Chapter 10.1, Problem 40E

To determine

Tofind:The lengths of the sides of right triangle and also prove that these lengths satisfy Pythagorean Theorem.

Answer to Problem 40E

The length of three sides of right triangle are $2\sqrt{14}$ , $\sqrt{62}$ and $\sqrt{6}$ .

Explanation of Solution

Given information:

The graph is shown below.

  

Calculation:

The vertices of the right triangle are $\left(2,-1,2\right)$ , $\left(-2,5,0\right)$ and $\left(-4,4,1\right)$ .The length of the sides of triangle is the distance between the vertices.

Use the distance formula for two points $\left(x_1,y_1,z_1\right)$ and $\left(x_2,y_2,z_2\right)$ .

  $\text{Distance}=\sqrt{{\left(x_2-x_1\right)}^2+{\left(y_2-y_1\right)}^2+{\left(z_2-z_1\right)}^2}$

The distance between the points $\left(2,-1,2\right)$ and $\left(-2,5,0\right)$ is,

  $\begin{array}{c}\text{Distance}=\sqrt{{\left(-2-2\right)}^2+{\left(5-\left(-1\right)\right)}^2+{\left(0-2\right)}^2}\\ =\sqrt{{\left(-4\right)}^2+{\left(6\right)}^2+{\left(-2\right)}^2}\\ =\sqrt{16+36+4}\\ =\sqrt{56}\\ =2\sqrt{14}\end{array}$

So, the length of perpendicular of triangle is $2\sqrt{14}$ .

The distance between the points $\left(2,-1,2\right)$ and $\left(-4,4,1\right)$ is,

  $\begin{array}{c}\text{Distance}=\sqrt{{\left(-4-2\right)}^2+{\left(4-\left(-1\right)\right)}^2+{\left(1-2\right)}^2}\\ =\sqrt{{\left(-6\right)}^2+{\left(5\right)}^2+{\left(-1\right)}^2}\\ =\sqrt{36+25+1}\\ =\sqrt{62}\end{array}$

So, the length of hypotenuse of triangle is $\sqrt{62}$ .

The distance between the points $\left(-2,5,0\right)$ and $\left(-4,4,1\right)$ is,

  $\begin{array}{c}\text{Distance}=\sqrt{{\left(-4-\left(-2\right)\right)}^2+{\left(4-5\right)}^2+{\left(1-0\right)}^2}\\ =\sqrt{{\left(-2\right)}^2+{\left(-1\right)}^2+{\left(1\right)}^2}\\ =\sqrt{4+1+1}\\ =\sqrt{6}\end{array}$

So, the length of base of triangle is $\sqrt{6}$ .

Therefore, the length of three sides of right triangle are $2\sqrt{14}$ , $\sqrt{62}$ and $\sqrt{6}$ .

Now let us check the Pythagorean Theorem.

  ${\text{P}}^2+{\text{B}}^2={\text{H}}^2$

Take the left side of the equation.

  $\begin{array}{c}{\text{P}}^2+{\text{B}}^2={\left(2\sqrt{14}\right)}^2+{\left(\sqrt{6}\right)}^2\\ =56+6\\ =62\\ ={\left(\sqrt{62}\right)}^2\end{array}$

Hence, the lengths of the right triangle satisfy the Pythagorean Theorem.