根号3tanAtanB-tanA-tanB=根号3
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解析:(1)√3*tanA*tanB-tanA-tanB=√3,也即是,tanA+tanB=-√3(1-tanA*tanB)故,tanC=-tan(A+B)=-(tanA+tanB)/(1-tanA*
tan(A+B)=sin(A+B)/cos(A+B)=(sinAcosB+sinBcosA)/(cosAcosB-sinAsinB)分子,分母同时除以cosAcosB得:=(sinA/cosA+sin
(1)tan(A+B)=(tanA+tanB)/(1-tanAtanB)tan(A+B)(1-tanAtanB)=tanA+tanB=根号3tanAtanB-根号3tan(A+B)=-根号3,tan(
tan(B+C)=(tanB+tanC)/(1-tanB*tanC)tanB+tanC+根号3tanBtanC=根号3,tanB+tanC=根号3-根号3tanBtanC=根号3*(1-tanB*ta
1)由cos2θ=1-2[(sinθ)^2]可得(sinθ)^2=(1-cos2θ)/2即sinθ=根号下(1-cos2θ)/2将θ换成θ/2可得:sin(θ/2)=根号下(1-cosθ)/2同理,由
tanα+tanβ+根号3tanα*tanβ=根号3即:tanα+tanβ=根号3(1-tanα*tanβ)tan(α+β)=(tanα+tanβ)/[1-tanα*tanβ]=根号3
由tan(A+B)=(tanA+tanB)/(1-tanA*tanB)得,tan(18-x)tan(12+x)+tan(18-x)tan(12+x)+[tan(18-x)+tan(12+x)]=tan
tanA+tanB=根号3*tanAtanB-根号3tanA+tanB=根号3(tanAtanB-1)tanA+tanB=-根号3(1-tanAtanB)(tanA+tanB)/(1-tanAtanB
两角和的正切公式的变形
用sin(A+B)除以cos(A+B),再把两角和的正余弦公式代入就可以
tanA+tanB+√3=√3tanAtanBtanA+tanB=√3(tanAtanB-1)所以-√3=(tanA+tanB)/[1-tanAtanB]tanC=tan(180-A-B)=-tan(
tan(A+B)=sin(A+B)/cos(A+B)=(sinAcosB+sinBcosA)/(cosAcosB-sinAsinB)分子,分母同时除以cosAcosB得:=(sinA/cosA+sin
π/3再问:那-根号3呢再答:2π/3+2kπ再答:第一个是π/3+2kπ再问:是多少度?0-180范围内再答:60°是/3,120°是-/3
因为已知tan[(a+b)/2]=3由正切中的两倍角公式tan2A=2tanA/(1-tan²A)可知tan(a+b)=2tan[(a+b)/2]/{1-tan²[(a+b)/2]
sinBcosB=(√3)/42sinBcosB=(√3)/2sin2B=(√3)/22B=60°,B=30°tanA+tanB=√3tanAtanB-√3,tanA+tanB=-√3(1-tanAt
1)根号3*tanAtanB-tanA-tanB=根号3tanA+tanB=根号3(tanAtanB-1)tan(A+B)=(tanA+tanB)/(1-tanAtanB)=根号3*(tanAtanB
不相等,正确的式子应该是tan(A+B)=tanA+tanB+tanAtanBtan(A+B)推倒的方式如下:∵tan(A+B)=(tanA+tanB)/(1-tanAtanB)tanA+tanB=(
这个本来就是公式推公式sin(A-B)=sinAcosB-cosAsinBcos(A-B)=cosAcosB+sinAsinBtan(A-B)=(sinAcosB-cosAsinB)/(cosAcos
tan(A+B)=(tanA+tanB)/(1-tanAtanB)tan(A+B)(1-tanAtanB)=tanA+tanB=根号3tanAtanB-根号3tan(A+B)=-根号3,tan(180
-tanθ≥√3tan-θ≥√3∴kπ+π/3≤-θ<kπ+π/2∴-kπ-π/2<θ≤-kπ-π/3