" The distance of the roots of the equation "|sin theta_(1)|z^(3)+|sin theta_(2)|z^(2)+|sin theta_(3)|z+|sin theta_(4)|=3," from "z=0" are "

Prove that the distance of the roots of the equation |sin theta_(1)|z^(3)+|sin theta_(2)|z^(2)+|sin theta_(3)|z+|sin theta_(4)|=3 from z=0 is greater than 2/3.

The distance of the roots of the equation tan theta_(0) z^(n) + tan theta_(1) z^(n-1) + …+ tan theta_(n) = 3 from z=0 , where theta_(0) , theta_(1) , theta_(2),…, theta_(n) in [0, (pi)/(4)] satisfy

Solutions of the equation sin (sqrt(1 + sin 2 theta)) = sin theta + cos theta " is " (n in Z)

The general value of theta satisfying the equation 2sin^(2)theta-3 sin theta-2=0 is (n in Z)

Solution of the equation sin (sqrt(1+sin 2 theta))= sin theta + cos theta is (n in Z)

Solution of the equation sin (sqrt(1+sin 2 theta))= sin theta + cos theta is (n in Z)

Solution of the equation sin (sqrt(1+sin 2 theta))= sin theta + cos theta is (n in Z)

If z=1-cos theta+i sin theta, then |z|=2(sin theta)/(2) b.2(sin theta)/(2)c.2|(sin theta)/(2)|d.2|(cos theta)/(2)|

The general values of theta satisfying the equation 2sin^2theta-3sintheta-2=0 is (n in Z)dot