\displaystyle{5}{\sin{{\left(\theta\right)}}}=\pm{5}\sqrt{{{1}-{\cos{{\left(\theta\right)}}}^{{2}}}} Explanation: For the purpose of simplicity, i will replace sin(theta) with y and cos(theta) ...

You can also use r=\sqrt{x^2+y^2} and \cot{\theta}=\frac{x}{y} instead.

If we have a function f then at the maxima and minima of f, we have f'=0. f(\theta)=\cos(x)\implies f'(\theta)=-\sin(\theta) We know that: -\sin(\theta)=0\implies \sin(\theta)=0\implies \theta=\pi k,k\in\Bbb{Z} ...

You've got a pretty good handle on the situation. It's not so much that you can't manipulate the potential identity as an equation as that, in general, most people shouldn't manipulate the ...

You may use a triple integral to find the volume. V= 8\int _0^2 \int _0^{\sqrt {4-x^2}}\int _0^{\sqrt {4-x^2}}dzdydx

\frac{d}{d\theta}\left(\frac{4\sin\theta}{2+\cos\theta}-\theta\right)=\frac{8\cos\theta+4}{(2+\cos\theta)^2}-1=\frac{4\cos\theta-\cos^2\theta}{(2+\cos\theta)^2}=\frac{\cos\theta(4-\cos\theta)}{(2+\cos\theta)^2}>0 ...