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Question 7
The sides of a triangle are 35cm, 54cm, and 61cm respectively. The length of its longest altitude.

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Solution

Let ABC be a triangle in which sides AB = 35 cm, BC = 54 cm, CA = 61 cm

Now, semi-perimeter of a triangle,
s=a+b+c2=35+54+612=1502=75 cm
[ semiperimeter, s=a+b+c2]
Area of ΔABC=s(sa)(sb)(sc)
=75(7535)(7554)(7561)
=75×40×21×14
=25×3×4×2×5×7×3×7×2
=5×2×2×3×75=4205 cm2
Also, area of ΔABC=12×AB×Altitude
12×35×CD=4205
CD=420×2535
CD=245
Hence, the length of the longest altitude is 245 cm


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