Consider a quadratic equation `az^2+bz+c=0,` where a,b and c are complex numbers.
The condition that the equation has one purely real root, is

Consider the quadratic equation az^(2)+bz+c=0 where a,b,c are non-zero complex numbers. Now answer the following. The condition that the equation has both roots purely imaginary is

Solve that equation z^2+|z|=0 , where z is a complex number.

If ax^(2)+bx+c=0, a,b, c in R , then find the condition that this equation would have atleast one root in (0, 1).

Each coefficient in the equation a x^2+b x+c=0 is determined by throwing an ordinary six faced die. Find the probability that the equation will have real roots.

The real number k for which the equations 2x^3 +3x+k=0 has two distinct real roots in [0,1]

Let a,b,c,d be distinct real numbers and a and b are the roots of the quadratic equation x^2-2cx-5d=0 . If c and d are the roots of the quadratic equation x^2-2ax-5b=0 then find the numerical value of a+b+c+d .

If 2 - i is a root of the equation ax^2+ 12x + b=0 (where a and b are real), then the value of ab is equal to :

If a is a complex number such that |a|=1 , then find the value of a, so that equation az^2 + z +1=0 has one purely imaginary root.

If the quadratic equations, a x^2+2c x+b=0 and a x^2+2b x+c=0(b!=c) have a common root, then a+4b+4c is equal to: