The equation of the smallest degree with real coefficients having 1+i as one of the roots is-

LetP(x)=0 be the polynomial equation of least possible degree with rational coefficients having 3sqrt7+3sqrt49 as a root. Then the product of all the roots of P(x)=0 is

Find the quadratic equation with real coefficients which has 2+i as a root (i=sqrt-1) .

Find the quadratic equation with real coefficients which has 2±3i as a root (i=sqrt-1)

Let y=f(x) be a polynomial of odd degree (geq3) with real coefficients and (a, b) be any point. Statement 1: There always exists a line passing through (a , b) and touching the curve y=f(x) at some point. Statement 2: A polynomial of odd degree with real coefficients has at least one real root.

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

Let 1,w,w^2 be the cube root of unity. The least possible degree of a polynomial with real coefficients having roots 2w ,(2+3w),(2+3w^2),(2-w-w^2) is _____________.

A quadratic equation with integral coefficients has two different prime numbers as its roots. If the sum of the coefficients of the equation is prime, then the sum of the roots is a. 2 b. 5 c. 7 d. 11

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

Let I, omega and omega^(2) be the cube roots of unity. The least possible degree of a polynomial, with real coefficients having 2omega^(2), 3 + 4 omega, 3 + 4 omega^(2) and 5- omega - omega^(2) as roots is -

The real roots of the equation