Main Takeaway: Suppose that f(x,y) depends on two variables but that the x(t) and y(t) are themselves both functions of t. This video is based on content from "MATH 237 - Calculus 3" at the University of Waterloo.
Multivariable Chain Rule -
Suppose that f(x,y) depends on two variables but that the x(t) and y(t) are themselves both functions of t. This video is based on content from "MATH 237 - Calculus 3" at the University of Waterloo. This is the simplest case of taking the derivative of a composition involving
Important details found
- Suppose that f(x,y) depends on two variables but that the x(t) and y(t) are themselves both functions of t.
- This video is based on content from "MATH 237 - Calculus 3" at the University of Waterloo.
- This is the simplest case of taking the derivative of a composition involving
Why this topic is useful
This topic is useful when readers need a quick overview first, then want to move into supporting details and related references.
Sponsored
Frequently Asked Questions
Why are related topics included?
Related topics help readers compare nearby references and understand the broader subject.
What is this page about?
This page summarizes Multivariable Chain Rule and connects it with related entries, references, and supporting context.
Is the information always complete?
Not always. Some topics may need verification from official or primary sources.
Topic Gallery
Sponsored