本帖最后由 hbghlyj 于 2020-1-20 18:53 编辑
${(\sin a + \sin b + \sin c + \sin d - \sin (a + b) - \sin (c + d))^2} + {( - 2 + \cos a + \cos b + \cos c + \cos d - \cos (a + b) - \cos (c + d))^2} = {(\sin a + \sin b - 2\sin (a + b) + \sin (a + b - c) + \sin (a + b - d) - \sin (a + b - c - d))^2} + {( - 1 + \cos a + \cos b - 2\cos (a + b) + \cos (a + b - c) + \cos (a + b - d) - \cos (a + b - c - d))^2}$ |