The value of the integral `I=int_(0)^(pi)(x)/(1+tan^(6)x)dx, (x` not equal to `(pi)/(2)`) is equal to

The value of the integral int_(0)^(pi//2) sin^(6) x dx , is

The value of the integral int_(pi//6)^(pi//3)(dx)/(1+tan^(5)x) is

The value of the integral int_(0) ^(pi//2) sin ^3 x dx is :

The value of the integral int_(0)^(pi)(1)/(a^(2)-2a cos x+1)dx (a gt1) , is

The value of the integral int_(0)^(pi//2)log |tan x cot x |dx is

The value of the integral int_(-3pi)^(3pi)|sin^(3)x|dx is equal to

If the value of the integral I=int_(0)^(1)(dx)/(x+sqrt(1-x^(2))) is equal to (pi)/(k) , then the value of k is equal to

The value of the integral int_(0)^(pi//2)(f(x))/(f(x)+f(pi/(2)-x))dx is

Evaluate the definite integrals int_(0)^((pi)/(4)tan x)dx

Statement-1: The value of the integral int_(pi//6)^(pi//3) (1)/(1+sqrt(tan)x)dx is equal to (pi)/(6) Statement-2: int_(a)^(b) f(x)dx=int_(a)^(b) f(a+b-x)dx