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F(x)= int 0 ^ x (t^ 3 +7t^ 2 +4) dt then

F(x)= int 0 ^ x (t^ 3 +7t^ 2 +4) dt then
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F(x)= int 0 ^ x (t^ 3 +7t^ 2 +4) dt then

F(x)= int 0 ^ x (t^ 3 +7t^ 2 +4) dt then-example-1
User Refaelos
by
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1 Answer

4 votes

Since the given function is


f(x)=\int_0^x(t^3+7t^2+4)dt

That means


f^(\prime)(x)=(t^3+7t^2+4)

Then to find f''(x) we will differentiate f'(x) with respect to t


\begin{gathered} f“(x)=3t^(3-1)+7(2)t^(2-1)+0 \\ \\ f“(x)=3t^2+14t \end{gathered}

The answer is


f“(x)=3t^2+14t

User Vladaman
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