In quadrilateral ABCD P,Q,R and S are mid points prove the diagonal is

1.	In quadrilateral ABCD P,Q,R and S are mid points prove the diagonal is trisected
Answer» Given ABCD is a parallelogram Hence AB \|\| CD ⇒ AE \|\| FC Also AB = CD (Opposite sides of parallelogram ABCD) ⇒ AE = FC (Since E and F are midpoints of AB and CD) In quadrilateral AECF, one pair of opposite sides are equal and parallel. ∴ AECF is a parallelogram. ⇒ AF \|\| EC (Since opposite sides of a parallelogram are parallel) In ΔDPC, F is the midpoint of DC and FQ \|\| CP Hence Q is the midpoint of DQ by converse of midpoint theorem. ⇒ DQ = PQ → (1) Similarly, in ΔAQB, E is the midpoint of AB and EP \|\| AQ Hence P is the midpoint of DQ by converse of midpoint theorem. ⇒ BP = PQ → (2) From equations (1) and (2), we get BP = PQ = DQ Hence, the line segments AF and EC trisect the diagonal BD of parallelogram ABCD.

Discussion