If `p` and `q` are the roots of the equation `x^2-p x+q=0` , then
(a)`p=1,\ q=-2` (b) `p=1,\ q=0` (c) `p=-2,\ q=0` (d) `p=-2,\ q=1`

The parabola y=x^2+p x+q cuts the straight line y=2x-3 at a point with abscissa 1. Then the value of pa n dq for which the distance between the vertex of the parabola and the x-axis is the minimum is (a) p=-1,q=-1 (b) p=-2,q=0 (c) p=0,q=-2 (d) p=3/2,q=-1/2

If one root of the equation x^2+px+q=0 is 2+sqrt3 , then values of p and q is:

If sec alpha and cosec alpha are the roots of x^2-p x+q+0, then p^2=q(q-2) (b) p^2=q(q+2) p^2q^2=2q (d) none of these

If alpha, beta be the roots of the equation x^2-px+q=0 then find the equation whose roots are q/(p-alpha) and q/(p-beta)

Find the roots of the following quadratic equations:- p^2x^2+(p^2-q^2)x-q^2=0 .

Let a ,b , c ,p ,q be real numbers. Suppose alpha,beta are the roots of the equation x^2+2p x+q=0,alphaa n d1//beta are the roots of the equation a x^2+2b x+c=0,w h e r ebeta^2 !in {-1,0,1}dot Statement 1: (p^2-q)(b^2-a c)geq0 Statement 2: b!=p aorc!=q a

If p and q are positive real numbers such that p^2+ q^2=1 , then the maximum value of (p +q) is :

If the equation x^(3) +px +q =0 has three real roots then show that 4p^(3)+ 27q^(2) lt 0 .

Let S_p and S_q be the coefficients of x^p and x^q respectively in (1 + x)^(p+q) , then :

If the roots of the equation 1/(x+p)+1/(x+q)=1/r, (x ne -p, x ne -q, r ne 0) are equal in magnitude but opposite in sign, then p + q is equal to :