Lecture

Applications of Differential Calculus

In course
DEMO: velit aliquip sit
Sit et velit commodo occaecat ex sint ex ipsum culpa tempor anim. Aute cupidatat dolore minim duis non Lorem esse nostrud laboris. Quis ipsum eiusmod consequat in occaecat mollit. Cillum non adipisicing duis laborum veniam. Deserunt ea occaecat est excepteur tempor et elit proident sunt est do elit esse.
Login to see this section
Description

This lecture covers applications of differential calculus, including theorems related to continuity and differentiability, such as Rolle's theorem and the rule of Bernoulli-L'Hospital. It also discusses the study of functions, convexity, concavity, local and global extrema, inflection points, and the graph of functions. The lecture provides examples and criteria for determining convexity and concavity, as well as identifying stationary points and inflection points.

Instructor
cillum aliquip qui ea
Eu velit aliquip velit quis ad deserunt sit anim cillum dolor quis commodo dolore. Irure tempor culpa mollit proident velit. Laboris labore officia sint aliquip minim ad reprehenderit dolore pariatur ipsum culpa elit minim. Aute in in non aliqua mollit sunt quis tempor.
Login to see this section
About this result
This page is automatically generated and may contain information that is not correct, complete, up-to-date, or relevant to your search query. The same applies to every other page on this website. Please make sure to verify the information with EPFL's official sources.
Related lectures (57)
Derivatives and Continuity in Multivariable Functions
Covers derivatives and continuity in multivariable functions, emphasizing the importance of partial derivatives.
Graph Sketching: Motion Analysis
Explores motion graph analysis, focusing on function study and derivative interpretation.
Real Functions: Definitions and Examples
Explores definitions and examples of real functions of a real variable.
Linear Transformations: Matrices and Kernels
Covers linear transformations, matrices, kernels, and properties of invertible matrices.
Convex Functions
Covers the properties and operations of convex functions.
Show more