Acutely Seeking Perimeter (Posted on 2007-09-28)

	Submitted by K Sengupta
Rating: 4.0000 (1 votes)
Solution:	(Hide)
We have UK = 3 = KR. Accordingly, K is the midpoint of UR and T is the midpoint of PR. So KS is parallel to PQ, and hence S is the midpoint of QR. Therefore, PS corresponds to a median as well as an altitude, and accordingly PQ = PR. Also, PS bisects the angle QPR. Now, Angle UPJ = Angle JSK; Angle PJU = Angle SJK, and accordingly the triangles PUJ and SKJ are similar. Therefore, PJ/JS = UJ/JK = 2/1 Accordingly, J corresponds to the centroid of the triangle PQR. Since RU bisects the angle PRQ and it passes through J, it follows that RU is also a median. Consequently, RP = RQ Thus, the triangle PQR is equilateral. CF = Altitude of the triangle = 6, so that: Length of each side of the triangle = 4√(3), giving: The required perimeter of the triangle = 12√(3) = 20.78461 (correct to five places of decimals).

	Subject	Author	Date
	Some helpful lines!	Chesca Ciprian	2007-09-28 14:49:13
	Solution	Charlie	2007-09-28 11:05:16