Showing that $\sum_{n=1}^{\infty}\left(\frac{\sin(22n)}{7n}\right)^3=\frac{1}{2}\left(\pi-\frac{22}{7}\right)^3$

Question

How to show that?
$$\sum_{n=1}^{\infty}\left(\frac{\sin(22n)}{7n}\right)^3=\frac{1}{2}\left(\pi-\frac{22}{7}\right)^3$$

I have no ideas to prove it, but it seems correct via Wolfram's calculator

Answer 1

First some preliminary work that will be used later:

We have for $x\in(0,2\pi)$ $$\frac{\pi-x}{2}=\sum_{n=1}^\infty\frac{\sin(nx)}{n}$$ Shifting by $6\pi$ we have for $x\in (6\pi, 8\pi)$ $$\frac{7\pi-x}{2}=\sum_{n=1}\frac{\sin(nx)}{n} \tag1 $$ Or similarly for $x\in (20\pi,22\pi)$ $$\frac{21\pi-x}{2}=\sum_{n=1}\frac{\sin(nx)}{n}\tag 2$$

Integrating $(1)$ with respect to $x$ yields $$\sum_{n=1}\frac{\cos(nx)}{n^2}=\frac{(7\pi-x)^2}{4}+C$$ Now set $x=7\pi$ to get $C=-\frac{\pi^2}{12}$ and integrate again $$\sum_{n=1}^\infty \frac{\sin(nx)}{n^3}=-\frac{(7\pi-x)^3}{12}-\frac{\pi^2}{12}x+K$$ And finally put $x=7\pi $ to get $K=7\pi\cdot \frac{\pi^2}{12}$. Thus for $x\in(6\pi,8\pi)$ we have $$\sum_{n=1}^\infty \frac{\sin(nx)}{n^3}=-\frac{(7\pi-x)^3}{12}-\frac{\pi^2}{12}x+\frac{7\pi^3}{12}\tag3$$ Similarly things for $(2)$ yields for $x\in(20\pi,22\pi)$ $$\sum_{n=1}^\infty \frac{\sin(nx)}{n^3}=-\frac{(21\pi-x)^3}{12}-\frac{\pi^2}{12}x+\frac{21\pi^3}{12}\tag4$$

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Now back to the original sum. We have the formula $4\sin^3 x =3 \sin x-\sin(3x) $ so $$S=\sum_{n=1}^{\infty}\left(\frac{\sin(22n)}{7n}\right)^3=\frac{1}{4\cdot 7^3}\left(3\sum_{n=1}^\infty \frac{\sin(22n)}{n^3}-\sum_{n=1}^\infty \frac{\sin(66n)}{n^3}\right)=\frac{1}{4\cdot 7^3}\left(3S_1-S_2\right)$$ Now things are easy because for $S_1$ we can set $x=22$ in $(3)$ and for $S_2$ we can set $x=66$ in $(4)$. $$ S_1=\sum_{n=1}^\infty \frac{\sin(22n)}{n^3}=-\frac{(7\pi-22)^3}{12}-\frac{22\pi^2}{12}+\frac{7\pi^3}{12}$$ $$S_2=\sum_{n=1}^\infty \frac{\sin(66n)}{n^3}=-\frac{(21\pi-66)^3}{12}-\frac{66\pi^2}{12}+\frac{21\pi^3}{12}$$ $$\Rightarrow S=\frac{1}{4\cdot 7^3}\left((7\pi-22)^3\left(-\frac3{12} +\frac{3^3}{12}\right)\right)=\frac{1}{2}\left(\pi-\frac{22} {7}\right)^3$$

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Generalization. We have for $x\in\left((k-1)\pi,(k+1)\pi\right)$ $$\frac{k\pi-x}{2}=\sum_{n=1}^\infty \frac{\sin (nx)}{n}$$ $$\Rightarrow \sum_{n=1}^\infty \frac{\sin(nx)}{n^3}=-\frac{(k\pi-x)^3}{12}-\frac{\pi^2}{12}x+\frac{k\pi^3}{12}$$ And for $x\in\left((3k-1)\pi,(3k+1)\pi\right)$ $$\sum_{n=1}^\infty \frac{\sin(nx)}{n^3}=-\frac{(3k\pi-x)^3}{12}-\frac{\pi^2}{12}x+\frac{3k\pi^3}{12}$$ Here is where the magic happens: $$S(a,b)=\sum_{n=1}^\infty \frac{\sin^3(an)}{(bn)^3}=\frac{1}{4b^3}\left(3\sum_{n=1}^\infty \frac{\sin(an)}{n^3}-\sum_{n=1}^\infty \frac{\sin(3an)}{n^3}\right)$$ $$=\frac{1}{4b^3}\left(-3\frac{(k\pi-a)^3}{12}-\frac{3\pi^2}{12}a+\frac{3k\pi^3}{12}+\frac{(3k\pi-3a)^3}{12}+\frac{3\pi^2}{12}a-\frac{3k\pi^3}{12}\right)$$ $$=\frac{1}{4b^3}\left((k\pi-a)^3 \left(-\frac{3}{12}+\frac{27}{12}\right)\right)=\frac{1}{2b^3}(k\pi-a)^3$$ So for example a random series: $$S(123,321)=\sum_{n=1}^\infty \frac{\sin^3(123n)}{(321n)^3}=\frac{1}{2\cdot(321)^3}(39\pi-123)^3$$ If we set $b=k$ we get quite interesting things, mostly those combinations are found here, but the series is evaluable in an elementary form for any pair of numbers.