作业帮求证:化简[tan(A+B)-tanA-tanB]÷[tanA·tan(A+B)]=tanB.RT
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![求证:化简[tan(A+B)-tanA-tanB]÷[tanA·tan(A+B)]=tanB.RT](/uploads/image/z/2495714-50-4.jpg?t=%E6%B1%82%E8%AF%81%EF%BC%9A%E5%8C%96%E7%AE%80%5Btan%28A%2BB%29-tanA-tanB%5D%C3%B7%5BtanA%C2%B7tan%28A%2BB%29%5D%3DtanB.RT)
求证:化简[tan(A+B)-tanA-tanB]÷[tanA·tan(A+B)]=tanB.RT
求证:化简[tan(A+B)-tanA-tanB]÷[tanA·tan(A+B)]=tanB.
RT
求证:化简[tan(A+B)-tanA-tanB]÷[tanA·tan(A+B)]=tanB.RT
tan(B)=tan(A+B-A)=(tan(A+B)-tanA)/(1+tanA*tan(A+B)
故:tanB/1=(tan(A+B)-tanA)/(1+tanA*tan(A+B)
由合比性质:
tanB/1=(tan(A+B)-tanA)/(1+tanA*tan(A+B)
=(tan(A+B)-tanA-tanB)/(1+tanA*tan(A+B)-1)
=[tan(A+B)-tanA-tanB]/[tanA·tan(A+B)]
证明:
[tan(A+B)-tanA-tanB]÷[tanA·tan(A+B)]
=[(tanA+tanB)/(1-tanAtanB) - (tanA+tanB)]/
[ tanA·(tanA+tanB)/(1-tanAtanB)]
=[(tanA+tanB)-(tanA+tanB)·1-tanAtanB] /
...
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证明:
[tan(A+B)-tanA-tanB]÷[tanA·tan(A+B)]
=[(tanA+tanB)/(1-tanAtanB) - (tanA+tanB)]/
[ tanA·(tanA+tanB)/(1-tanAtanB)]
=[(tanA+tanB)-(tanA+tanB)·1-tanAtanB] /
[tanA·(tanA+tanB)] 上下同时乘以1-tanAtanB 得
=[1-(1-tanAtanB)]/tanA 约去(tanA+tanB)
=tanB
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