A quadratic equation whose roots are `cosec^(2)thetaandsec^(2)theta` can be

Show that sec ^(2) theta+cosec^(2) theta geq 4

If alpha and beta are the roots of equation x^(2)-4x+13=0 , then find the quadratic equation whose roots are alpha^(4)-4 alpha^(3)+13 alpha^(2)+2 and (beta^(3)-4 beta^(2)+13 beta+1)/(4)

The quadratic equation whose roots are three times the roots of the equation 2x^(2)+3x+5=0 , is

Find the quadratic equation whose sum of the roots of is 2 and sum of their cubes is 98.

If alpha, beta are the roots of the quadratic equation x^(2)-2(1-sin 2theta) x-2 cos^(2) 2 theta=0, (theta in R) then find the minimum value of (alpha^(2)+beta^(2)) .

If alpha and beta are the roots of the equation 2x^(2)+2(a+b)x +a^(2)+b^(2)=0 , then find the equation whose roots are (alpha+beta)^(2) and (alpha-beta)^(2) .

Let a=e^(i""(2pi)/3) . Then the equation whose roots are a+a^(2) and a^(2)+a^(4) is :