Show that the quadrilateral formed by joining the midpoints of the pairs of adjacent sides of square is a square.
Answers
In a square ABCD, P,Q,R and S are the mid-points of AB,BC,CD and DA respectively.
⇒ AB=BC=CD=AD [ Sides of square are equal ]
In △ADC,
SR∥AC and SR=1/2 AC [ By mid-point theorem ] ---- ( 1 )
In △ABC,
PQ∥AC and PQ= 1/2 AC [ By mid-point theorem ] ---- ( 2 )
From equation ( 1 ) and ( 2 ),
SR∥PQ and SR=PQ= 1/2 AC ---- ( 3 )
Similarly, SP∥BD and BD∥RQ
∴ SP∥RQ and SP= 1/2 BD
and RQ= 1/2 BD
∴ SP=RQ= 1/2 BD
Since, diagonals of a square bisect each other at right angle.
∴ AC=BD
⇒ SP=RQ= 1/2AC ----- ( 4 )
From ( 3 ) and ( 4 )
SR=PQ=SP=RQ
We know that the diagonals of a square bisect each other at right angles.
∠EOF=90
Now, RQ∥DB
RE∥FO
Also, SR∥AC
⇒ FR∥OE
∴ OERF is a parallelogram.
So, ∠FRE=∠EOF=90
(Opposite angles are equal)
Thus, PQRS is a parallelogram with ∠R=90
and SR=PQ=SP=RQ
∴ PQRS is a square.
Answer:
In a square ABCD, P,Q,R and S are the mid-points of AB,BC,CD and DA respectively.
⇒ AB=BC=CD=AD [ Sides of square are equal ]
In △ADC,
SR∥AC and SR=1/2 AC [ By mid-point theorem ] ---- ( 1 )
In △ABC,
PQ∥AC and PQ= 1/2 AC [ By mid-point theorem ] ---- ( 2 )
From equation ( 1 ) and ( 2 ),
SR∥PQ and SR=PQ= 1/2 AC ---- ( 3 )
Similarly, SP∥BD and BD∥RQ
∴ SP∥RQ and SP= 1/2 BD
and RQ= 1/2 BD
∴ SP=RQ= 1/2 BD
Since, diagonals of a square bisect each other at right angle.
∴ AC=BD
⇒ SP=RQ= 1/2AC ----- ( 4 )
From ( 3 ) and ( 4 )
SR=PQ=SP=RQ
We know that the diagonals of a square bisect each other at right angles.
∠EOF=90
Now, RQ∥DB
RE∥FO
Also, SR∥AC
⇒ FR∥OE
∴ OERF is a parallelogram.
So, ∠FRE=∠EOF=90
(Opposite angles are equal)
Thus, PQRS is a parallelogram with ∠R=90
and SR=PQ=SP=RQ
∴ PQRS is a square.
Step-by-step explanation: