Which quadratic has `2+3i and 2-3i` as its solutions?

Solve each of the following quadratic quadratic equations by comparing its roots with the roots of the general quadratic equation: 3x^2-(2-i)x+10-4i=0

Solve each of the following quadratic quadratic equations by comparing its roots with the roots of the general quadratic equation: x^2+(2+i)x-2(1+7i)=0

Solve each of the following quadratic equations by comparing its roots with the roots of the general quadratic equation: x^2-(3i-2sqrt3)x-6sqrt3i=0

Find the quadratic equation whose solution set is : (i) {3, 5} (ii) {-2, 3}

The quadratic equation with real coefficients has one root 2i^(*)s

Form the quadratic equation, if its roots are (i) 10 and 3

From the quadratic equation, if its roots are (i) 10 and 3

From the quadratic equation, if its roots are (i) 10 and 3

One root of the quadratic equation (2+3i)x^(2)-bx+(3-i)=0 is (2-i). Find its other root and the value of b.

In the following, determine the set of values of k for which the given quadratic equation has real roots: (i) 2x^2+3x+k=0 (ii) 2x^2+k x+3=0