practice problems pending
Q1. S1. QR || AC by MPT. => line BHE is perpendicular to QR. In triangle AHB, using MPT, QP || BH. => QR is perpendicular to QP => angle PQR = 90 H.P. Q2. ABCD is a quadrilateral in which AB = AD . The bisectors of ∠BAC and ∠CAD intersect the sides BC and CD at E and F , respectively. Prove that (EF ||BD). S2. Using Angle bisector theorem: Triangle ABC: AB/BE = AC/EC Triangle ADC: AD/DF = AC/FC => AB/AC = BE/EC = AD/AC = DF/FC (since AB = AD) Now in triangle BDC: EF divides the sides BC and DC in same ratio => EF || BD H.P.