Let f(x) be a second degree polynomial f...

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

Similar Questions

Explore conceptually related problems

If f(x) is a polynomial function of second degree. IF f(1) = f(-1) and a,b,c are in A.P., then f'(a), f'(b), f'(c ) are in :

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

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

Let f(x) 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 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 (1) = f( -1) and a,b,c are in A.P., then f' (a), f'(c ) are in

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 differentiable function and f(alpha)=f(beta)=0(alpha

Let f(x) be a differentiable function and f(alpha)=f(beta)=0(alpha< beta), then the interval (alpha,beta)