int_(0)^(100)[tan^(-1)x]dx

The integral I=int_(0)^(100pi)[tan^(-1)x]dx (where, [.] represents the greatest integer function) has the vlaue K(pi)+ tan(p) then value of K + p is equal to

The integral I=int_(0)^(100pi)[tan^(-1)x]dx (where, [.] represents the greatest integer function) has the vlaue K(pi)+ tan(p) then value of K + p is equal to

If int_(0)^(1) tan^(-1) x dx = p , then the value of int_(0)^(1) tan^(-1)((1-x)/(1 +x)) dx is

If int_(0)^(1) tan^(-1) x dx = p , then the value of int_(0)^(1) tan^(-1)((1-x)/(1 +x)) dx is

If 2int_(0)^(1)tan^(-1)xdx=int_(0)^(1)cot^(-1)(1-x+x^(2))dx then int_(0)^(1)tan^(-1)(1-x+x^(2))dx=

If 2int_(0)^(1)tan^(-1)xdx=int_(0)^(1)cot^(-1)(1-x+x^(2))dx then int_(0)^(1)tan^(-1)(1-x-x^(2))dx is equal to

If 2int_(0)^(1) tan^(-1)xdx=int_(2)^(1)cot^(-1)(1-x+x^(2))dx . Then int_(0)^(1) tan^(-1)(1-x+x^(2))dx is equal to

Evaluate the integral int_(0)^(1) x tan^(-1)x dx

int_(0)^(1)x tan^(-1)x dx=