Calculus: Early Transcendentals 9th Edition

Published by Cengage Learning
ISBN 10: 1337613924
ISBN 13: 978-1-33761-392-7

Chapter 14 - Section 14.3 - Partial Derivatives - 14.3 Exercise - Page 970: 20

Answer

As a result $w_u=\frac{-e^v}{(u+v^2)^2}$, $w_v=\frac{e^v(u+v^2)+2ve^v}{(u+v^2)^2}$.

Work Step by Step

$w=\frac{e^v}{u+v^2}$ In order to find $w_u$ we treat $v$ as a constant and differentiate with respect to $u$. $w_u=\frac{-e^v}{(u+v^2)^2}$ In order to find $w_v$ we treat $u$ as a constant and differentiate with respect to $v$. $w_v=\frac{e^v(u+v^2)+2ve^v}{(u+v^2)^2}$
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