462 次の等式, 不等式を証明せよ。 cos 2 a 2tand (1) cos2d tan 2a *(2) sina+cos' β≧cos 2β-cos2a

(2) (左辺) (右辺) - ($ .1-)9 =sin'a + cos'β-cos2β+ cos2a=l- =sina + cos2β-(2cos2β-1)+(1-2sina) =2sina-cos22?=00 = (1-sin² a)+(1-cos28)≥0.00 よって (左辺) > (右辺) 別解1 (左辺) (右辺) - CLAN =sin'a + cos2β-cos2β + cos2a = =sin'a + cos2β-(1-2sin'β)+(2cosa-1) = sin'α +2cos'α+2sin'β+cos2β-2 = (sin'a + cos2a)+(sin'β+cos2β) +cos² a + sin² 8-2-b =cos2α + sin'β≧O よって (左辺) > (右辺) (I-)=