Question

if alpha nad beta are the roots of acosx+bcosx=c show

that cos(alpha+beta)=(a²-b²) / (a²+b²)

Answer 1

​$$\begin{gathered} a\cos x+b\sin x=c \\ Nowsolvingthisequationbytakingx=\theta forsimplicity, \\ a\left(\frac{1-{\tan }^2{\displaystyle \frac{\theta }{2}}}{1+{\tan }^2{\displaystyle \frac{\theta }{2}}}\right)+b\left(\frac{2\tan \theta }{1+{\tan }^2{\displaystyle \frac{\theta }{2}}}\right)=c \\ [As\cos \theta =\frac{1-{\tan }^2{\displaystyle \frac{\theta }{2}}}{1+{\tan }^2{\displaystyle \frac{\theta }{2}}}and\sin \theta =\frac{2\tan \theta }{1+{\tan }^2{\displaystyle \frac{\theta }{2}}}] \\ Or(a+c){\tan }^2\frac{\theta }{2}-2b\tan \frac{\theta }{2}+(c-a)=0 \\ Asitisquadraticin\tan \frac{\theta }{2} \\ Letitsrootsas\tan \frac{A}{2}and\tan \frac{B}{2} \\ Sosumofroots=\tan \frac{A}{2}+\tan \frac{B}{2}=\frac{2b}{a+c} \\ Andproductofroots=\tan \frac{A}{2}\times \tan \frac{B}{2}=\frac{c-a}{c+a} \\ And\tan \left(\frac{A+B}{2}\right)=\frac{\tan {\displaystyle \frac{A}{2}}+\tan {\displaystyle \frac{B}{2}}}{1-\tan {\displaystyle \frac{A}{2}}\tan {\displaystyle \frac{B}{2}}}=\frac{2b/(a+c)}{1-\left[\right(c-a)/(c+a\left)\right]}=\frac{2b}{2a}=\frac{b}{a} \\ And\cos (A+B)=\frac{1-{\tan }^2\left({\displaystyle \frac{A+B}{2}}\right)}{1+{\tan }^2\left({\displaystyle \frac{A+B}{2}}\right)}=\frac{1-b^2/a^2}{1+b^2/a^2}=\frac{a^2-b^2}{a^2+b^2} \\ Henceproved. \end{gathered}$$
Where A= $\mathrm{\alpha }\mathrm{and}\mathrm{B}=\mathrm{\beta }$