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
log(\frac{a+ib}{a-ib})
![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](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEiMe673OxCktN8ZwRtRwC5N_OQSUbnGa32L51e7gxzKsiajwuVbX3_7cuyjVY0xmtPbG9WR1A0AuVlElic44VXFaPWem3NTZ5xJZCrfFi2vd_DTUAMjLCNnzROdTXoYiqwoPxbGdX4heQo9GCk5x6q3Mmf62Eox0OOPk0m5r1tfBCOslZyLFoN8IJdX/w640-h370/Find%20real%20and%20imaginary.jpg)
So the real part and the imaginary parts are 0 and 2tan^{-1}\frac{b}{a}
log(\frac{a+ib}{a-ib})
So the real part and the imaginary parts are 0 and 2tan^{-1}\frac{b}{a}