A circle touches all side of parallogeam so the parallogram must be a
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Answer:
A circle touches all side of a parallelogram must be a rhombus.
So, option B is correct.
Given - AB=CDBC=AD].......(⊛)
Now, AP=AS
[ Theorem-If from one external point, two tangents are drawn two circle then have equal tangent segments.
So, AP=AS [tangent from point A] ------(1)
⇒BP=BQ [tangent from point B] ---------(2)
⇒CR=CQ [tangent from point C] ---------(3)
⇒DR=DS [tangent from point D] ----------(4)
equation (1)+(2)+(3)+(4)
AP+BP+CR+DR=AS+BQ+CQ+DS
AB+DC=AD+BC [from diagram]
2AB=2AD from ⊛
AB=AD And from ⊛ AB=CD and BC=AD
So,
AB=BC=CD=AD
It is rhombus.
Explanation:
In sort it is a rhombus
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Answer:
A circle touches all side of parallogram so the parallogram must be a rhombus/square
Explanation:
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