In the given figure, PR gt PQ and PS bisect angleQPR . Prove that: anglePSR gt anglePSQ
In the figure given below, PS is the bisector of /_ QPR of Delta PQR . Prove that (QS)/(SR) = (PQ)/(PR)
In the figure, PR || RC and QR || BD . Prove that PQ || CD .
In Fig . PS is the bisecto of angle QPR of Delta PQR . Prove that (QS)/(SR) = (PQ)/(PR)
In Fig PS is the bisector of angleQPR " of " DeltaPQR . Prove that (QS)/(SR)=(PQ)/(PR)
In a Delta ABC , let P and Q be points on AB and AC respectively such that PQ || BC . Prove that the median AD bisects PQ.
Let PQ and RS be tangents at the extremities of the diameter PR of a circle of radius r. If PS and RQ intersect at a point X on the circumference of the circle, then 2r equals:
ABCD is a parallelogram. AC and BD are the diagonals intersect at O. P and Q are the points of tri section of the diagonal BD. Prove that CQ" ||" AP and also AC bisects PQ (see figure).
In the figure, /_ QPR = /_ UTS = 90^(@) and PR || TS . Prove that
