作业帮lnA lnB lnC>sinA ..
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(2sinA+cosA)/(sinA-cosA)=-5上下同除cosA(2tanA+1)/(tanA-1)=-52tanA+1=-5tanA+57tanA=4tanA=4/71.(sinA+cosA)
sina+cosa=√2(sinacos45°+cosasin45°)=√2sin(a+45°)
[coska-sinkasinkacoska]
条件不足设a是第四象限角,化简cosa根号下(1-sina)/(1+sina)+sina根号下(1-cosa)/(1+cosa)cosa√(1-sina)/(1+sina)+sina√(1-cosa)
(sina-cosa)^2=sina^2-2sina*cosa+cosa^2=1-sin2a(sina^2+cosa^2=1,2sina*cosa=sin2a)
1+sina+cosa/1+sina-cosa+1-cosa+sina/1+cosa+sina=[(1+sina+cosa)²+(1+sina-cosa)²]/[(1+sina)&
左边=[tana+tana·sina+sina]/[tana+tana·sina-sina]=[1+sina+cosa]/[1+sina-cosa]=[1+sina+cosa]²/[(1+s
原式=[cos^2a-(1-sin^2a)]/(1-sina)cosa=(cos^2a-1+sin^2a)/(1-sina)cosa=(1-1)/(1-sina)cosa=0
原式=-(cos2a-sin2a)/[cos2a(sina+cosa)]=-cos2a/[cos2a(sina+cosa)]=-1/(sina+cosa)
sina+cosa=√2(√2/2×sina+√2/2×cosa)=√2(cos(π/4)×sina+cos(π/4)×cosa)=√2(sin(a+π/4))同样sina-cosa=√2(sin(a
1.将(sinα+cosα)^2和(sinα-cosα)^2拆开后化简2.tanα写成sinα/cosα,在与sinαcosα通分3.化简用到的公式:(a+b)^2=a^2+b^2+2absin^2α
sinA/(1+sinA)-sin/(1-sinA)=[sinA(1-sinA)-sinA(1+sinA)]/[(1+sinA)(1-sinA)]=-2sin^2A/cos^2A=-tan^2A
右边=[cosa(1+cosa)-sina(1+sina)]/(1+sina)(1+cosa)=(cosa+cos²a-sina-sin²a)/(1+sina)(1+cosa)=[
/>sina-cosa/cosa+sina=(tana-1)/(1+tana)分子分母同时除以cosa=[tana-tan(π/4)-tana]/[1+tan(π/4)tana]=tan(a-π/4)
是两个矩阵相乘?结果是单位矩阵1001
tana-[√(1+sina)/(1-sina)]=tana-(|1+sina|/cosa|)=sina-1-sina)/cosa=-1/cosa,(a在第一,四象限)或=1/cosa,(a在第2,3
Sina=2Cosa,即得tana=2Sina^2+2Sina*Cosa=[Sina^2+2Sina*Cosa]/[sin^2+cos^2]=(tan^2a+2tana)/(tan^2a+1)=8/5