P, Q, R, S are respectively the midpoints of the
sides AB, BC, CD and DA of ||gm ABCD. Show
that PQRS is a parallelogram and also show that
ar (Ilgm PQRS) = 1/2 xar(||gm ABCD).
Answers
Answer:
We know that
Area of parallelogram PQRS = ½
(Area of parallelogram ABCD)
Construct diagonals AC, BD and SQ
From the figure we know that S and R are the midpoints of AD and CD
Consider △ ADC
Using the midpoint theorem
SR || AC
From the figure we know that P and Q are the midpoints of AB and BC
Consider △ ABC
Using the midpoint theorem
PQ || AC
It can be written as
PQ || AC || SR
So we get
PQ || SR
In the same way we get
SP || RQ
Consider △ ABD
We know that O is the midpoint of AC and S is the midpoint of AD
Using the midpoint theorem
OS || AB
Consider △ ABC
Using the midpoint theorem
OQ || AB
It can be written as
SQ || AB
We know that ABQS is a parallelogram
We get
Area of △ SPQ = ½
(Area of parallelogram ABQS) ……. (1)
In the same way we get
Area of △ SRQ = ½
(Area of parallelogram SQCD) …….. (2)
By adding both the equations
Area of △ SPQ + Area of △ SRQ = ½
(Area of parallelogram ABQS + Area of parallelogram SQCD)
So we get
Area of parallelogram PQRS = ½
(Area of parallelogram ABCD)
Therefore, it is proved that ar (||gm PQRS) = ½ × ar (||gm ABCD).
