Which of the triangles described in the table is a right triangle.

Table
Triangle Q, Side 1=25 Side 2=10 Side 3=15.
Triangle R, Side 1=26 Side 2=20 Side 3=46.
Triangle S, Side 1=25 Side 2=20 Side 3=1,025.
Triangle T, Side 1=25 Side 2=26 Side 3=650.
A. Q
B. R
C. S
D. T
Is the answer A?
Thank you

the answer is Q your welcome : )

No.

what is it

is it t?

Side 2 on Q is 20, he mistyped..

To determine whether a triangle is a right triangle, we need to check if the square of the longest side (hypotenuse) is equal to the sum of the squares of the other two sides. Here's how to find the answer:

For Triangle Q:
- The longest side is 25.
- The sum of the squares of the other two sides is 10^2 + 15^2 = 100 + 225 = 325.
- Since 25^2 = 625 is not equal to 325, Triangle Q is not a right triangle.

For Triangle R:
- The longest side is 46.
- The sum of the squares of the other two sides is 20^2 + 26^2 = 400 + 676 = 1076.
- Since 46^2 = 2116 is not equal to 1076, Triangle R is not a right triangle.

For Triangle S:
- The longest side is 1025.
- The sum of the squares of the other two sides is 20^2 + 25^2 = 400 + 625 = 1025.
- Since 1025^2 = 1,050,625 is equal to 1025, Triangle S is a right triangle.

For Triangle T:
- The longest side is 650.
- The sum of the squares of the other two sides is 25^2 + 26^2 = 625 + 676 = 1301.
- Since 650^2 = 422,500 is not equal to 1301, Triangle T is not a right triangle.

Therefore, the correct answer is C. Triangle S.