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Consider the function.

f(x) = 1012x^101 – 72x^75 + pix^2 –e^2x + 100346

Compute f^102)(x). Give your answer in exact form.

User JPero
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1 Answer

24 votes
24 votes

It looks like you're given


f(x) = 1012x^(101) - 72x^(75) + \pi x^2 - e^(2x) + 100346

and are asked to find the 102nd derivative of f(x).

Recall the power rule: for integer n,


\displaystyle \left(x^n\right)' = nx^(n-1)

This means that the power of x reduces to 0 after differentiating n times, and you're left with a constant coefficient n! :

• after differentiating 2 times,


\left(x^n\right)'' = \left(nx^(n-1)\right)' = n(n-1)x^(n-2)

• after differentiating 3 times,


\left(x^n\right)^((3)) = \left(n(n-1)x^(n-2)\right)' = n(n-1)(n-2)x^(n-3)

• and so on, up to the n-th time, which yields


\left(x^n\right)^((n)) = n(n-1)(n-2)\cdots*2*1x^(n-n) = n!

As soon as you have a constant, the next derivative will be 0. This means that after differentiating 102 times, the first 3 terms of f(x), as well as the constant term, will vanish.

Recall the chain rule:


\bigg(f(g(x))\bigg)' = f'(g(x)) * g'(x)

Then the first few derivatives of the exponential term are


\left(e^(2x)\right)' = e^(2x) * (2x)' = 2e^(2x)


\left(e^(2x)\right)'' = 2\left(e^(2x)\right)' = 2^2e^(2x)


\left(e^(2x)\right)^((3)) = 2^2\left(e^(2x)\right)' = 2^3e^(2x)

and so on, with n-th derivative


\left(e^(2x)\right)^((n)) = 2^ne^(2x)

Putting everything together, we have


\boxed{f^((102))(x) = -2^(102)e^(2x)}

User Adrien Levert
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2.7k points