Lesson 5

Finding Side Lengths of Triangles

Let’s find triangle side lengths.

5.1: Which One Doesn’t Belong: Triangles

Which triangle doesn’t belong?

Triangles A, B, C, D. 

 

5.2: A Table of Triangles

  1. Complete the tables for these three triangles:

    Three triangles on a square grid labeled “D,” “E,” and “F” with sides a, b, and c. 
    triangle  \(a\)   \(b\)   \(c\) 
    D
    E
    F
    triangle \(a^2\) \(b^2\) \(c^2\)
    D
    E
    F
  2. What do you notice about the values in the table for Triangle E but not for Triangles D and F?
  3. Complete the tables for these three more triangles:
    Three triangles on a grid labeled “P,” “Q,” and “R” with sides a, b, and c.
    triangle  \(a\)   \(b\)   \(c\) 
    P
    Q
    R
    triangle \(a^2\) \(b^2\) \(c^2\)
    P
    Q
    R
  4. What do you notice about the values in the table for Triangle Q but not for Triangles P and R?
  5. What do Triangle E and Triangle Q have in common?

5.3: Meet the Pythagorean Theorem

  1. Find the missing side lengths. Be prepared to explain your reasoning.
  2. For which triangles does \(a^2+b^2=c^2\)?
Right triangle, P. a = square root 8, b. hypotenuse = c.


 

Right triangle, Q. a = square root 10, b = square root 40. hypotenuse = c.


 

triangle, R on grid. a, b= square root 17, c = 5.


If the four shaded triangles in the figure are congruent right triangles, does the inner quadrilateral have to be a square? Explain how you know.

A square with side lengths of 14 units on a square grid. 

 

Summary

A right triangle is a triangle with a right angle. In a right triangle, the side opposite the right angle is called the hypotenuse, and the two other sides are called its legs. Here are some right triangles with the hypotenuse and legs labeled:

Four right triangles of different sizes and orientations each with two legs and a hypotenuse opposite the right angle.

We often use the letters \(a\) and \(b\) to represent the lengths of the shorter sides of a triangle and \(c\) to represent the length of the longest side of a right triangle. If the triangle is a right triangle, then \(a\) and \(b\) are used to represent the lengths of the legs, and \(c\) is used to represent the length of the hypotenuse (since the hypotenuse is always the longest side of a right triangle). For example, in this right triangle, \(a=\sqrt{20}\), \(b=\sqrt5\), and \(c=5\).

A right triangle with legs labeled “a” and “b.” The hypotenuse is labeled “c.”

Here are some right triangles:

Three right triangles are indicated. A square is drawn using each side of the triangles.

Notice that for these examples of right triangles, the square of the hypotenuse is equal to the sum of the squares of the legs. In the first right triangle in the diagram, \(9+16=25\), in the second, \(1+16=17\), and in the third, \(9+9=18\). Expressed another way, we have \(\displaystyle a^2+b^2=c^2\) This is a property of all right triangles, not just these examples, and is often known as the Pythagorean Theorem. The name comes from a mathematician named Pythagoras who lived in ancient Greece around 2,500 BCE, but this property of right triangles was also discovered independently by mathematicians in other ancient cultures including Babylon, India, and China. In China, a name for the same relationship is the Shang Gao Theorem. In future lessons, you will learn some ways to explain why the Pythagorean Theorem is true for any right triangle.

It is important to note that this relationship does not hold for all triangles. Here are some triangles that are not right triangles, and notice that the lengths of their sides do not have the special relationship \(a^2+b^2=c^2\). That is, \(16+10\) does not equal 18, and \(2+10\) does not equal 16.

Two right triangles are indicated. A square is drawn using each side of the triangles. 

Glossary Entries

  • Pythagorean Theorem

    The Pythagorean Theorem describes the relationship between the side lengths of right triangles.

    The diagram shows a right triangle with squares built on each side.  If we add the areas of the two small squares, we get the area of the larger square.

    The square of the hypotenuse is equal to the sum of the squares of the legs. This is written as \(a^2+b^2=c^2\).

    a right triangle with squares built on each side
  • hypotenuse

    The hypotenuse is the side of a right triangle that is opposite the right angle. It is the longest side of a right triangle.

    Here are some right triangles. Each hypotenuse is labeled.

    Four right triangles of different sizes and orientations each with two legs and a hypotenuse opposite the right angle.
  • legs

    The legs of a right triangle are the sides that make the right angle. 

    Here are some right triangles. Each leg is labeled.

    Four right triangles of different sizes and orientations each with two legs and a hypotenuse opposite the right angle.