Log-4 -1-3i can be expressed in cartesian form as

We know that, ln(z)=ln(|z|)+i(z) For z= 1+√(3)i ; |z|=2 ,(z)=π π3=2π3 ∴log_π/4 ( 1+√(3)i)=ln ( 1+√(3)i) lnπ4=ln 2+2π3ilnπ4 ...

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Logarithm of a Complex Number

logπ/4 -1+√3i...

Question

${log}_{\frac{π}{4}} (- 1 + \sqrt{3} i)$ can be expressed in cartesian form as

\frac{ln 2 + (\frac{2 π}{3}) i}{ln \frac{π}{4}}

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\frac{ln 2 - (\frac{2 π}{3}) i}{ln \frac{π}{4}}

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\frac{ln 2 + (\frac{π}{3}) i}{ln \frac{π}{2}}

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\frac{ln 2 - (\frac{2 π}{3}) i}{ln \frac{π}{2}}

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Express the complex numbers in the form of $a + i b$ :

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