1.
sinx=sin(x/2+x/2)=2sinx/2cosx/2=(2sinx/2cosx/2)/(sin^2x/2+cos^2x/2)=2tanx/2/(1+tan^2x/2);
2.
cosx=cos(x/2+x/2)=cos^2x/2-sin^2x/2=(cos^2x/2-sin^2x/2)/(sin^2x/2+cos^2x/2)=(1-tan^2x/2)/(1+tan^2x/2);
3.
tanx=sinx/cosx=2tanx/2/(1-tan^2x/2)
给分吧~:)
设tan(A/2)=t sinA=2t/(1+t^2) tanA=2t/(1-t^2) cosA=(1-t^2)/(1+t^2) 推导第一个: (其它类似)sinA=2sin(A/2)cos(A/2) =[2sin(A/2)cos(A/2)]/[sin^2(A/2)+cos^2(A/2)] 分子分母同时除以cos^2(A/2) =[2sin(A/2)cos(A/2)/cos^2(A/2)]/[(sin^2(A/2)+cos^2(A/2))/cos^2(A/2)] 化简: =[2sin(A/2)/cos(A/2)]/[sin^2(A/2)/cos^2(A/2)+1] 即: =(2tan(A/2))/(tan^(A/2)+1)sinα=2sin(α/2)cos(α/2)=[2sin(α/2)cos(α/2)]/[sin(α/2)^2+cos(α/2)^2]=[2tan(α/2)]/[1+(tanα/2)^2] cosα=[cos(α/2)^2-sin(α/2)^2]=[cos(α/2)^2-sin(α/2)^2]/[sin(a/2)^2+cos(a/2)^2]=[1-tan(α/2)^2]/[1+(tanα/2)^2] tanα=tan[2*(α/2)]=2tan(α/2)/[1-tan(α/2)^2]=[2tan(a/2)]/[1-(tanα/2)^2]
