Find the quadratic equation with real coefficients which has (-5-i) as a root

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

Find the quadratic equation with rational coefficients whose one root is 1/(2+sqrt(5))

Form a quadratic equation with real coefficients whose one root is 3-2i

The quadratic equation p(x)=0 with real coefficients has purely imaginary roots.Then the equation p(p(x))=0 has A.only purely imaginary roots B.all real roots C.two real and purely imaginary roots D.neither real nor purely imaginary roots

Introduction and State Quadratic Equation with real coefficients

One of the roots of a quadratic equation with real coefficients is (1)/((2-3i)) . Which of the following implications is/are true? 1. The second root of the equation will be (1)/((3-2i)) . 2. The equation has no real root. 3. The equation is 13x^(2)-4x+1=0. Which of the above is/are correct ?

Find the quadratic equation whose roots are, -3, 5

Find the quadratic equation whose one root is (1-i) .

Statement -1 : There is just one quadratic equation with real coefficient one of whose roots is 1/(sqrt2 +1) and Statement -2 : In a quadratic equation with rational coefficients the irrational roots are in conjugate pairs.

Statement -1 : There is just on quadratic equation with real coefficients, one of whose roots is 1/(3+sqrt7) and Statement -2 : In a quadratic equation with rational coefficients the irrational roots occur in pair.