practice problems pending
Q1. The side AB of a parallelogram ABCD is produced both ways to F and G, so that AF = AD and BG = BC. Prove that FD and GC produced intersect at right angle. S1. There are 2 ways to draw the diagram here. Both give us the desired proof. Q2. In triangle AQB, points P and D lie on sides AB and AQ, respectively, such that [APQ]=[ABD]. Through D, draw the line DR∥AB, meeting BQ at R. Through B draw a line || to AQ which meets DR at C. Pr. th. RC=AP. S2. ABCD is a ||gram. AB = CD____[1] AD = BC Given [APQ] = [ABD] => Sin(A).AP.AQ = Sin(A).AB.AD => AP/AB = AD/AQ => Triangles APD and ABQ are similar by SAS. => PD || BR => BPDR is a ||gram => PD = BR and BP = DR___[2] From [1]: AP + PB = DR + RC Using [2]: AP = RC H.P. Q3. ABCD is a parallelogram. Through C, a straight line RQ is drawn outside the parallelogram, and AP, BQ, DR are drawn perpendicular to RQ. Show that DR + BQ = AP. S3.