Problem:
Equilateral triangle ABC has been creased and folded so that vertex A now rests at Aβ² on BC as shown. If BAβ²=1 and Aβ²C=2 then the length of crease PQβ is
Answer Choices:
A. 58β
B. 207β21β
C. 21+5ββ
D. 813β
E. 3β
Solution:
Since β BAβ²P+β Aβ²PB+60β=180β=β BAβ²P+60β+β QAβ²C, it follows that β Aβ²PB=β QAβ²C and thus β³Aβ²PBβΌβ³QAβ²C. Let x=AP=Aβ²P and y=QA=QAβ². Then
QAβ²Aβ²Pβ=QCAβ²Bβ=Aβ²CPBβ, or yxβ=3βy1β=23βxβ
Solve to obtain x=57β and y=47β. Now apply the Law of Cosines to β³PAQ,
Let x=PA=PAβ² and y=QA=QAβ². Apply the Law of Cosines to β³PBAβ² to obtain x2=(3βx)2+1β2(3βx)cos60β which leads to x=7/5. Consider β³QCAβ² in a similar fashion to find y=7/4. Then complete the solution as above.
