The equal `x^(2)-px+q=0, p,q, in R` has no real roots if :

If the equation x^(2)-2px+q=0 has two equal roots, then the equation (1+y)x^(2)-2(p+y)x+(q+y)=0 will have its roots real and distinct only, when y is negative and p is not unity.

If p, q, r each are positive rational number such tlaht p gt q gt r and the quadratic equation (p + q - 2r)x^(2) + (q + r- 2p)x + (r + p - 2q) = 0 has a root in (-1 , 0) then which of the following statement hold good? (A) (r + p)/(q) lt 2 (B) Both roots of given quadratic are rational (C) The equation px^(2) + 2qx + r = 0 has real and distinct roots (D) The equation px^(2) + 2qx + r = 0 has no real roots

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,r and s are real numbers such that pr=2(q+s), then show that at least one of the equations x^(2)+px+q=0 and x^(2)+rx+s=0 has real roots.

Let alpha, beta are the two real roots of equation x ^(2) + px +q=0, p, q in R, q ne 0. If the quadratic equation g (x)=0 has two roots alpha + (1)/(alpha), beta + (1)/(beta) such that sum of roots is equal to product of roots, then the complete range of q is:

Let p and q are non-zeros.The equation x^(2)+px+q=0 has p and q as the roots.The roots of x^(2)+px+q=0 are

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

Determine or proving the nature of the roots: If p;q;r;s are real no.such that pr=2(q+s) then show that atleast one of the equations x^(2)+px+q=0 and x^(2)+rx+s=0 has real roots.