Problem:
A circle with center O has radius 25. Chord AB of length 30 and chord CD of length 14 intersect at point P. The distance between the midpoints of the two chords is 12. The quantity OP2 can be represented as nmβ, where m and n are relatively prime positive integers. Find the remainder when m+n is divided by 1000 .
Solution:
Let M and N be the midpoints of chords AB and CD, respectively. By the Pythagorean Theorem, MO2=AO2βAM2 and NO2=CO2βCN2, so MO=20 and NO=24. Applying the Law of Cosines to β³OMN results in
sinβ MON=15214ββ,sinβ OMN=15414ββ, and sinβ MNO=9214ββ.
In β³MNP,MN=12,β MNP=β MNO+90β, and β NMP=β OMNβ90β. Thus sinβ MNP=cosβ MNO=95β, and sinβ NMP=βcosβ OMN=151β. The corresponding cosines are cosβ MNP=β9214ββ and cosβ NMP=15414ββ. Applying the Law of Sines to β³MNP yields 5/9MPβ=sinβ NPM12β. Now β NPM=180ββ(β NMP+β MNP), so sinβ NPM=sin(β NMP+β MNP)=151ββ 9β214ββ+15414βββ 95β=15214ββ, and
MP=15214ββ95ββ 12β=14β50β
By the Pythagorean Theorem, OP2=MO2+MP2=400+142500β=74050β. Thus m+n=4057, and the required remainder is 57
OR
Note that β OMP and β ONP are right angles, and thus β³OMP and β³ONP are right triangles with the common hypotenuse OP. Therefore the two triangles are inscribed in the same semicircle, and quadrilateral OMNP is cyclic. Hence β NMO and β NPO are supplementary, and sinβ NMO=sinβ NPO. Applying the Law of Cosines to β³MNO yields cosβ NMO=β151β,sinβ NMO=sinβ NPO=15414ββ, and the result follows as before.
