State University) 2002-00-00
Chapter 1 and 2 Review - Tom Lada Professor(North Carolina State University) 2002-00-00
Chapter 1 and 2 Review - Tom Lada Professor(North Carolina State University) 2002-00-00
Fair Division: Divider Choose ane Lone Divider - Tom Lada Professor(North Carolina State University) 2002-00-00
Last Diminisher Last Diminisher - Tom Lada Professor(North Carolina State University) 2002-00-00
Sealed Bids - Tom Lada Professor(North Carolina State University) 2002-00-00
Method of Markers - Tom Lada Professor(North Carolina State University) 2002-00-00
Apportionment: Hamilton's Method - Tom Lada Professor(North Carolina State University) 2002-00-00
Jefferson's, Adam's Method - Tom Lada Professor(North Carolina State University) 2002-00-00
Webster's Method - Tom Lada Professor(North Carolina State University) 2002-00-00
Review of Chapters 3 and 4 - Tom Lada Professor(North Carolina State University) 2002-00-00
Introduction Graph Theory - Tom Lada Professor(North Carolina State University) 2002-00-00
Euler Paths and Circuits - Tom Lada Professor(North Carolina State University) 2002-00-00
Eulerization - Tom Lada Professor(North Carolina State University) 2002-00-00
Hamilton Circuits - Tom Lada Professor(North Carolina State University) 2002-00-00
Traveling Salesman Problem: Brute Force Method Nearest Neighbor Algorithm - Tom Lada Professor(North Carolina State University) 2002-00-00
Repetitive Nearest Neighbor Algorithm and Cheapest Link Algorithm - Tom Lada Professor(North Carolina State University) 2002-00-00
Graph Coloring - Tom Lada Professor(North Carolina State University) 2002-00-00
Review of Chapter 5 and 6 - Tom Lada Professor(North Carolina State University) 2002-00-00
Spanning Trees Kruskal's Algorithm - Tom Lada Professor(North Carolina State University) 2002-00-00
Steiner Points - Tom Lada Professor(North Carolina State University) 2002-00-00
Steiner Points - Tom Lada Professor(North Carolina State University) 2002-00-00
Scheduling, Decreasing Time Algorithm - Tom Lada Professor(North Carolina State University) 2002-00-00
Critical Path Algorithm - Tom Lada Professor(North Carolina State University) 2002-00-00
Independent Tasks Bin Packing - Tom Lada Professor(North Carolina State University) 2002-00-00
Review of Chapter 7 and 8 - Tom Lada Professor(North Carolina State University) 2002-00-00
Review of Chapter 7 and 8 - Tom Lada Professor(North Carolina State University) 2002-00-00
Fibonacci Numbers - Tom Lada Professor(North Carolina State University) 2002-00-00
Gnomons - Tom Lada Professor(North Carolina State University) 2002-00-00
Linear Growth - Tom Lada Professor(North Carolina State University) 2002-00-00
Exponential Growth and Compound Interest - Tom Lada Professor(North Carolina State University) 2002-00-00
Exponential Growth and Compound Interest - Tom Lada Professor(North Carolina State University) 2002-00-00
Fractals - Tom Lada Professor(North Carolina State University) 2002-00-00
Final Review - Tom Lada Professor(North Carolina State University) 2002-00-00
Euclid - Robin Wilson Professor(Gresham College) 2002-00-00
Newton - Robin Wilson Professor(Gresham College) 2002-00-00
Euler - Robin Wilson Professor(Gresham College) 2002-00-00
Maps, Maidens and Molecules - Robin Wilson Professor(Gresham College) 2002-00-00
Four Colours Suffice? - Robin Wilson Professor(Gresham College) 2002-00-00
A lecture excerpt from Calculus 1 - 01. Intermediate Value Theorem - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 02. Exponents and Factoring - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 03. Rational Expressions and Solving Quadratics and Cubics - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 04. Cubic polynomials, solving miscellaneous equations and an introduction to funct - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 05. Functions from a Graphical Viewpoint and Linear Functions - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 06. Linear Models - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 07. Linear Models and Quadratic Functions - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 08. Quadratic Models and Exponential Models - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 09. Exponential Models and Logarithms - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 10. Logarithms - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 11. Logarithms and Logistic functions - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 12. Average and Instantaneous Rates of Change - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 13. A Geometric Interpretation of the Derivative and Some Calculations - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 14. The definition of derivatives and shortcuts to computing them - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 15. Some applications of derivatives, including marginal cost - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 16. The product and quotient rule - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 17. The Chain Rule - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 18. Review for second exam - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 19. Applications of the Chain Rule and Derivatives of Logarithms - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 20. Derivatives of Exponentials - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 21. Maxima and Minima - Alex Schuster Professor(San Francisco State University) 2002-00-00
A lecture excerpt from Calculus 1 - 22. Maxima and Minima (part 2) - Alex Schuster Professor(San Francisco State University) 2002-00-00
