Circles Are Everywhere
When was the last time you jumped on a trampoline? Did you ever wonder how much material was required for the center mat or how much steel was needed to create the frame? If you did, you may not have realized that both the mat and the frame are examples of how area and circumference of circles are used in real life. Let's take a brief look at each of these concepts and examine how they are used in both two-dimensional and three-dimensional situations.
Area
As you may recall, area is the amount of space taken up by a two-dimensional figure, and it is measured in units squared. Most shapes require a formula to calculate area, and circles are no exception. To calculate the area of a circle, use the formula A = pi × r^2. In the formula, r represents the radius, which is a segment that connects the center of the circle to a point on the edge of the circle. It is half the size of the diameter, and every radius inside of a circle will be the same size. Let's take a brief look at how to calculate area of circles.
Take a look at circle 'm'. Here, we see that the diameter is 12 inches long. To calculate the area of circle 'm,' we must cut the diameter in half to determine the radius. When we divide 12 by 2, we see that the radius has a length of 6 inches. From here, we will substitute 6 into the equation to get A = pi ×(6)^2. Remember to follow the order of operations - we must square the radius before multiplying by pi. When we do, we are able to determine that the total area of circle 'm' is 36 ×pi or 113.097 inches squared.
Now, let's take a look at a real-world example. Joe is purchasing material to build his first trampoline. If he wants the diameter of the mat to be 14 feet long, how much nylon will he have to purchase?
Once again, we will cut the diameter in half to determine the radius. When we do, we will see that the radius of the mat will be 7 feet. Substituting this radius into the equation gives us A = pi ×(7)^2. Once we complete our calculations using the order of operations, we will find that the total area of the mat is 49 ×pi or 153.938 feet squared.
Circumference
So, that takes care of calculating the amount of space taken up by a circle, but how can we determine the total distance around a circle? For other shapes, this is referred to as perimeter, but circles don't have actual sides like other shapes. Therefore, the term circumference is used. It is defined as the distance around a circle and is represented by the formula C = 2 ×pi ×r, where r is the radius.
Let's examine a few problems, beginning with Joe's trampoline. In addition to buying nylon for the mat, Joe needs to create a steel frame. With a diameter of 14 feet, how much steel must he purchase to build a frame that will enclose the entire mat?
As you recall, with a diameter of 14 feet, the radius will be 7 feet. Let's plug this into the formula for circumference. Once we do, we get 2 ×pi × (7). After simplifying, we see that the circumference of the mat is 14 ×pi or 43.98 feet, and that is how much steel Joe will need to purchase for the frame.
Here's one more. Clara has started her own hat decorating business. For her current design, she wants to line the brim of the hat with ribbon. If the brim has a diameter of 24 inches, how much ribbon will she need?
Since the diameter of the hat is 24 inches, we must divide this number by 2 to determine the radius. When we do, we see that the radius is 12 inches and we are ready to plug this into the formula. Doing so gives us 2 ×pi ×(12), which will equal 24 ×pi or 75.398 inches. Therefore, she will need 75.398 inches of ribbon to line her hat.