Problem:
Triangle ABC has a right angle at C,AC=3 and BC=4. Triangle ABD has a right angle at A and AD=12. Points C and D are on opposite sides of AB. The line through D parallel to AC meets CB extended at E. If DBDEβ=nmβ, where m and n are relatively prime positive integers, then m+n=
Answer Choices:
A. 25
B. 128
C. 153
D. 243
E. 256
Solution:
Since AB=32+42β=5 and BD=52+122β=13, it follows that
Draw AG parallel to CE with G on DE. Then β GAD=β CAB since both are complementary to β GAB. Thus, triangles GAD and CAB are similar, and GD=ABADβCB=548β. Hence DE=563β. Apply the Pythagorean theorem to triangles ABC and DAB to find DB=13. Therefore, DBDEβ=1363/5β=6563β, so m+n=128.
