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战巡
发表于 2025-2-10 00:06
拆开不就知道了嘛
\[\left(\cos(\frac{m\pi}{2n+1})+i\sin(\frac{m\pi}{2n+1})\right)^{2n+1}\]
\[\cos^{2n+1}(\frac{m\pi}{2n+1})+C_{2n+1}^1i\cos^{2n}(\frac{m\pi}{2n+1})\sin(\frac{m\pi}{2n+1})+C_{2n+1}^2i^2\cos^{2n-1}(\frac{m\pi}{2n+1})\sin^2(\frac{m\pi}{2n+1})+C_{2n+1}^3i^3\cos^{2n-2}(\frac{m\pi}{2n+1})\sin^3(\frac{m\pi}{2n+1})+...\]
虚部当然是$i^1,i^3,i^5,...$这些奇数次项的总和啊
即
\[Im(\mbox{原式})=\sum_{k=0}^nC_{2n+1}^{2k+1}i^{2k+1}\cos^{2n-2k}(\frac{m\pi}{2n+1})\sin^{2k+1}(\frac{m\pi}{2n+1})\]
\[=i\sum_{k=0}^nC_{2n+1}^{2k+1}(-1)^k\cos^{2n-2k}(\frac{m\pi}{2n+1})\sin^{2k+1}(\frac{m\pi}{2n+1})\]
除以$\cos^{2n+1}(\frac{m\pi}{2n+1})$得到
\[=i\sum_{k=0}^{n}C_{2n+1}^{2k+1}(-1)^k\tan^{2k+1}(\frac{m\pi}{2n+1})\]
重新编码,令$j=n-k$,就得到
\[=i\sum_{j=0}^nC_{2n+1}^{2n+1-2j}(-1)^{n-j}\tan^{2n+1-2j}(\frac{m\pi}{2n+1})\]
\[=i\tan(\frac{m\pi}{2n+1})\sum_{j=0}^nC_{2n+1}^{2j}(-1)^{n-j}\tan^{2n-2j}(\frac{m\pi}{2n+1})\] |
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