One way to do this: The set \def\ZZ{\mathbb Z}A=\ZZ+2\pi\ZZ is dense in \mathbb R. This can be done by mimicking my answer here As a consequence, the set B=\{\exp(in):n\in\mathbb Z\} is dense ...

The function is Lipschitz and hence uniformly continuous in all of \Bbb R. Given x,y \in \Bbb R, by the Mean Value Theorem there exists z between x and y such that: |\cos(2x)-\cos(2y)| = |2\sin(2z)||x-y| \leq 2|x-y|, ...

\displaystyle={e}^{{{5}{\cos{{2}}}{x}+{4}}}{\left({1}+{5}{\cos{{2}}}{x}\right)} Explanation: whilst the intention of this question may have been to encourage the use of the chain rule on both \displaystyle{f{{\left({x}\right)}}} ...

A well known property of linear time-invariant (LTI) systems is that exponentials are eigenfunctions. That is, if the signal x[n]=e^{i\omega n},n\in\mathbb{Z}, \omega \in \mathbb{R}, is input to a ...

In the interval \displaystyle{0}\le{x}\le{2}\pi,{x}=\frac{{{2}\pi}}{{3}}{\quad\text{and}\quad}{x}=\frac{{{4}\pi}}{{3}} Explanation: \displaystyle{2}{\left({\cos{{x}}}+{1}\right)}={1}{\quad\text{or}\quad}{\left({\cos{{x}}}+{1}\right)}=\frac{{1}}{{2}}{\quad\text{or}\quad}{\cos{{x}}}=-\frac{{1}}{{2}} ...

\displaystyle{x}=\frac{\pi}{{3}}+{2}{k}\pi\ \text{ or }\ {x}=\frac{{{5}\pi}}{{3}}+{2}{k}\pi Explanation: \displaystyle{2}{\cos{{x}}}+{4}={5} \displaystyle\Rightarrow{2}{\cos{{x}}}={5}-{4}={1} ...