I am studying Fourier analysis. I noted some problems state $f,\hat{f}\in M(\mathbb{R})$ as assumption, where $M(\mathbb{R})$ denote the collection of all continuous and of moderate decrease functions on $\mathbb{R}$, which means $$\exists A \in \mathbb{R}\, \text{such that}\, \forall x\in \mathbb{R}, \ |f(x)| \lt \frac{A}{1 + |x|^{1+\epsilon}}$$
Hence I think there must be some function in $M(\mathbb{R})$ whose Fourier transform doesn't. Since I only know the Fourier transform for a few functions, may you give me an example?