设X1、X2是方程X^2-Xsin(π/5)+cos(4π/5)=0的两根,求arctanx1+arctanx2的值
设arctanx1=a,arctanx2=b,则tana=x1,tanb=x2
又因为x1+x2=sin(π/5),x1*x2=cos(4π/5)
所以tan(a+b)=(tana+tanb)/(1-tanatanb)=(x1+x2)/(1-x1x2)=sin(π/5)/[1-cos(4π/5)]=tan(π/10)
又因为x1+x2=sin(π/5)>0,x1*x2=cos(4π/5)0,x1*x2=cos(4π/5)
人气:288 ℃ 时间:2020-06-15 01:30:42
解答
tan(arctanx1+arctanx2)
=(x1+x2)/(1-x1x2)
=sin(π/5)/[1-cos(4π/5)]
=sin(π/5)/[2sin^2(2π/5)]
=sin(4π/5)/[2sin^2(2π/5)]
=2sin(2π/5)cos(2π/5)/[2sin^2(2π/5)]
=cot(2π/5)
故
arctanx1+arctanx2=π/2-2π/5=π/10谢谢你的回答,能再帮忙看一下我的补充问题吗?注意,x1,x2是数值,不是角度对啊。。所以呢??所以你又问的问题不是问题
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