这一题怎么证明!
来源:学生作业帮助网 编辑:作业帮 时间:2024/11/16 13:04:30
这一题怎么证明!
这一题怎么证明!
这一题怎么证明!
(a^2-b^2)/c^2=(a+b/c)(a-b/c)
根据正弦定理:
(a+b/c)(a-b/c)
=(sinA+sinB/sinC)(sinA-sinB/sinC)
分别处理,用和化为积公式:
sinA+sinB/sinC=2sin(A+B/2)cos(A-B/2)/sin(A+B)
=2sin(A+B/2)cos(A-B/2)/2...
全部展开
(a^2-b^2)/c^2=(a+b/c)(a-b/c)
根据正弦定理:
(a+b/c)(a-b/c)
=(sinA+sinB/sinC)(sinA-sinB/sinC)
分别处理,用和化为积公式:
sinA+sinB/sinC=2sin(A+B/2)cos(A-B/2)/sin(A+B)
=2sin(A+B/2)cos(A-B/2)/2sin(A+B/2)cos(A+B/2)
=cos(A-B/2)/cos(A+B/2)
同理:a-b/c=sin(A-B/2)/sin(A+B/2)
所以原式=sin(A-B/2)cos(A-B/2)/sin(A+B/2)cos(A+B/2)
=sin(A-B)/sin(A+B)=sin(A-B)/sinC
收起