Let `f(x)` be a non-zero polynomial of degree `4`. Extremum points of `f(x)` are `0,-1,1`.
If `f(k)=f(0)` then.

Let f(x) be an non - zero polynomial of degree 4. Extremum points of f(x) are 0,-1,1 . If f(k)=f(0) then,

Let f(x) be a polynomial such that f(-1/2)=0

If f(x) is a non-zero polynomial of degree four, having loca extreme points at x=-1,0,1 then the set S={x in R:f(x)=f(0)} contains exactly

Let f(x) be a polynomial of degree three f(0)=-1 and f(1)=0. Also,0 is a stationary point of f(x). If f(x) does not have an extremum at x=0, then the value of integral int(f(x))/(x^(3)-1)dx, is

Let f(x) be the polynomial of degree n, then Delta^(n-1) f(x) is a polynomial of degree.

Let f(x) be a polynomial of degree three f(0) = -1 and f(1) = 0. Also, 0 is a stationary point of f(x). If f(x) does not have an extremum at x=0, then the value of integral int(f(x))/(x^3-1)dx, is

Let f(x) be a polynomial of degree 6 divisible by x^(3) and having a point of extremum at x = 2 . If f'(x) is divisible by 1 + x^(2) , then find the value of (3f(2))/(f(1)) .