What is the derivative of $(2x-3)^5$ ?

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What is the derivative of $(2x-3)^5$ ?

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Answer 1 · 2018-03-30T01:40:36

$10(2x-3)^4$

Explanation:

Apply the chain rule, which tells us that $d/dx(f(g(x))=f'(g(x))*g'(x).$

For the function $(2x-3)^5,$ we see it is a polynomial composed with an exponential function. So, the power rule is used to differentiate the polynomial raised to the $5th$ power, and the fact that $d/dxax=a$ to differentiate the polynomial $2x-3$

$d/dx(2x-3)^5=5(2x-3)^(5-1)*d/dx(2x-3)$

$=(2)(5)(2x-3)^4=10(2x-3)^4$

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What is the derivative of $(2x-3)^5$ ?

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