in an equilateral triangle ABC ,E is any point on BC such that BE= 1/4 BC prove that 16AE square = 13AB square
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oin A to mid-point of BC at D. Hence ED = BE = (1/4)BC --(1)
In triangle AED, AE² = AD² + ED² -----------------(2)
In triangle ABD, AD² = AB² - BD² --------------(3)
Putting value of AD² from (3) into (2),
AE² = AB² - BD² + ED² = AB² - (BC/2)² + (BC/4)²
as BD = (1/2)BC and ED = (1/4)BC from (1).
OR AE² = AB² - (AB/2)² + (AB/4)² as BC = AB as triangle ABC is equilateral.
Simplifying this , 16AE² = 13AB²
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