Problem:
Let A,B,C be angles of a triangle with A and C acute and B greater than a right angle satisfying
βcos2A+cos2B+2sinAsinBcosC=815β and cos2B+cos2C+2sinBsinCcosA=914β.β
There are positive integers p,q,r, and s for which
cos2C+cos2A+2sinCsinAcosB=spβqrββ,
where p+q and s are relatively prime and r is not divisible by the square of any prime. Find p+q+r+s.
Solution:
Notice that
cos2A+cos2B+2sinAsinBcosC=815β
implies
sin2A+sin2Bβ2sinAsinBcosC=81β.
Let R be the circumradius and a,b, and c be the sides opposite A,B, and C, respectively. By the Extended Law of Sines
4R21β(a2+b2β2abcosC)=81β
and by the Law of Cosines
4R21ββ c2=81β
Thus
sin2C=81β
Similarly, the second given equation yields sin2A=94β, and a similar argument applied to cos2C+cos2A+2sinCsinAcosB shows that it equals 2βsin2B. Because