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Chapter 8: Partial Derivatives Section 8.3 Written by Dr. Julia Arnold Associate Professor of Mathematics Tidewater Community College, Norfolk Campus, Norfolk, VA With Assistance from a VCCS LearningWare Grant

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Partial derivatives are defined as derivatives of a function of multiple variables when all but the variable of interest are held fixed during the differentiation. Definition of Partial Derivatives of a Function of Two Variables If z = f(x,y), the the first partial derivatives of f with respect to x and y are the functions f x and f y defined by Provided the limits exist.

To find the partial derivatives, hold one variable constant and differentiate with respect to the other. Example 1: Find the partial derivatives f x and f y for the function

To find the partial derivatives, hold one variable constant and differentiate with respect to the other. Example 1: Find the partial derivatives f x and f y for the function Solution:

Notation for First Partial Derivative For z = f(x,y), the partial derivatives fx and fy are denoted by The first partials evaluated at the point (a,b) are denoted by

Example 2: Find the partials f x and f y and evaluate them at the indicated point for the function

Example 2: Find the partials f x and f y and evaluate them at the indicated point for the function Solution:

The following slide shows the geometric interpretation of the partial derivative. For a fixed x, z = f(x 0 ,y) represents the curve formed by intersecting the surface z = f(x,y) with the plane x = x 0. represents the slope of this curve at the point (x 0 ,y 0 ,f(x 0 ,y 0 )) Thanks to http://astro.temple.edu/~dhill001/partial-demo/ For the animation.

Definition of Partial Derivatives of a Function of Three or More Variables If w = f(x,y,z), then there are three partial derivatives each of which is formed by holding two of the variables In general, if where all but the kth variable is held constant

Notation for Higher Order Partial Derivatives Below are the different 2 nd order partial derivatives: Differentiate twice with respect to x Differentiate twice with respect to y Differentiate first with respect to x and then with respect to y Differentiate first with respect to y and then with respect to x

Theorem If f is a function of x and y such that f xy and f yx are continuous on an open disk R, then, for every (x,y) in R, f xy (x,y)= f yx (x,y) Example 3: Find all of the second partial derivatives of Work the problem first then check.

Example 3: Find all of the second partial derivatives of Notice that f xy = f yx

Example 4: Find the following partial derivatives for the function a. b. c. d. e. Work it out then go to the next slide.

Example 4: Find the following partial derivatives for the function a. b. Again, notice that the 2 nd partials f xz = f zx

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