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Question
Question 9
The figure obtained by joining the mid-points of the sides of a rhombus, taken In order, is
(A) a rhombus
(B) a rectangle
(C) a square
(D) any parallelogram
The figure obtained by joining the mid-points of the sides of a rhombus, taken In order, is
(A) a rhombus
(B) a rectangle
(C) a square
(D) any parallelogram
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Solution
Let ABCD be a rhombus in which P,Q,R and S are the mid-points of sides AB,BC,CD and DA, respectively.
Join AC , PR and SQ
In ΔABC P is the mid-point of AB and Q is the mid-point of BC.
⇒PQ∥AC and PQ=12AC [ by using mid-point theorem]……(i)
Similarly, in DAC,
SR ∥ AC and SR=12AC …..(ii)
From Eq (i) and (ii)
PQ ∥ SR and PQ = SR
So, PQRS is a parallelogram,
Also ABQS is a parallelogram.
⇒AB=SQ …(iii)
[ Opposite sides of a parallelogram are equal]
Similarly, PBCR is a parallelogram
⇒BC=PR [ Opposite sides of Parallelogram are equal]
⇒AB=PR[∵BC=AB sides of a rhombus]
⇒SQ=PR
So, the diagonal of a parallelogram are equal.
Hence, PQRS is a rectangle
Join AC , PR and SQ
In ΔABC P is the mid-point of AB and Q is the mid-point of BC.
⇒PQ∥AC and PQ=12AC [ by using mid-point theorem]……(i)
Similarly, in DAC,
SR ∥ AC and SR=12AC …..(ii)
From Eq (i) and (ii)
PQ ∥ SR and PQ = SR
So, PQRS is a parallelogram,
Also ABQS is a parallelogram.
⇒AB=SQ …(iii)
[ Opposite sides of a parallelogram are equal]
Similarly, PBCR is a parallelogram
⇒BC=PR [ Opposite sides of Parallelogram are equal]
⇒AB=PR[∵BC=AB sides of a rhombus]
⇒SQ=PR
So, the diagonal of a parallelogram are equal.
Hence, PQRS is a rectangle
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