Prove that set $S= \{\sin(x)+2\sin(\sqrt{2}x)+3\sin(\sqrt{3} x) \}$ has infimum $-6$. x is positive integer
I have proved that $-6$ is lower bound of this set, but I don't know how to prove that there is no $a>-6$ that is lower bound.
2026-03-26 14:42:34.1774536154
Infimum of the set
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