For p, `q in R`, the roots of `(p^(2) + 2)x^(2) + 2x(p +q) - 2 = 0` are

If a, b are the roots of equation x^(2)-3x + p =0 and c, d are the roots of x^(2) - 12x + q = 0 and a, b, c, d are in G.P., then prove that : p : q =1 : 16

p, q, r and s are integers. If the A.M. of the roots of x^(2) - px + q^(2) = 0 and G.M. of the roots of x^(2) - rx + s^(2) = 0 are equal, then

If p != 0, q != 0 and the roots of x^(2) + px +q = 0 are p and q, then (p, q) =

If 2 + isqrt3 is a root of x^(3) - 6x^(2) + px + q = 0 (where p and q are real) then p + q is

If p and q are the roots of x^2 + px + q = 0 , then find p.

Let p,q,r be roots of cubic x^(3)+2X^(2)+3x+3=0 , then

if p: q :: r , prove that p : r = p^(2): q^(2) .

If the roots of the equation qx^(2)+2px+2q=0 are real and unequal, prove that the roots of the equation (p+q)x^(2)+2qx+(p-q)=0 are imaginary.

If p and q are roots of the quadratic equation x^(2) + mx + m^(2) + a = 0 , then the value of p^(2) + q^(2) + pq , is

If the roots of the equation (1-q+p^(2)/2)x^(2) + p(1+q)x+q(q-1) +p^(2)/2=0 are equal, then show that p^(2) = 4q