I consider the following set
$$A:=\left\{ \frac{3mn}{2(m^2+mn+n^2)}; m,n \in \mathbb Z; \text{ and }m,n \text{ are not both zero}\right\}$$
Is it possible to identify the closure of $A$ in the reals?
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1 Answer
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Set $x=n/m$, rational dense in the reals, so the closure of $A$ is the image of the function $f(x)=3x/(2(x^2+x+1))$, so the interval $[-3/2,1/2]$.
answered Oct 3, 2020 at 18:49