The least value of the quadratic polynomial, `f(x) = (2p^(2) + 1) x^(2) + 2 (4p^(2) - 1) x + 4(2p^(2)+1)` for real values of p and x is

If the quadratic polynomial P (x)=(p-3)x ^(2) -2px+3p-6 ranges from [0,oo) for every x in R, then the value of p can be:

If the squared difference of the zeros of the quadratic polynomial f(x)=x^2+p x+45 is equal to 144, find the value of p .

f(x) = (5-x^(p))^((1)/(2)) . If the value of f(f(2)) = 2 , what is the value of p ?

Find a zero of the polynomial : (i) p(x)=4x-3 (ii) p(x)=2x-2

If alphaa n dbeta are the zeros of the quadratic polynomial f(x)=x^2-p x+q , then find the values of (i)alpha^2+beta^2 (ii) 1/alpha+1/beta

If alpha , beta are the roots of the quadratic equation (p^2 + p + 1) x^2 + (p - 1) x + p^2 = 0 such that unity lies between the roots then the set of values of p is (i) O/ (ii) p in (-infty,-1) cup (0,infty) (iii) p in (-1,infty) (iv) (-1,1)

If alpha and beta are the zeros of the quadratic polynomial f(x)=x^2-p(x+1)-c , show that (alpha+1)(beta+1)=1-c .

If (x - p)/(x^(2) - 3x + 2) takes all real values for x in R then the range of P is

The quadratic polynomial p(x) has the following properties: p(x)geq0 for all real numbers, p(1)=0 and p(2)=2 . Find the value of p(3) is__________.

If alpha and beta are the zeros of the quadratic polynomial p(x)=4x^2-5x-1 , find the value of alpha^2beta+alphabeta^2 .