2024年清华大学强基计划数学试题(回忆版)#8
已知集合 $\{\cos \alpha, \cos 2 \alpha, \cos 3 \alpha\}=\{\sin \alpha, \sin 2 \alpha, \sin 3 \alpha\}$,则 $\alpha$ 可以是( )
A.$\dfrac{\pi}{8}$
B.$-\dfrac{3 \pi}{8}$
C.$\dfrac{2 \pi}{3}$
D.$-\dfrac{\pi}{3}$
答案 ABC.
解析 根据题意,有\[\sin\alpha+\sin 2\alpha+\sin 3\alpha=\cos \alpha+\cos 2\alpha+\cos 3\alpha,\]两边同乘以 $\sin\dfrac{\alpha}2$,积化和差可得\[\cos\dfrac{\alpha}2-\cos\dfrac{7\alpha}2=\sin\dfrac{7\alpha}2-\sin\dfrac{\alpha}2\implies \sin\left(\dfrac{\alpha}2+\dfrac{\pi}4\right)=\sin\left(\dfrac{7\alpha}2+\dfrac{\pi}4\right),\]因此\[\dfrac{7\alpha}2+\dfrac{\pi}4=\dfrac{\alpha}2+\dfrac{\pi}4+2k\pi~\text{或}~\pi -\left(\dfrac{\alpha}2+\dfrac{\pi}4\right)+2k\pi,\quad k\in\mathbb Z,\]也即\[\alpha=\dfrac{2k\pi}3~\text{或}\dfrac{(4k+1)\pi}8,\quad k\in\mathbb Z,\]代入检验,可得 $\alpha=\dfrac{(4k+1)\pi}8$($k\in\mathbb Z$),符合题意的选项有 $\boxed{A}$ $\boxed{B}$.
答案打错了,多了个C