Chứng minh rằng 2/sin4x tan2x = cot2x
Giải thích
2sin4x−tan2x=22sin2x.cos2x−sin2xcos2x=1sin2x.cos2x−sin2xcos2x=cos2x−cos2x.sin22xsin2x.cos22x=cos2x1−sin22xsin2x.cos22x=cos2x.cos22xsin2x.cos22x=cos2xsin2x= cot2x.
2sin4x−tan2x=22sin2x.cos2x−sin2xcos2x=1sin2x.cos2x−sin2xcos2x=cos2x−cos2x.sin22xsin2x.cos22x=cos2x1−sin22xsin2x.cos22x=cos2x.cos22xsin2x.cos22x=cos2xsin2x= cot2x.