PQR is an acute angled triangle.
It is known that:
- S, T and U are points located respectively on the sides QR, RP and PQ.
- PS is perpendicular to QR.
- RU is the internal bisector of the angle PRQ.
- RU intersects PS and ST respectively at the points J and K.
- PT = TR.
- UJ=2, JK = 1 and KR = 3
Determine the perimeter of the triangle PQR.
Let be TA perpendicular to QR
Let be UB perpendicular to QR and TA intersects UR in L
Because TA is is paralel with PS and T is in the middle of PR then A is in the middle of SR and L is in the middle of JR.
But JR is 4 so LR=LJ=2. So JK=KL=1 and the triangles TKL and JKS are the same.
So TK=KS and KR is both bisector and median in the TRS triangle.
So the isoscel triangle TRS is in fact echilateral.
So R ungle is 60º.
Easy after this can find PR = 4*sqrt(3)and SR=2*sqrt(3).
To find PQ and QS we calculate first UB from the trinagle UBR.
So UB=3 and because PS=6 then UR is both bisector and median in triangle QRP. After this we find that QS=2*sqrt(3) and QP=4*sqrt(3). So PR=RQ=QP=4*sqrt(3) and the answer is 12*sqrt(3)!
Edited on September 28, 2007, 3:40 pm
Some helpful lines!
