If p, q, r are real numbers then:

If vecu, vecv, vecw are non-coplanar vectors and p,q are real numbers, then the equality [ 3 vecu, p vecv, p vecq]-[p vecv, vecq, q vecu] + [2 vecw, q vecv, q vecu]=0 holds for :

Show that if p,q,r and s are real numbers and pr=2(q+s) , then atleast one of the equations x^(2)+px+q=0 and x^(2)+rx+s=0 has real roots.

If p, q, are real and p ne q then the roots of the equation (p-q) x^(2)+5(p+q) x-2(p-q)=0 are

Let a,b,c,d be positive real numbers with altbltcltd . Given that a,b,c,d are the first four terms of an AP and a,b,d are in GP. The value of (ad)/(bc) is (p)/(q) , where p and q are prime numbers, then the value of q is _____

Consider the following relations: R = {(x, y) | x, y are real numbers and x = wy for some rational number w}; S={(m/n , p/q)"m , n , p and q are integers such that n ,q"!="0 and q m = p n"} . then,

lf r, s, t are prime numbers and p, q are the positive integers such that their LCM of p,q is r^2 t^4 s^2, then the numbers of ordered pair of (p, q) is

If p and q are prime numbers satisfying the condution p^(2)-2q^(2)=1 , then the value of p^(2)+2q^(2) is

If R is the set of real numbers and Q is the set of rational numbers, then what is R – Q ?

Let p and q be real numbers such that p ne 0 , p^(3) ne q and p^(3) ne - q. if alpha and beta are non-zero complex numbers satisfying alpha + beta = -p and alpha^(3) + beta^(3) = q, then a quadratic equation having (alpha)/(beta ) and (beta)/(alpha) as its roots is :

Let p and q be real number such that p ne 0 , p^(3) ne q and p^(3) ne -q . If alpha and beta non- zero complex number satifying alpha+ beta= -p and alpha^(3) + beta^(3) =q then a quadratic equation having (alpha)/(beta) and (beta) /(alpha) as its roots is :