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 f(x) is a polynomial of degree 2, such that f(0)=3,f'(0)=-7,f''(0)=8 int_(1)^(2)f(x)dx=

Find a polynomial f(x) of degree 2 where f(0)=8, f(1)=12, f(2)=18

If f (x) is a polynomial of degree two and f(0) =4 f'(0) =3,f'' (0) 4 then f(-1) =

If f (x) is polynomial of degree two and f(0) =4 f'(0) =3,f''(0) =4,then f(-1) =

If f(x) is a polynomial of least degree such that f(1)=1,f(2)=(1)/(2),f(3)=(1)/(3),f(4)=(1)/(4) then f(5)=

If intf(x)dx=2 {f(x)}^(3)+C , then f (x) is

If f(x)=(x^(2)-1)/x^(3) , then intf(x)dx is

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