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[几何] 一个三角问题

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snowblink

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snowblink Posted 2024-2-26 12:53 |Read mode
已知$\triangle ABC $的角$A,B,C $满足$\tan A\tan B\tan C\leqslant \left [ \tan A \right ] +\left [ \tan B \right ] + \left [ \tan C \right ]$,其中符号$\left [ x \right ] $表示不大于$x$的最大整数,若$A\leqslant B\leqslant C$,则$\tan C-\tan B= $
三角函数, 解三角形

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kuing

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kuing Posted 2024-2-26 13:50
注意到三角形中有 `\tan A\tan B\tan C=\tan A+\tan B+\tan C`,于是
\[\tan A+\tan B+\tan C\leqslant[\tan A]+[\tan B]+[\tan C],\]
但是 `x\geqslant[x]` 恒成立,那上式只能取等,并且 `\tan A`, `\tan B`, `\tan C` 均为整数,然后……好像以前撸过类似题……等我找找……
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kuing Posted 2024-2-26 14:02
找到啦,就是这帖:forum.php?mod=viewthread&tid=3941

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还是ku版见多识广,感谢  Posted 2024-2-26 14:47
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isee Posted 2024-2-26 16:34
kuing 发表于 2024-2-26 13:50
注意到三角形中有 `\tan A\tan B\tan C=\tan A+\tan B+\tan C`,于是
\[\tan A+\tan B+\tan C\leqslant[\ta ...
整数后真是有特色~三角分别为\[\arctan 1,\,\arctan 2\,\arctan 3.\]
isee=freeMaths@知乎
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kuing Posted 2024-2-26 17:29
上面链接里的 5# 游客说
“三个互不相等的正整数,它们的和与积相等,只能是1,2,3。”
其实“互不相等”可以去掉。
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