int_(0)^( pi/2)log tan xdx

Prove: int_(0)^( pi/2)log|tan x|dx=0

If int_(0)^( pi/2)log sin xdx=k, then the value of the definite integral int_(0)^( pi/4)log(1+tan theta)d theta( i) -(K)/(8)( ii) -(K)/(4) (iii) (K)/(8) (iv) (K)/(4)

" (x) "int_(0)^( pi/4)tan xdx

int_(0)^( pi/2)log[tan x*cot x]dx

int_(0)^(pi//2) log (tan x ) dx=

Prove that: int_(0)^( pi/2)log|tan x+cot x|dx=pi log_(e)2

What is the value of int_0^(pi/2)log tan x dx ?

" (a) "int_(0)^( pi)tan xdx

int_(0)^( pi)log xdx

Evaluate: int_(0)^( pi)x log sin xdx