The equation of lowest degree with rational coefficients having a root `sqrt(5)+sqrt(7)` is

The equation of lowest degree with rational coefficients having a root sqrt(a)+i sqrt(b) is

The equation of the lowest degree with rational coefficients having a root sqrt(7)-i is

The equation of the lowest degree with rational coefficients having a root sqrt(3)+i sqrt(2) is

The equation of lowest degree with rational coefficients,one of whose roots is sqrt(7)+sqrt(3) is x^(4)-20x^(2)+16=0 The equation of lowest degree with rational coefficients.One of whose roots is sqrt(2)+i sqrt(3) is x^(4)+2x^(2)+25=0

The equation of fourth degree with rational coefficients one of whose roots is sqrt(3)+sqrt(2) is

From the equation of the lowest degree with rational co-efficients, which has 2+sqrt(3) and 3+sqrt(2) as two of its roots.

Let p(x)=0 be a polynomial equation of the least possible degree,with rational coefficients having root(3)(7)+root(3)(49) as one of its roots.Then product of all the roots of p(x)=0 is 56 b.63 c.7 d.49

Let p (x) be a polynomial equation of least possible degree, with rational coefficients, having ""^(3)sqrt7 +""^(3)sqrt49 as one of its roots. Then the product of all the roots of p (x) =0 is:

A quadratic equation with rational coefficients can have

The quadratic equation with rational coefficients whose one root is 2-sqrt(3) is