How do you use the Pythagorean Theorem to determine if the following triangle with sides a, b, & c is a right triangle: a=5, b=10, c=15?

c^2 != a^2 + b^2, therefore, this cannot be a right triangle. The Pythagorean Theorem applies to right angle triangles, where the sides a and b are those which intersect at right angle. The third side, the hypotenuse, is then c To test whether the given lengths of sides create a right triangle, we need to substitute them into the Pythagorean Theorem - if it works out then it is a right angle triangle: c^2 = a^2 + b^2 15^2 != 5^2+10^2 225 != 25+100 225 != 125 In reality, if a=5 and b=10 then c would have to be c^2 = 125 c =sqrt(125) = 5sqrt(5)~= 11.2 which is smaller than the proposed value in the question. Therefore, this cannot be a right triangle.

What is the equation for the Pythagorean theorem, and how is it

Pythagoras Theorem - Formula, Proof, Examples, Applications

Pythagorean Theorem - Math Steps, Examples & Questions

How to find the area of a right triangle using the Pythagorean

How do you use the Pythagorean Theorem to determine if the

Finding the missing length of a triangle using pythagorean theorem

Alg 1 TE Lesson 3-9

Special right triangle - Wikipedia

Measure of sides of four triangles are given below.identify the

The Converse

Pythagorean Triples - Definition, Formula, Examples

GraphicMaths - Pythagorean triples

Right Triangles

A right triangle's leg is 9 and the hypotenuse is 15, what is the

The Pythagorean Theorem - Trigonometry