Chapter 2: Problem 63
\(z^{2}=z^{2}\)
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Find each of the following in rectangular form \(x+i y\). $$ e^{-(i \pi / 4)+\ln 3} $$
\(\frac{x+t y+2+3 t}{2 x+2 i y-3}=i+2\)
Prove that the conjugate of the quotient of two complex numbers is the quotient of the conjugates. Also prove the corresponding statements for difference and product. Hint: It is casier to prove the statements about product and quotient using the polar coordinate \(r e^{i \theta}\) form ; for the difference, it is easier to use the rectangular form \(x+i y_{\text {. }}\)
Find each of the following in the \(x+i y\) form. $$ \cosh \left(\frac{i \pi}{2}-\ln 3\right) $$
In the following integrals express the sines and cosines in exponential form and then integrate to show that: $$ \int_{-\pi}^{\pi} \sin 3 x \cos 4 x d x=0 $$
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