Prove that the equation `Z^3+i Z-1=0` has no real roots.

A quadratic trinomial P(x)=a x^2+b x+c is such that the equation P(x)=x has no real roots. Prove that in this case equation P(P(x))=x has no real roots either.

Show that the equation Z^4+2Z^3+3Z^2+4Z+5=0 has no root which is either purely real or purely imaginary.

Solve the equation z^3= z (z!=0)dot

Let z be a complex number satisfying the equation z^2-(3+i)z+m+2i=0,w h e r em in Rdot Suppose the equation has a real root. Then root non-real root.

Show that the equation a z^3+b z^2+ barb z+ bara =0 has a root alpha such that |alpha|=1,a ,b ,za n dalpha belong to the set of complex numbers.

Show that the equation z^(3) + 2 bar(z) = 0 has five solutions.

If a is a complex number such that |a|=1 , then find thevalue of a, so that equation az^2 + z +1=0 has one purely imaginary root.

Given z is a complex number with modulus 1. Then the equation [(1+i a)/(1-i a)]^4=z has (a) all roots real and distinct (b)two real and two imaginary (c) three roots two imaginary (d)one root real and three imaginary