Categories > definite-integral > Summation of series by definite Integration > The value of the integral $\sum\limits_{k=1}^{n}{\int_{0}^{1}{f(k-1+x)\,dx}}$ is

definite-integral

Question: The value of the integral $\sum\limits_{k=1}^{n}{\int_{0}^{1}{f(k-1+x)\,dx}}$ is


1) $\int_{0}^{1}{f(x)\,dx}$
2) $\int_{0}^{2}{f(x)\,dx}$
3) $\int_{0}^{n}{f(x)\,dx}$
4) $n\int_{0}^{1}{f(x)\,dx}$
Solution: Explanation: No Explanation
Summation of series by definite Integration

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