问题标题:
1/[tan(A/2)]=tan(π/4+B/2)由此证A+B=π/2在△ABC中,已知[tan(A/2)+tan(A/2)*tan(B/2)]/(1-tan(B/2)=1,则有1/[tan(A/2)]=tan(π/4+B/2),由此证A+B=π/2
问题描述:
1/[tan(A/2)]=tan(π/4+B/2)由此证A+B=π/2
在△ABC中,已知[tan(A/2)+tan(A/2)*tan(B/2)]/(1-tan(B/2)=1,
则有1/[tan(A/2)]=tan(π/4+B/2),由此证A+B=π/2
杜太行回答:
tan(π/4+B/2)=(tanπ/4+tanB/2)/(1-tanπ/4tanB/2)公式tan(a+b)=(tana+tanb)/(1-tanatanb)=(1+tanB/2)/(1-tanB/2)=1/tanA/2已知∴(1+tanB/2)tanA/2=1-tanB/2去分母tanA/2+tanA/2tanB/2=1-tanB/2去括号∴tanA/...
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