Question:

A circular park of radius 20m is situated in a colony. Three boys Ankur, Syed and David are sitting at equal distance on its boundary each having a toy telephone in his hands to talk each other. Find the length of the string of each phone.

Updated On: Nov 16, 2023
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Solution and Explanation

It is given that AS = SD = DA 

Therefore, ∆ASD is an equilateral triangle.

OA (radius) = 20 m

Medians of equilateral triangle pass through the circum centre (O) of the equilateral triangle ASD. We also know that medians intersect each other in the ratio 2: 1. 

As AB is the median of equilateral triangle ASD, we can write

⇒ \(\frac{OA}{OB}=\frac{2}{1}\)

⇒ \(\frac{20\,m}{OB}=\frac{2}{1}\)

⇒ OB=\((\frac{20}{2})\)m=10 m

∠AB=OA+OB=(20+10)m=30m

In ∆ABD,

AD2=AB2+BD2

AD2=(30)2\((\frac{AD}{2})^2\)

AD2=900+ \(\frac{1}{4}\) AD2

\(\frac{3}{4}\) AD2=900

AD2=1200

AD=20 \(\sqrt3\)

Therefore, the length of the string of each phone will be \(20\sqrt3\) m.

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