Prove That the quadrilateral formed by joining the midpoint of sides of rectangle is rhombus
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Let assume that ABCD be a rectangle such that P, Q, R, S are the midpoints of the sides of a rectangle AB, BC, CD, DA respectively.
Construction: Join PQ, QR, RS, SP and AC
Now, In triangle ABC
So, By Midpoint Theorem, we get
Now, In triangle ADC
So, By Midpoint Theorem, we have
From equation (1) and (2), we concluded that
[ ∵ If in a quadrilateral, one pair of opposite sides are equal and parallel, then quadrilateral is a parallelogram ]
Now, As it is given that ABCD is a rectangle.
Further also, P is the midpoint of AB
Now,
[ By SAS Congruency ]
Hence, the line segments joining the midpoints of the consecutive sides of a rectangle form a rhombus.
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