Problem

Let R+ denote the multiplicative group of positive real numbers and let T = {a + bi ∈ C*...

Let R⁺ denote the multiplicative group of positive real numbers and let T = {a + bi ∈ C* | a² + b² = 1} be the multiplicative group of complex numbers on the unit circle. Show that every element of C* can be uniquely expressed in the form rz, where r ∈ R⁺ and z ∈ T.

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Solutions For Problems in Chapter SE2

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