Problem:
Given that (1+sint)(1+cost)=45β and
(1βsint)(1βcost)=nmββkβ
where k,m, and n are positive integers with m and n relatively prime, find k+m+n.
Solution:
Let s=sint+cost and p=sintcost. It is given that 1+s+p=45β; thus p=41ββs. It then follows that
1=cos2t+sin2t=s2β2p=s2+2sβ21β
which leads to s=β1Β±10β/2. Because β2<s<2, however, the only possible value for s is β1+10β/2. Then
(1βsint)(1βcost)=1βs+p=45ββ2s=413ββ10β
so k+m+n=27β.
The problems on this page are the property of the MAA's American Mathematics Competitions