Complex number \(1\)

Algebra Level 4

\(z\) is a complex number satisfying the equation \((z+1)^5=32z^5\). It can be shown that all the roots of the above polynomial in \(z\) are equidistant from a fixed complex number \(x\).Then find the value of \(|x|\).

×

Problem Loading...

Note Loading...

Set Loading...