It is given that ABCD is a parallelogram.
AD || BC and AB || DC (Opposite sides of a parallelogram are parallel to each other)
Join the point A to point C.
ΔAPC and ΔBPC are lying on the same base PC and between the same parallels PC and AB.
Therefore,
ar(ΔAPC)=ar(ΔBPC)...(1)
In quadrilateral ACQD, AD = CQ
AD || BC (Opposite sides of a parallelogram are parallel)
CQ is a line segment which is obtained when line segment BC is produced.
∴AD||CQ
We have,
AC = DQ and AC|| DQ
Hence, ACQD is a parallelogram.
Consider ΔDCQ and ΔACQ.
These are on the same base CQ and between the same parallels CQ and AD.
Therefore,
ar(ΔDCQ)=ar(ΔACQ)
Then,
ar(ΔDCQ)−ar(ΔPQC)=ar(ΔACQ)−ar(ΔPQC) [Subtracting
Area(ΔPQC) from both sides]
ar(ΔDPQ)=ar(ΔAPC)...(2)
From equations (1) and (2), we obtain,
ar(ΔBPC)=ar(ΔDPQ)