Let` fx)` be a polynomial function of second degree. If `f(1)= f(-1)` and a, b,c are in A.P, the `f'(a),f'(b) and f'(c)` are in

Let f(x) be a polynomial function of second degree.If f(a)=f(-a) and a,b,c are in A.P.P.then f'(a),f'(b),f'(c) are in 1) G.P.2 ) H.P.3 ) A.G.P.4 ) A.P.

Let f(x) be a polynomial function of the second degree. If f(1)=f(-1) and a_(1), a_(2),a_(3) are in AP, then f'(a_(1)),f'(a_(2)),f'(a_(3)) are in :

let f(x) be a polynomial function of second degree. If f(1)=f(-1)and a_(1),a_(2),a_(3) are in AP, then show that f'(a_(1)),f'(a_(2)),f'(a_(3)) are in AP.

Let f(x) be a second degree polynomial function such that f(-1)=f(1) and alpha,beta,gamma are in A.P. Then, f'(alpha),f'(beta),f'(gamma) are in

If f(x) is a polynomial function of the second degree such tha f(0)=5, f(-1)=10 and f(1)= 6 then f(x)=_____.

Let f(x) be a polynomial function such that f(x)=x^(4) . What is f'(1) equal to?

If f(x) is a polynomial function of the second degree such that, f(-3)=6,f(0)=6" and "f(2)=11 , then the graph of the function, f(x) cuts the ordinate x = 1 at the point