Determine whether each set of side lengths could be the sides of a right triangle Drag and drop each set of side lengths to the correct box right triangle not a right triangle 8…

Question

asked Oct 23, 2019 173k views

2 Answers

Leonhard Triendl · Answer 1 · 2019-10-27T15:11:19+0000

Answer:

8 in 15 in 17 in.--- form a right angled triangle.

4 in 15 in 17 in.---- do not form a right angled triangle.

Explanation:

We know that according to the PYTHAGOREAN THEOREM of right triangles we have:

c^2=a^2+b^2

where c is the hypotenuse or the largest side of a triangle and a and b are other two legs of a right triangle,.

1)

8 in 15 in 17 in.

$17^2=15^2+8^2\\\\289=225+64\\\\289=289$

Hence, the given measure of sides form a side of a right angled triangle.

2)

4 in 15 in 17 in.

Since,

$17^2\\eq 15^2+4^2$

Hence, the given measure of sides do not form a side of a right angled triangle.