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Find the Derivative y’ implicitly.

Find the Derivative y’ implicitly.-example-1
User Reasurria
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1 Answer

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e^(x^2y) - e^y = e^y(e^(x^2) - 1) = x

We should ISOLATE x


e^y= (x)/(e^(x^2) - 1)

Find the Natural Log of Both Sides to Make the Left Side "y"


y = ln((x)/(e^(x^2)-1))

Now, FIND THE DERIVATIVE Using Chain Rule!!!


y' = (1)/((x)/(e^(x^2)-1)) * ((1(e^(x^2)-1) - x(2x*e^(x^2)))/((e^(x^2)-1)^2)= {(e^(x^2)-1)/(x)}* ((1(e^(x^2)-1) - x(2x*e^(x^2)))/((e^(x^2)-1)^2) = {(1)/(x)}* ((1(e^(x^2)-1) - x(2x*e^(x^2)))/((e^(x^2)-1)) = {(1)/(x)}* ((e^(x^2)-1 - 2x^2e^(x^2)))/((e^(x^2)-1))

User Ztatic
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