If n is an odd positive integer, then in...

If n is an odd positive integer, then `int|x^(n)|dx` is equal to

A

`|(x^(n+1))/(n+1)|+c`

B

`(x^(n+1))/(n+1)+c`

C

`(|x^(n)|x)/(n+1)+c`

D

`(-|x^(n)|^(n))/(n+1)+c`

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The correct Answer is:

C

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