practice problems pending
Q1) Let (ABCD) be a rectangle such that (BC = 3AB). (P) and (Q) are points on the side (BC) such that BP = PQ = QC. Show that \angle DBC + \angle DPC = \angle DQC. S1. Q2. In a quadrilateral ABCD, given that angle A + angle D = 90. Pr. th. AC^2 + BD^2 = AD^2 + BC^2. S2. BC^2 = OB^2 + OC^2 AD^2 = OA^2 + OD^2 BC^2 + AD^2 = OB^2 + OC^2 + OA^2 + OD^2 Look at RHS: OA^2 + OC^2 = AC^2 OB^2 + OD^2 = BD^2 H.P. Q3. In ( \triangle ABC ), (BM) and (CN) are perpendiculars from (B) and (C) respectively on a line passing through (A). If (L) is the midpoint of (BC), prove that [ ML = NL. ] S3. Method 1: Let LP be perpendicular to the same line passing through A. LP || BM || CN According to Intercept theorem, if 3 parallel lines cut 2 equal segments from a traversal, they will do the same with any other traversal. So MP = PN Now we will show triangle LMP congruent to LNP. LP is common side. Angle P is 90 in both. MP = PN. => LM = LN. Method 2: co-ordinate geometry Let the line thro...