I=int \ loge (logex)/(x(loge x))dx...

`I=int \ log_e (log_ex)/(x(log_e x))dx`

`(1)/(2)sqrt(log_(e)log_(e)x)+c`

`(1)/(2)(log_(e)log_(e)x)^(2)+c`

`(1)/(2)log_(e)log_(e)x+c`

none of these

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I=int(log_(e)(log_(e)x))/(x(log_(e)x))dx

The integral inte^x(f(x)+f\'(x))dx can be solved by using integration by parts such that: I=inte^xf(x)dx+inte^xf\'(x)dx=e^xf(x)-inte^xf\'(x)dx+inte^xf\'(x)dx=e^xf(x)+C , and inte^(ax)(f(x)+(f\'(x))/a)dx=e^(ax)f(x)/a+C ,Now answer the question: int{log_e(log_ex)+1/(log_ex)^2}dx is equal to (A) log_e(log_ex)+C (B) xlog_e(log_ex)-x/log_ex+C (C) x/log_ex-log_ex+C (D) log_e(log_ex)-x/log_ex+C

int log_(e)xdx=int(1)/(log_(x)e)dx=

int(e^(log_(e)x))/(x)dx

int e^(a log_(e)x)dx

int x log_(e)(1+x)dx

I=int e^(x log x)(1+log x)

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