If `int tan^(5)xex=Atan^(4)x+Btan^(x)+g(x)+C`, where C is constant of integration and `g(0)=0, ` then

If int tan^(5)x dx =Atan^(4)x+Btan^(2)x+g(x)+C , where C is constant of integration and g(0)=0, then

If the integral I=inte^(x^(2))x^(3)dx=e^(x^(2))f(x)+c , where c is the constant of integration and f(1)=0 , then the value of f(2) is equal to

If int x^(5)e^(-x^(2))dx = g(x)e^(-x^(2))+C , where C is a constant of integration, then g(-1) is equal to

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 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 ?

If the integral int(x^(4)+x^(2)+1)/(x^(2)x-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

Let I_(n)=inttan^(n)xdx , n gt 1 . I_(4)+I_(6)=atan^(5)x+bx^(5)+C , where C is a constant of integration , then the ordered pair ( a , b) is equal to

if int x^(5)e^(-x^(2))dx=g(x)e^(-x^(2))+c where c is a constant of integration then g(-1) is equal to

If int(x(sin x-cos x)-sin x)/(e^(x)+(sin x)x)dx=-ln(f(x))+g(x)+C where C is the constant of integration and f(x) is positive then f(x)+g(x) has the value equal to