Let a complex number be w=1–√3i. Let another complex number z be s – InterviewSolution

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1.	Let a complex number be w=1–√3i. Let another complex number z be such that \|zw\|=1 and arg(z)–arg(w)=π2. Then the area of the triangle with vertices origin, z and w is equal to:
Answer» Let a complex number be $w = 1 - \sqrt{3} i$ . Let another complex number z be such that $\| z w \| = 1$ and $arg (z) - arg (w) = \frac{π}{2} .$ Then the area of the triangle with vertices origin, $z$ and $w$ is equal to:

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