18.100B Real Analysis (Spring 2025, MIT OCW): Lecture 16 - Rolle's Theorem; Mean Theorem; L'Hopital's Rule; Taylor Expansion

18.100B Real Analysis

18.100B Real Analysis (Spring 2025, MIT OCW). Instructor: Prof. Tobias Holck Colding. This course gives an introduction to analysis, and the goal is twofold:

1. To learn how to prove mathematical theorems in analysis and how to write proofs.

2. To prove theorems in calculus in a rigorous way.

The course will start with real numbers, limits, convergence, series and continuity. We will continue on with metric spaces, differentiation and Riemann integrals. After that, we will move on to differential equations. (from ocw.mit.edu)

Lecture 16 - Rolle's Theorem; Mean Theorem; L'Hopital's Rule; Taylor Expansion

In the lecture we show a second, more elaborate mean value theorem that involves two functions. This is the Cauchy mean value theorem and we use it to show the two versions of L'Hopital's rule for limits of quotients as well as the important theorem about Taylor expansion.

Go to the Course Home or watch other lectures:

Lecture 01 - Introduction to Real Numbers

Lecture 02 - Introduction to Real Numbers (cont.)

Lecture 03 - How to Write a Proof; Archimedean Property

Lecture 04 - Sequences; Convergence

Lecture 05 - Monotone Convergence Theorem

Lecture 06 - Cauchy Convergence Theorem

Lecture 07 - Bolzano-Weierstrass Theorem; Cauchy Sequences; Series

Lecture 08 - Convergence Test for Series; Power Series

Lecture 09 - Limsup and Liminf; Power Series; Continuous Functions; Exponential Function

Lecture 10 - Continuous Functions; Exponential Function (cont.)

Lecture 11 - Extreme and Intermediate Value Theorem; Metric Spaces