设z=cosθ+isinθ(0<π<2π),证明(1+z)/(1-z)=icotθ/2
展开全部
(1+z)/(1-z)=z
解析:
1±z
=(1+cosθ)±isinθ
=2cos²(θ/2)±i2sin(θ/2)cos(θ/2)
=2cos(θ/2)[cos(θ/2)±isin(θ/2)]
∴
(1+z)/(1-z)
=[cos(θ/2)+isin(θ/2)]/[cos(θ/2)-isin(θ/2)]
=e^(iθ/2)/[e^(-iθ/2)]
=e^(iθ)
=z
解析:
1±z
=(1+cosθ)±isinθ
=2cos²(θ/2)±i2sin(θ/2)cos(θ/2)
=2cos(θ/2)[cos(θ/2)±isin(θ/2)]
∴
(1+z)/(1-z)
=[cos(θ/2)+isin(θ/2)]/[cos(θ/2)-isin(θ/2)]
=e^(iθ/2)/[e^(-iθ/2)]
=e^(iθ)
=z
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
