`x^(2)+2x+3=0` has

Assertion (A), The equation x^(2)+ 2|x|+3=0 has no real root. Reason (R): In a quadratic equation ax^(2)+bx+c=0, a,b,c in R discriminant is less than zero then the equation has no real root.

The equation |2x - x^(2) - 3|=1 has

The quadratic equation x^(2)-9x+3=0 has roots alpha and beta.If x^(2)-bx-c=0 has roots alpha^(2)and beta^(2), then (b,c) is

If the equation a x^2+2b x-3c=0 has no real roots and ((3c)/4) 0 c=0 (d) None of these

Find the value of such that x^(3)-|a|x^(2)+ 3x +4 = 0 has only one real root.

Show that the equation x^(3)+2x^(2)+x+5=0 has only one real root, such that [alpha]=-3 , where [x] denotes the integral point of x

The equation 2x ^(3) -3x ^(2) +p=0 has three real roots. Then find the minimum value of p.

Prove that x^(4)+2x^(2)-x+2=0 has no real solution.

If x^(2)+px+q=0 has roots 2i + 3, 2i–3 then the discriminant of the equation is

The roots of the equation x^(3) -2x^(2) -x +2 =0 are