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Question

An equilateral ΔABC of side 6 cm is inscribed in a circle. Find the radius of the circle.

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Solution

Given: ΔABC is an equilateral triangle of side 6 cm.
Construct an altitude from vertex A.


We know that altitude of an equilateral triangle bisects the opposite side i.e., BD = DC = 3 cm.
Altitude bisects the chord BC, so it will pass through the centre of the circle.

In ΔABD
(AB)2=(BD)2+(AD)2
(6)2=(3)2+(r+x)2
36=9+(r+x)2
(r+x)=33) ... (1)
In ΔBOD
(BO)2=(OD)2+(BD)2
(r)2=(x)2+(3)2
(r)2(x)2=9
(r+x)(rx)=9

We know that (r+x)=33
(rx)=9r+x=933
rx=3 ... (2)

Adding (1) and (2), we get
r=23 cm


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