Luis Saumell

Lecture 27 - Introduction to Area and Definite Integrals

Lecture 26 - Taylor Series

Lecture 26 - Integration by Substitution

Lecture 25 - Introduction to Indefinite Integrals

Lecture 24 - Sketching functions Part 2

Lecture 24 - Sketching Functions Part 1

Lecture 23 - Some Optimization Examples

Lecture 25 - Some Properties of Power Series

Lecture 24 - Introduction to Power Series

Lecture 23 - Alternating Series Remainder Theorem, absolute and conditional convergence, Ratio Test

Lecture 22 - Concavity of a function, Second Derivative Test

Lecture 22 - Examples of Comparison Test. Alternating Series Test

Lecture 21 - Absolute extrema and First Derivative Test

Lecture 20 - Relative Extrema and Critical Points

Lecture 21 - Geometric and Telescoping Series. The Divergence Test

Lecture 19 - Indeterminate Forms of Limits and L'Hopital's Rule

Lecture 20 - Introduction to Infinite Series

Lecture 18 - Related Rates

Lecture 19 - Sequences Part 2

Lecture 17 - More examples on derivatives of exponentials and logarithmic differentiation

Lecture 16 - Derivative of Inverse Trigonometric Functions, Logarithms and Exponentials

Lecture 18 - Sequences

Lecture 15 - Implicit Differentiation

Lecture 17 - P integrals and Comparison Theorem

Lecture 16 - Introduction to Improper Integrals

Lecture 15 - Partial Fractions, more examples

Lecture 14 - The Chain Rule

Lecture 13 - More Examples on Differentiation

Lecture 14 - Partial Fractions Decomposition Part 2 (The method)

Lecture 13 - Partial Fraction Decomposition Part 1 (motivation)