Back to top of page 2001Introduction Simple Interest Decision Making Problems - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Introduction Simple Interest Decision Making Problems - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Exact and Approximate Time Promissory Notes Equations of Value, Merchant's Rule - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Exact and Approximate Time Promissory Notes Equations of Value, Merchant's Rule - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Us Rule Bank Discount Bank Discout Formulas Equivalent Rates - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Us Rule Bank Discount Bank Discout Formulas Equivalent Rates - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Test 2 Material Begins Compound Interst Formulas Finding N Interest for Part of a Conversion period Using HP-10B - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Test 2 Material Begins Compound Interst Formulas Finding N Interest for Part of a Conversion period Using HP-10B - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Using HP-10B Effective Rates Equations of Value Intro to Annuities - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Using HP-10B Effective Rates Equations of Value Intro to Annuities - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Ordinary Annuities Annuity Dues Forborne Deferred Annuities - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Ordinary Annuities Annuity Dues Forborne Deferred Annuities - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Forborne Deferred Annuities Test 3 Material Begins Finding N Smaller Concluding Payment - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Forborne Deferred Annuities Test 3 Material Begins Finding N Smaller Concluding Payment - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
General Annuities Amortization - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
General Annuities Amortization - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Amortization Refinanciong Sinking Funds - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Amortization Refinanciong Sinking Funds - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Sinking Funds Perpetuities - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Sinking Funds Perpetuities - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Capitalized Costs Review - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
Review - Marilyn McCollum Professor(North Carolina State University) 2001-00-00
1,000 Years of Mathematics: Henry Briggs - Robin Wilson Professor(Gresham College) 2001-00-00
Discrete Choice Methods with Simulation - 1: Introduction - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 2: Ways to Draw from a Density - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 3: Properties of Discrete Choice Models; Logit - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 4: Advantages and Limitations of Logit - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 5: Numerical Maximization - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 6: Continuation of Numerical Maximization - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 7: Nested Logit - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 8: Probit - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 9: Probit, Part 2 - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 10: Mixed Logit - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 11: Estimation with Simulation - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 12: Halton Sequences, Preceded By a Continuation of Estimation With Simulation - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 13: Individual Specific Parameters - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 14: Hierarchical Bayes - Train Professor(U.C. Berkeley) 2001-00-00
Discrete Choice Methods with Simulation - 15: Hierarchical Bayes, Part 2; Other Models - Train Professor(U.C. Berkeley) 2001-00-00
A lecture from Colloquia - Drawing with complex numbers - Michael Eastwood Professor(San Francisco State University) 2001-00-00
Back to top of page 2000Regular Reflection of Weak Shocks - Barbara Keyfitz (Duke University) 2001-04-16
The Practice of Mathematics1 - Robert Langlands (Duke University) 2000-00-00 Duke University
The Practice of Mathematics2 - Robert Langlands (Duke University) 2000-00-00 Duke University
Back to top of page 199934. Final Course Review - Gilbert Strang Professor(MIT) 1999-09-29
33. Left and Right Inverses; Pseudoinverse - Gilbert Strang Professor(MIT) 1999-09-28
32. Quiz 3 Review - Gilbert Strang Professor(MIT) 1999-09-27
31. Change of Basis; Image Compression - Gilbert Strang Professor(MIT) 1999-09-26
30. Linear Transformations and Their Matrices - Gilbert Strang Professor(MIT) 1999-09-25
29. Singular Value Decomposition - Gilbert Strang Professor(MIT) 1999-09-24
28. Similar Matrices and Jordan Form - Gilbert Strang Professor(MIT) 1999-09-23
27. Positive Definite Matrices and Minima - Gilbert Strang Professor(MIT) 1999-09-22
26. Complex Matrices; Fast Fourier Transform - Gilbert Strang Professor(MIT) 1999-09-21
25. Symmetric Matrices and Positive Definiteness - Gilbert Strang Professor(MIT) 1999-09-20
24b. Quiz 2 Review - Gilbert Strang Professor(MIT) 1999-09-19
24. Markov Matrices; Fourier Series - Gilbert Strang Professor(MIT) 1999-09-18
23. Differential Equations and exp(At) - Gilbert Strang Professor(MIT) 1999-09-17
22. Diagonalization and Powers of A - Gilbert Strang Professor(MIT) 1999-09-16
21. Eigenvalues and Eigenvectors - Gilbert Strang Professor(MIT) 1999-09-15
20. Cramer's Rule, Inverse Matrix, and Volume - Gilbert Strang Professor(MIT) 1999-09-14
19. Determinant Formulas and Cofactors - Gilbert Strang Professor(MIT) 1999-09-13
18. Properties of Determinants - Gilbert Strang Professor(MIT) 1999-09-12
17. Orthogonal Matrices and Gram-Schmidt - Gilbert Strang Professor(MIT) 1999-09-11
16. Projection Matrices and Least Squares - Gilbert Strang Professor(MIT) 1999-09-10
15. Projections onto Subspaces - Gilbert Strang Professor(MIT) 1999-09-09
14. Orthogonal Vectors and Subspaces - Gilbert Strang Professor(MIT) 1999-09-08
13. Quiz 1 Review - Gilbert Strang Professor(MIT) 1999-09-07
12. Graphs, Networks, Incidence Matrices - Gilbert Strang Professor(MIT) 1999-09-06
11. Matrix Spaces; Rank 1; Small World Graphs - Gilbert Strang Professor(MIT) 1999-09-05
10. The Four Fundamental Subspaces - Gilbert Strang Professor(MIT) 1999-09-04
9. Independence, Basis, and Dimension - Gilbert Strang Professor(MIT) 1999-09-03
8. Solving Ax = b: Row Reduced Form R - Gilbert Strang Professor(MIT) 1999-09-02
7. Solving Ax = 0: Pivot Variables, Special Solutions - Gilbert Strang Professor(MIT) 1999-09-01
6. Column Space and Nullspace - Gilbert Strang Professor(MIT) 1999-08-31
5. Transposes, Permutations, Spaces R^n - Gilbert Strang Professor(MIT) 1999-08-30
4. Factorization into A = LU - Gilbert Strang Professor(MIT) 1999-08-29
3. Multiplication and Inverse Matrices - Gilbert Strang Professor(MIT) 1999-08-28
2. Elimination with Matrices - Gilbert Strang Professor(MIT) 1999-08-27
1. The Geometry of Linear Equations - Gilbert Strang Professor(MIT) 1999-08-26
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