Notice that \overline{e^z} =e^{\overline{z}}. Hence for z\in \mathbb{R}, \text{cos}(z) = \frac{e^{iz}+e^{-iz}}{2} = \frac{e^{iz}+e^{\overline{iz}}}{2} = \frac{e^{iz}+\overline{e^{iz}}}{2} = \text{Re}(e^{iz})

Since \cos 2a =2\cos ^{2}a -1, \qquad\sin 2a =2\sin a\cos a, \cos (a+b)=\cos a\cos b-\sin a\sin b, and \begin{eqnarray*} \cos 3\theta &=&\cos (2\theta +\theta ) \\ &=&\cos 2\theta \cos \theta -\sin 2\theta \sin \theta \\ &=&( 2\cos ^{2}\theta -1) \cos \theta -2\sin ^{2}\theta \cos \theta \\ &=&( 2\cos ^{2}\theta -1) \cos \theta -2( 1-\cos ^{2}\theta ) \cos \theta \\ &=&4\cos ^{3}\theta -3\cos \theta , \end{eqnarray*} ...

Well, in principle there's nothing wrong with the definitions you have. Mathematically, functions are defined extensionally , so two different-looking functions that have the same output on all ...

First consider \arcsin(x)-\arccos(x)\ge0. For \displaystyle x\in\left[\frac{1}{\sqrt{2}},1\right], \displaystyle \arcsin(x)\ge\frac{\pi}{4}\ge \arccos(x) For \displaystyle x\in\left[-1,\frac{1}{\sqrt{2}}\right) ...

The bounds on your second variable can be taken from the equation for the second cylinder: x^2+(y-a)^2=a^2\implies (y-a)^2=a^2-x^2\implies|y-a|=\sqrt{a^2-x^2} The part of the cylinder x^2+z^2=a^2 ...

The right direction is to use the polar coordinates from the scratch, which would turn the problem in a very easy one, but let's try a more physical observation: Since your flow field is stationary, ...