A triangle has sides with lengths of 12 meters, 19 meters, and 20 meters. Is it a right triangle?

Question

asked Dec 12, 2023 11.0k views

1 Answer

Jellyse · Answer 1 · 2023-12-15T23:16:09+0000

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Work Shown:

$a = 12\\\\b = 19\\\\c = 20\\\\a^2+b^2 = 12^2+19^2 = 505\\\\c^2 = 20^2 = 400\\\\$

The values of
a^2+b^2 and
c^2 are not the same number

Therefore, there's no way that
a^2+b^2 = c^2 is possible, which means we do not have a right triangle.

Put another way: since
$a^2+b^2 \\e c^2$ , this means we don't have a right triangle.

Refer to the converse of the pythagorean theorem for more information.

Side note: because of that same theorem, and because
a^2+b^2 > c^2 is the case, this means we have an acute triangle based on what is shown below.