If a, b, c are three distinct positive real numbers then the number of real roots of `ax^(2)+2b|x|-c=0` is

If the equations x^(2)+ax+bc=0 and x^(2)+bx+ca=0 have a common root and if a, b and c are non-zero distinct real numbers, then their other roots satisfy the equation

If x and y are positive real numbers , then prove that x lt y iff x^2 lt y^2

If a,b, c in R^(+) and 2b=a +c then check the nature of the roost of ax^(2) +2bx+c=0

If a,b,c,d are four positive real numbers such that abcd =1 then find the least value of (a+4) ( b+4) ( c+4) (d+4) .

A quadratic equation ax^(2) + bx + c =0 , with distinct coefficients is formed. If a, b, c are chosen from the numbers 2, 3, 5, then the probability that the equation has real roots is