Using the Pythagorean Theorem to Solve Indirect Measurements

Introduction

Pictorial representation of the Pythagorean Theorem

Recall the Pythagorean Theorem, or the special relationship between the lengths of the sides of a right triangle using the following formula:

a2 + b2 = c2

 

 

Portrait of Pythagoras

Source: José de Ribera, Pitágoras, Wikimedia Commons

Because so much of our world is based on rectangles and right triangles, the Pythagorean Theorem is a very special and important relationship in geometry. There are many relevant applications that require the use of the Pythagorean Theorem.

image of model rocket

Engineers and astronomers use the Pythagorean Theorem to calculate the paths of spacecraft, including rockets and satellites.

 

 

 

picture of architect and engineer studying blueprints

 

Architects use the Pythagorean Theorem to calculate the heights of buildings and the lengths of walls.

 

 

 

 

 

baseball player

Athletes even use the Pythagorean Theorem when they are calculating distances, which are important in determining how fast they can run or where a ball needs to be thrown.

 

 

 

In this lesson, you will practice using the Pythagorean Theorem to solve a variety of application problems. In doing so, you will work with irrational numbers and may need to approximate the value of an irrational number.

Calculating Distances

Frequently, the Pythagorean Theorem is used to calculate distances that are not easy to measure directly.

ladder being placed against the side of a building

The Ladder Problem

In the diagram, a ladder that is 40 feet in length is placed against a building. The bottom of the ladder touches the ground 8 feet from the base of the building. How high above the ground will the ladder touch the building?

 
right triangle drawn over ladder and building

First, identify the right triangle in the diagram. In addition, identify the legs and hypotenuse of the right triangle.

 

 

 

 

 

 

Drag the appropriate measurements to the parts of the figure in order to label the diagram.

Use the Pythagorean Theorem to set up an equation for x.

Now that you have correctly set up your equation, solve for x. Express your answer as an irrational number, and then approximate to the nearest whole number.

Working with Perimeter

Another important application of the Pythagorean Theorem involves determining the perimeter of polygons.

garden in the shape of a right triangle with a length of 8 yards and a width of 6 yards

The Flowerbed Problem

Rosemary wants to plant a tulip garden in her backyard. She needs to build a triangular flowerbed using landscaping timbers. How many feet of landscaping timbers does Rosemary need to purchase?

 

 

 

 

Use the Pythagorean Theorem to set up an equation for x.

Now that you have correctly set up your equation, solve for x.

emoticon saying, ‘Stop! This means you.
 

You may have solved for x, but that does not mean we have answered the question yet. Remember that the problem asked us to determine the total length of landscaping timbers that Rosemary must purchase for her flowerbed.

Use the information you know to determine the total length of landscaping timbers that Rosemary must purchase in order to completely surround her flowerbed.

Additional Applications

The Pythagorean Theorem can also be used to determine lengths of segments that may be formed by multiple right triangles or other polygons. The Pythagorean Theorem will only work to show you the relationship between the side lengths of a right triangle. But once you know that information, you can use it to solve larger problems.

diagram showing boat, lighthouse, and the distances from the problem

The Lighthouse Problem

A boat is sailing parallel to the shore and passes a lighthouse. The beam from the lighthouse is visible for 14 miles. The boat passes the lighthouse along the path shown in the diagram and at its closest point is 11 miles from the lighthouse. For how many miles will the captain of the boat be able to see the lighthouse?

 

Use the Pythagorean Theorem to set up an equation for k.

Now that you have correctly set up your equation, solve for k. Express your answer both as an irrational number and approximated to the nearest tenth of a mile.

Now that we know the value of k, we can use that to answer the original question. For how many miles will the captain of the boat be able to see the lighthouse?

The Pillow Problem

diagram showing the outline of the pillow

A large pillow is in the shape of a pentagon as shown. Meredith wants to sew a cord around the edge of the pillow for a decoration. What is the length of the cord that Meredith needs in order to completely cover the edge of the pillow?

graphic of planning a strategy on chalkboardStrategy: First, we need to look for right triangles in the picture. Once we have identified the right triangles, we need to determine the dimensions of the right triangles.

Use the figure, along with the Pythagorean Theorem, to calculate the length of each side of the pillow. Click on the plus signs on the image to check your answers.

Determine the total length of cord that Meredith should use.