Find dy/dx by implicit differentiation cos(xy²)= y

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ClementWalter asked Aug 8, 2023

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22 votes

Find dy/dx by implicit differentiation

cos(xy²)= y

Mathematics
high-school

ClementWalter asked Aug 8, 2023

by ClementWalter

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Given

$\cos(xy^2) = y$

Chain rule:

$(d\cos(xy^2))/(dx) = (dy)/(dx)$

$-\sin(xy^2) (d(xy^2))/(dx) = (dy)/(dx)$

Product rule:

$-\sin(xy^2) \left(x(dy^2)/(dx) + y^2 (dx)/(dx)\right) = (dy)/(dx)$

$-\sin(xy^2) \left(2xy(dy)/(dx) + y^2\right) = (dy)/(dx)$

Solve for
(dy)/(dx) .

$-2xy\sin(xy^2) (dy)/(dx) - y^2 \sin(xy^2) = (dy)/(dx)$

$\left(1+2xy\sin(xy^2)\right) (dy)/(dx) = -y^2 \sin(xy^2)$

$(dy)/(dx) = \boxed{-(y^2 \sin(xy^2))/(1 + 2xy \sin(xy^2))}$

Tom Harrison answered Aug 14, 2023

by Tom Harrison

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