已知tan(α+π/4)=-1/7.求(cos2α+1)/【2cos(α-π/4)*sin(α+π/4)-sin2α】的值。
2个回答
展开全部
tan(α+π/4)=(tanα+tanπ/4)/(1-tanα*tanπ/4)=(tanα+1)/(1-tanα)=-1/7
解得tanα=-4/3
(cos2α+1)/【2cos(α-π/4)*sin(α+π/4)-sin2α】
=2cos²α/[sin2α+sin(π/2)-sin2α]
=2/(1+tan²α)
=2/[1+(-4/3)²]
=18/25
希望能帮到你,祝学习进步O(∩_∩)O
解得tanα=-4/3
(cos2α+1)/【2cos(α-π/4)*sin(α+π/4)-sin2α】
=2cos²α/[sin2α+sin(π/2)-sin2α]
=2/(1+tan²α)
=2/[1+(-4/3)²]
=18/25
希望能帮到你,祝学习进步O(∩_∩)O
本回答由提问者推荐
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
展开全部
由已知:tan(α+π/4)=(tanα+1)/(1-tanα)=-1/7,可得tanα=-4/3,所以:
(cos2α+1)/[2cos(α-π/4)*sin(α+π/4)-sin2α]
=2cos^2(α)/{2cos(α-π/4)*sin(α+π/4)-sin[(a-π/4)+(a+π/4)]}
=2cos^2(α)/[cos(α-π/4)*sin(α+π/4)-sin(a-π/4)*cos(a+π/4)]
=2cos^2(a)/sin[(a+π/4)-(a-π/4)]
=2cos^2(a)/sinπ/2
=2cos^2(a)
=2/[tan^2(a)+1]
=2/[(-4/3)^2+1]
=18/25
(cos2α+1)/[2cos(α-π/4)*sin(α+π/4)-sin2α]
=2cos^2(α)/{2cos(α-π/4)*sin(α+π/4)-sin[(a-π/4)+(a+π/4)]}
=2cos^2(α)/[cos(α-π/4)*sin(α+π/4)-sin(a-π/4)*cos(a+π/4)]
=2cos^2(a)/sin[(a+π/4)-(a-π/4)]
=2cos^2(a)/sinπ/2
=2cos^2(a)
=2/[tan^2(a)+1]
=2/[(-4/3)^2+1]
=18/25
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
