Evaluate : `int (f(x))/(x^(3) -1)dx` where f(x) is a polynomial of second degree ini x such that `f(0) = f(1) = 3f(2) = - 3`.

Evaluate: intf(x)/(x^3-1)dx , where f(x) is a polynomial of degree 2 in x such that f(0)=f(1)=3f(2)=-3

If int(f(x))/(x^(3)-1)dx , where f(x) is a polynomial of degree 2 in x such that f(0)=f(1)=3f(2)=-3 and int(f(x))/(x^(3)-1)dx=-log|x-1|+log|x^(2)+x+1|+(m)/(sqrt(n))tan^(-1)((2x+1)/(sqrt(3)))+C . Then (2m+n) is

If int(f(x))/(x^(3)-1)dx=log|(x^(2)+x+1)/(x-1)|+(A)/(948sqrt(3))(tan^(-1)"(2x+1)/(sqrt(3)))+C , where f(x) is a polynomial of second degree in x such that f(0)=f(1)=3f(2)=3 , then A equals……..

Evaluate int_1^4 f(x)dx , where f(x)=|x-1|+|x-2|+|x-3|

Evaluate int_1^4 f(x)dx, where f(x)= |x-1|+|x-2|+|x-3|.

Let f(x) be a polynomial of degree 2 satisfying f(0)=1, f(0) =-2 and f''(0)=6 , then int_(-1)^(2) f(x) is equal to

Let f(x) be a polynomial of degree 3 such that f(3)=1, f'(3)=-1, f''(3)=0, and f'''(3)=12. Then the value of f'(1) is

If int f(x)dx=F(x), then intx^3f(x^2)dx is equal to :

Let f(x) be a polynomial satisfying f(0)=2 , f'(0)=3 and f''(x)=f(x) then f(4) equals

Let f(x) be a polynomial satisfying f(0)=2 , f'(0)=3 and f''(x)=f(x) then f(4) equals