prove that the parallelogram circumscribing a circle is a rhombus.
Answers
Hey mate..
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The figure of the given question is in the pic.
Restatement:--
Let , ABCD be a parallelogram in which a circle with centre circumscribes. AB , BC , CD and AD touches the circle at the points E, F , G and H respectively.
Proof:---
We know,
Lengths of the tangets drawn from an external point to a circle are equal.
So,
AE = AH..........(1)
BE= BF..............(2)
CG = CF.............(3)
DG = DH.............(4)
Now,
(1) + (2) + (3) + (4)
=> AE + BE + CG + DG = AH + BF + CF + DH
=> AB + CD = ( AH + DH ) + ( BF + CF )
=> AB + CD = AD + BC
We know,
Opposite sides of the parallelogram are equal.
Therefore ,
=> AB + AB = AD + AD
( Since, AB=CD and AD=BC)
=> 2 AB = 2 AD
=> AB = AD
But, They are adjacent sides of the parallelogram.
We also know ,
If the adjacent sides of the parallelogram are equal, then it is a rhombus.
Therefore,
The parallelogram circumscribing a circle is a rhombus.
[Hence ,Proved]
