若cos(a+π/6)等于4/5,则sin(2a+π/12)的值为? 大家帮忙
1个回答
展开全部
是不是少了一个条件: a为锐角?
如果是,解答如下:
a是锐角π/2<a+π/6<2π/3cos(a+π/6)=4/5,sin(a+π/6)=3/5sin(2a+π/3)=2sin(a+π/6)cos(a+π/6)=2*(4/5)*(3/5)=24/25cos(2a+π/3)=2cos�0�5(a+π/6)-1=2*(4/5)�0�5-1=7/25sin(2a+π/12)=sin[(2a+π/3)-π/4]=sin(2a+π/3)cos(π/4)-cos(2a+π/3)cos(π/4)=(24/25)*(√2/2)-(7/25)*(√2/2)=17√2/50
如果是,解答如下:
a是锐角π/2<a+π/6<2π/3cos(a+π/6)=4/5,sin(a+π/6)=3/5sin(2a+π/3)=2sin(a+π/6)cos(a+π/6)=2*(4/5)*(3/5)=24/25cos(2a+π/3)=2cos�0�5(a+π/6)-1=2*(4/5)�0�5-1=7/25sin(2a+π/12)=sin[(2a+π/3)-π/4]=sin(2a+π/3)cos(π/4)-cos(2a+π/3)cos(π/4)=(24/25)*(√2/2)-(7/25)*(√2/2)=17√2/50
本回答由网友推荐
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
推荐律师服务:
若未解决您的问题,请您详细描述您的问题,通过百度律临进行免费专业咨询
