|
|
战巡
发表于 2013-10-22 11:40
回复 1# 史嘉
纯三角也可以做吧....
首先积化和差...
\[\frac{\cos(a)\cos(\frac{b}{2})}{\cos(a-\frac{b}{2})}+\frac{\cos(b)\cos(\frac{a}{2})}{\cos(b-\frac{a}{2})}=\frac{\cos(a+\frac{b}{2})+\cos(a-\frac{b}{2})}{2\cos(a-\frac{b}{2})}+\frac{\cos(b+\frac{a}{2})+\cos(b-\frac{a}{2})}{2\cos(b-\frac{a}{2})}\]
\[=\frac{\cos(a+\frac{b}{2})}{2\cos(a-\frac{b}{2})}+\frac{\cos(b+\frac{a}{2})}{2\cos(b-\frac{a}{2})}+1=1\]
\[\frac{\cos(a+\frac{b}{2})}{2\cos(a-\frac{b}{2})}+\frac{\cos(b+\frac{a}{2})}{2\cos(b-\frac{a}{2})}=0\]
\[\cos(a+\frac{b}{2})\cos(b-\frac{a}{2})+\cos(b+\frac{a}{2})\cos(a-\frac{b}{2})=0\]
再次积化和差
\[\frac{1}{2}[\cos(\frac{a}{2}-\frac{3b}{2})+\cos(\frac{3a}{2}-\frac{b}{2})+\cos(\frac{3a}{2}+\frac{b}{2})+\cos(\frac{a}{2}+\frac{3b}{2})]=0\]
然后重新和差化积
\[\cos(\frac{a}{2})\cos(\frac{3b}{2})+\cos(\frac{b}{2})\cos(\frac{3a}{2})=0\]
\[\cos(\frac{a}{2})[\cos(b)\cos(\frac{b}{2})-\sin(b)\sin(\frac{b}{2})]+\cos(\frac{b}{2})[\cos(a)\cos(\frac{a}{2})-\sin(a)\sin(\frac{a}{2})]=0\]
\[\cos(\frac{a}{2})\cos(\frac{b}{2})[\cos(a)+\cos(b)]=\cos(\frac{b}{2})\sin(\frac{a}{2})\sin(a)+\cos(\frac{a}{2})\sin(\frac{b}{2})\sin(b)\]
\[\cos(a)+\cos(b)=2\sin^2(\frac{a}{2})+2\sin^2(\frac{b}{2})=2-\cos(a)-\cos(b)\]
\[\cos(a)+\cos(b)=1\] |
|
楼主: 史嘉
kuing
发表于 2013-10-22 11:59
……