作业帮若tan(α/2)=[tan(β/2)]^3,tanβ=2tanφ,证明α+β=2kπ+2φ(k∈Z)
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![若tan(α/2)=[tan(β/2)]^3,tanβ=2tanφ,证明α+β=2kπ+2φ(k∈Z)](/uploads/image/z/15242590-46-0.jpg?t=%E8%8B%A5tan%28%CE%B1%2F2%29%3D%5Btan%28%CE%B2%2F2%29%5D%5E3%2Ctan%CE%B2%3D2tan%CF%86%2C%E8%AF%81%E6%98%8E%CE%B1%2B%CE%B2%3D2k%CF%80%2B2%CF%86%28k%E2%88%88Z%29)
若tan(α/2)=[tan(β/2)]^3,tanβ=2tanφ,证明α+β=2kπ+2φ(k∈Z)
若tan(α/2)=[tan(β/2)]^3,tanβ=2tanφ,证明α+β=2kπ+2φ(k∈Z)
若tan(α/2)=[tan(β/2)]^3,tanβ=2tanφ,证明α+β=2kπ+2φ(k∈Z)
tan(a/2)=(tan(b/2))^3
tan(a/2+b/2)=[tan(a/2)+tan(b/2)]/[1-tan(a/2)tan(b/2)]
=(tanb/2)(1+tan(b/2)^2)/(1-(tanb/2)^4)
=tan(b/2)/[1-(tanb/2)^2]
=tanb/2=tanφ
a/2+b/2=φ+kπ