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Find dy/dx 2^(xy) = x^2

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Find dy/dx 2^(xy) = x^2

asked Jul 20, 2018 66.1k views

2 votes

Find dy/dx
2^(xy) = x^2

Find dy/dx 2^(xy) = x^2-example-1

Mathematics
college

by JFSIII

7.8k points

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1 Answer

5 votes

2^(xy)=x^2

$e^{\ln2^(xy)}=x^2$

$e^(xy\ln2)=x^2$

Differentiate, using the chain rule on the left side:

$(\mathrm d)/(\mathrm dx)[e^(xy\ln2)]=(\mathrm d)/(\mathrm dx)[x^2]$

$e^(xy\ln2)(\mathrm d)/(\mathrm dx)[xy\ln2]=2x$

$e^(xy\ln2)\left(x\ln2(\mathrm dy)/(\mathrm dx)+y\ln2\right)=2x$

$x\ln2(\mathrm dy)/(\mathrm dx)+y\ln2=2xe^(-xy\ln2)$

$x(\mathrm dy)/(\mathrm dx)+y=(2^(xy+1))/(\ln2)$

$(\mathrm dy)/(\mathrm dx)=\frac1x\left((2^(xy+1))/(\ln2)-y\right)$

ArtiBucco answered Jul 24, 2018

8.2k points

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