Let `f(x)= ax^(2) +bx + and g(x)= ax^(2) + px+q`, where a, b, c, q, `p in R and b ne p`. If their discriminants are equal and `f(x)= g(x)` has a root `alpha`, then

Let f(x) = 2x^(3) -9 ax^(2) + 12a^(2)x + 1 , where a gt 0. The minimum of f is attained at a point q and the maximum is attained at a point p. If p^(3) = q , then a is equal to a)1 b)3 c)2 d) sqrt(2)

Let f : R to R :f (x) = x ^(2) g : R to R : g (x) = x + 5, then gof is:

Let f (x) = |x-2| and g (x) = f (f (x)). Then derivative of g at the point x =5 is

Let f(x)=px^(2)+qx+r , where p, q, r are constants and p ne 0 . If f(5)= -3f(2) and f(-4)=0 , then the other root of f is

p(x)= ax^2+bx+5 :- If (x^2-1) is a factor of p(x),then find the value of a and b?

For a ne b, if the equation x ^(2) + ax + b =0 and x ^(2) + bx + a =0 have a common root, then the value of a + b equals to: