Question

Given `z` is a complex number such that `Arg(z) = theta` and `|z| = r` , write an expression for each of `Arg(4z^3)` and `|4z^3|` in terms of r and/or θ. How should I approach this?

Answer 1

Contd.........

Explanation:

A complex no. `z` is such that `Arg(z)=theta and |z|=r`.

Clearly, `z=r(costheta+isintheta)`.

By De Moivre's Theorem, `z^n=r^n(cosntheta+isinntheta)`.

`:. z^3=r^3(cos3theta+isin3theta)`.

`:. 4z^3=4r^3(cos3theta+isin3theta)`.

Answer 2

`z = r e^(i theta)`

`4 z^3 = 4(r e^(i theta))^3 = 4 r^3 e^(i 3 theta)`

• `"Arg"(4 z^3) = 3 theta`

• `abs (4 z^3) = 4 r^3`

Explanation: