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How do you differentiate #f(x)=e^(5x^2+7x-13)#?

1 Answer

Nov 29, 2017

#f'(x) = e^(5x^2+7x-13)*(10x+7)#

Explanation:

By the Chain Rule, #d/dx(e^u)=e^u*(du)/dx#

Let #u=5x^2+7x-13# so #(du)/dx = 10x+7# so the derivative works out to #f'(x) = e^(5x^2+7x-13)*(10x+7)#.

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