Question
Pythagorean Theorem Proofs Quick Check
3 of 5
Using the Converse of the Pythagorean Theorem, explain whether a triangle with sides 15, 10, and 12 is a right triangle. (1 point)
No, because 22 is not equal to 15 .
No, because 325 is not equal to 144 .
No, because 369 is not equal to 100 .
No, because 244 is not equal to 225 .
3 of 5
Using the Converse of the Pythagorean Theorem, explain whether a triangle with sides 15, 10, and 12 is a right triangle. (1 point)
No, because 22 is not equal to 15 .
No, because 325 is not equal to 144 .
No, because 369 is not equal to 100 .
No, because 244 is not equal to 225 .
Answers
GPT-4o mini
To determine whether a triangle with sides 15, 10, and 12 is a right triangle using the Converse of the Pythagorean Theorem, we first identify the longest side, which is 15. According to the theorem, for a triangle to be a right triangle, the square of the longest side (hypotenuse) should equal the sum of the squares of the other two sides.
Let's check if \( 15^2 = 10^2 + 12^2 \):
1. Calculate \( 15^2 \):
\[
15^2 = 225
\]
2. Calculate \( 10^2 \) and \( 12^2 \):
\[
10^2 = 100
\]
\[
12^2 = 144
\]
3. Now sum \( 10^2 + 12^2 \):
\[
100 + 144 = 244
\]
Now we compare:
- \( 15^2 = 225 \)
- \( 10^2 + 12^2 = 244 \)
Since \( 225 \) is not equal to \( 244 \), the triangle is not a right triangle.
Therefore, the correct explanation is:
**No, because 244 is not equal to 225.**
Let's check if \( 15^2 = 10^2 + 12^2 \):
1. Calculate \( 15^2 \):
\[
15^2 = 225
\]
2. Calculate \( 10^2 \) and \( 12^2 \):
\[
10^2 = 100
\]
\[
12^2 = 144
\]
3. Now sum \( 10^2 + 12^2 \):
\[
100 + 144 = 244
\]
Now we compare:
- \( 15^2 = 225 \)
- \( 10^2 + 12^2 = 244 \)
Since \( 225 \) is not equal to \( 244 \), the triangle is not a right triangle.
Therefore, the correct explanation is:
**No, because 244 is not equal to 225.**