Find `int(log (log x)+1/((log x)^2)) d x`

Find int( log x d x)

int (1)/( x (log x) log (log x) ) dx is equal to a) log (log x) + C b) log | log (x log x) + C c) log | log | log (log x) || + C d) log | log (log x) | + C

int(1+logx)/((1+xlogx)^(2))dx is equal to a) (1)/(1+xlog|x|)+C b) (1)/(1+log|x|)+C c) (-1)/(1+xlog|x|)+C d) log|(1)/(1+log|x|)|+C

If f(x) = sin x , the derivative of f (log x) w.r.t.x is a)cosx b)f' (logx) c)cos (log x) d) (cos(logx))/(x)

int (log x)/(x^(2))dx is equal to a) (log x)/(x) + (1)/(x^(2)) +C b) -(log x)/(x) + (2)/(x) + C c) -(log x)/(x) - (1)/(2x) + C d) -(log x)/(x) - (1)/(x) + C

int _(0) ^(pi//2) (cos x )/( 1 + sin x ) dx equals to a) log 2 b) 2 log 2 c) (log2) ^(2) d) 1/2 log 2

Evaluate int_1^2 (log (x+1))/(x+1) d x