Find the real and imaginary parts of log(a+ib)/(a-ib) | Prove that log(a+ib)/(a-ib)=2itan^-1b/a | find the real and imaginary parts of the complex number loga+ib/a-ib

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Find the real and imaginary parts of log(a+ib)/(a-ib) | Prove that log(a+ib)/(a-ib)=2itan^-1b/a

$log(\frac{a+ib}{a-ib})$

So the real part and the imaginary parts are 0 and $2tan^{-1}\frac{b}{a}$

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