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Question
ABCD is a square. F is the mid-point of AB. BE is one third of BC. If the area of ΔFBE = 108 cm2, find the length of AC.
Solution
Since, ABCD is a square
Then, AB = BC = CD = DA = x cm
Since, F is the mid-point of AB
Then, AF = FB = `x/2`cm
Since, BE is one third of BC
Then, BE = `x/3`cm
We have, area of ΔFBE = 108 cm2
`rArr1/2xxBExxFB=108`
`rArr1/2xx x/2xx x/3=108`
⇒ 𝑥2 = 108 × 2 × 3 × 2
⇒ 𝑥2 = 1296
`rArrx=sqrt1296=36`cm
In ΔABC, by pythagoras theorem AC2 = AB2 + BC2
⇒ AC2 = 𝑥2 + 𝑥2
⇒ AC2 = 2𝑥2
⇒ AC2 = 2 × (36)2
⇒ AC = 36`sqrt2` = 36 × 1.414 = 50.904 cm
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