Chapter 10.1, Problem 27PPE

To determine

To determine whether the given lengths can be side lengths of a right triangle.

Answer to Problem 27PPE

These are the sides of right angle triangle.

Explanation of Solution

Given information :

14in., 48., 50in.

Here we shall use the Pythagoras theorem.

According to Pythagoras theorem in any right angle triangle,

  ${\left(\text{base}\right)}^2+{\left(\text{perpendicular}\right)}^2={\left(\text{hypotenuse}\right)}^2$

Here we shall check if the given sides prove the given condition of Pythagoras theorem as mentioned above.

Hence we check,

  $\begin{array}{c}{\left(14\right)}^2+{\left(48\right)}^2=196+2304\\ =2500\\ {\left(50\right)}^2=2500\\ {\left(14\right)}^2+{\left(48\right)}^2={\left(50\right)}^2\end{array}$

Hence the square of two sides is equal to the square of the third largest side.

Hence these are the sides of right angle triangle.