The value of int0^100 [tan^(-1)x] dx is...

The value of `int_0^100 [tan^(-1)x] dx` is

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What is the value of int_0^100[tan^(-1)x]dx ?

int_0^(1) tan^(-1) x dx =

STATEMENT 1 : The value of int_0^1tan^(-1)((2x-1)/(1+x-x^2)) dx=0 STATEMENT 2 : int_a^bf(x)dx=int_0^bf(a+b-x)dx then Which of the following statement is correct ?

STATEMENT 1 : The value of int_0^1tan^(-1)((2x-1)/(1+x-x^2)) dx=0 STATEMENT 2 : int_a^bf(x)dx=int_0^bf(a+b-x)dx then Which of the following statement is correct ?

What is the value of int_0^1 (tan^-1 x )/(1+x^2) dx dx

int_0^1 tan^1x/(1+x^2)dx

Evaluate int_0^1 tan^-1 x dx

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

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