Problem:
In β³RED,RD=1,β DRE=75β and β RED=45β. Let M be the midpoint of segment RD. Point C lies on side ED such that RCβ₯EM. Extend segment DE through E to point A such that CA=AR. Then AE=caβbββ, where a and c are relatively prime positive integers, and b is a positive integer. Find a+b+c.
Solution:
Let N be the midpoint of CR and P be the intersection of EM and CR. In isosceles triangle ARC, median AN is perpendicular to the base CR, implying that ANβ₯EM. Note that MN is a midline of β³RCD, from which it follows that NMβ₯CD and CD=2MN. Therefore MNAE is a parallelogram, and CD=2MN=2AE.
Angle EDR=180ββ(75β+45β)=60β. Let β DEM=x. Then β REM=45ββx,β EMR=60β+x,β CRD=90βββ EMR=30ββx, and, because β³ECP is a right triangle, β ACR=90ββx. Applying the Law of Sines in β³REM and β³MED gives
EMRMβ=sin75βsin(45ββx)β and MDEMβ=sinxsin60ββ
Multiplying the two equations together yields
1=sin75βsinxsin(45ββx)sin60ββ or sin60βsin75ββ=sinxsin(45ββx)β.
