Consider `int x tan^(-1) x dx = A (x^(2) + 1) tan^(-1) x + Bx + C`, where C is the constant of integration
What is the value of B ?

Consider int x tan^(-1) x dx = A (x^(2) + 1) tan^(-1) x + Bx + C , where C is the constant of integration What is the value of A ?

Consider intxtan^(-1)xdx=A(x^(2)+1)tan^(-1)x+Bx+C where , C is the constant of integration. What is the value of B ?

Consider intxtan^(-1)xdx=A(x^(2)+1)tan^(-1)x+Bx+C where , C is the constant of integration. What is the value of A ?

int(dx)/(1+e^(-x)) is equal to : Where c is the constant of integration.

What is int (x^(2) + 1)^((5)/(2))x dx equal to ? where c is a constant of integration

If int sin^(-1) ( sqrt( (x)/(1 + x) ) )dx = A(x) tan^(-1) (sqrtx) + B(x) + C , where C is a constant of integration then the ordered pair (A(x) , B(x) ) can be :

What is int ((1)/(cos^(2)x) - (1)/(sin^(x)x))dx equal to ? where c is the constant of integration

If the integral int(x^(4)+x^(2)+1)/(x^(2)-x+1)dx=f(x)+C, (where C is the constant of integration and x in R ), then the minimum value of f'(x) is

Consider the following : 1. int l n 10 dx = x + c 2. int 10^(x) dx = 10^(x) + c where c is the constant of integration. Which of the above is/are correct ?