The shorter sides of an acute triangle are x cm and 2x cm. The longest side of the triangle is 15 cm. What is the smallest possible whole-number value of x

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asked Jun 7, 2018 201k views

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Ddutra · Answer 1 · 2018-06-12T04:09:45+0000

for an acute angled triangle

h^2 < x^2 + y^2 where h = longest side and x and y are the other 2 sides.

so here we have

15^2 < x^2 + (2x)^2

15^2 < 5x^2

x^2 > 15*3 = 45
x > sqrt 45 or x > 6.7

So smallest whole number value of x is 7

The shorter sides of an acute triangle are x cm and 2x cm. The longest side of the triangle is 15 cm. What is the smallest possible whole-number value of x

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