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Simple strategies to solve 2D cylindrical geometry problems
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This article was reviewed by Grace Imson, MA. Grace Imson is a math teacher with over 40 years of teaching experience. Grace is currently a math instructor at the City College of San Francisco and was previously in the Math Department at Saint Louis University. She has taught math at the elementary, middle, high school, and college levels. She has an MA in Education, specializing in Administration and Supervision from Saint Louis University.
This article has been fact-checked, ensuring the accuracy of any cited facts and confirming the authority of its sources.
This article has been viewed 480,685 times.
The surface area of a shape is the sum of the area of all of its faces. To find the area of a cylinder, you need to find the area of its bases and add that to the area of its outer wall. The formula for finding the area of a cylinder is A = 2πr2 + 2πrh.
Formula for the Surface Area of a Cylinder
To find the surface area of a cylinder, first multiply the height, h by the circumference, 2π * radius to find the lateral surface area. Then, find the surface area of the two circular caps with 2πr2. Add the two numbers together to get the surface area: A = 2πr2 + 2πrh.
Steps
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Visualize the top and bottom of a cylinder. A can of soup is the shape of a cylinder. If you think about it, the can has a top and a bottom that are the same. Both of these ends are the shape of a circle. The first step to finding the surface area of your cylinder will be to find the surface area of these circular ends.[1] -
Find the radius of your cylinder. The radius is the distance from the center of a circle to the outer edge of the circle. Radius is abbreviated “r.” The radius of your cylinder is the same as the radius of the top and bottom circles. In this example, the radius of the base is 3 centimeter (1.2 in).[2]- If you are solving a word problem, the radius may be given. The diameter also might be given, which is the distance from one side of the circle to the other, passing through the center point. The radius is exactly one half the diameter.
- You can measure the radius with a ruler if you are looking for the surface area of an actual cylinder.
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Calculate the surface area of the top circle. The surface area of a circle is equal to the number pi (~3.14) times the radius of the circle squared. The equation is written as π x r2. This is the same as saying π x r x r.[3]- To find the area of the base, just plug the radius, 3 centimeter (1.2 in), into the equation for finding the area of a circle: A = πr2. Here's how you do it:
- A = πr2
- A = π x 32
- A = π x 9 = 28.26 cm2
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Do it again for the circle on the other side. Now that you have solved for the area of one base, you have to take into account the area of the second base. You can follow the same steps as you did with the first base, or you can recognize that the bases are identical. You can skip using the area equation a second time for the second base if you understand this.[4]
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Visualize the outside edge of a cylinder. When you visualize a cylindrical soup can, you should see a top and a bottom base. The bases are connected to each other by a “wall” of can. The radius of the wall is the same as the radius of the base, but unlike the base, the wall has height.[5] -
Find the circumference of one of the circles. You will need to find the circumference to find the surface area of the outer edge (also known as lateral surface area). To get the circumference, simply multiply the radius by 2π. So, the circumference can be found by multiplying 3 centimeter (1.2 in) by 2π. 3 centimeter (1.2 in) x 2π = 18.84 centimeter (7.4 in).[6] -
Multiply the circumference of the circle by the height of the cylinder. This will give you the outer edge surface area. Multiply the circumference, 18.84 centimeter (7.4 in), by the height, 5 centimeter (2.0 in). 18.84 centimeter (7.4 in) x 5 centimeter (2.0 in) = 94.2 cm2.[7]
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Visualize the entire cylinder. First, you visualized how the top and bottom base and solved for the area contained on those surfaces. Next, you thought about the wall that extends between those bases and solved for that space. This time, think of the can as a whole, and you are solving for the entire surface.[8] -
Double the area of one base. Simply multiply the previous result, 28.26 cm2, by 2 to get the area of both bases. 28.26 x 2 = 56.52 cm2. This gives you the area of both bases.[9] -
Add the area of the wall and the base area. Once you add the area of the two bases and the outer surface area, you will have found the surface area of the cylinder. All you have to do is add 56.52 cm2, the area of both bases, and the outer surface area, 94.2 cm2. 56.52 cm2 + 94.2 cm2 = 150.72 cm2. The surface area with a cylinder with a height of 5 centimeter (2.0 in) and a circular base with a radius of 3 centimeter (1.2 in) is 150.72 cm2.[10]
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Community Q&A
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QuestionHow would I find the surface area of a cylinder when the diameter and height are given?
Community AnswerDivide the diameter by 2 to get the radius, then follow the formula after that. -
QuestionHow do I find the surface area with the circumference of the cylinder?
Community AnswerFind the radius of one of the bases. Find the area of the base. Double the result to get the area of the top and bottom circles. Find the circumference of one of the circles. Multiply the circumference of the circle by the height of the cylinder. Add the lateral area and the base area. -
QuestionThree cylinders have bases that are the same size. The area of the base is 10.0 cm2. Determine the surface area of each cylinder, given its height. a) 8.0 cm b) 6.5 cm c) 9.4 cm
Community AnswerStart by dividing the area of the base by pi. This will leave you with the radius squared (3.18 cm2). Next, take the square root of that to find your radius (1.78 cm). Multiply the radius by 2 pi to find the circumference (11.2 cm). Multiply the circumference by the height given and add the area of BOTH bases (20 cm2). This brings you to A) SA= 109.5 cm2 B) SA=92.7 cm2 C) SA=125.1 cm2.
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Tips
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If either your height or your radius includes a square root symbol, consult the article How to Multiply Square Roots and How to Add and Subtract Square Roots for more information.Thanks
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Warnings
- Always remember to double the area of the base to account for the second base.Thanks
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References
- ↑ https://www.sciencing.com/how-to-calculate-the-surface-area-of-a-circle-12751758/
- ↑ https://www.cuemath.com/measurement/surface-area-of-cylinder/
- ↑ https://www.cuemath.com/measurement/base-area-of-cylinder/
- ↑ https://www.sciencing.com/how-to-calculate-the-surface-area-of-a-circle-12751758/
- ↑ https://www.omnicalculator.com/math/surface-area-of-cylinder
- ↑ https://www.omnicalculator.com/math/surface-area-of-cylinder
- ↑ https://www.cuemath.com/geometry/cylinder/
- ↑ https://www.omnicalculator.com/math/surface-area-of-cylinder
- ↑ https://www.cuemath.com/measurement/surface-area-of-cylinder/
About This Article
Math Teacher
This article was reviewed by Grace Imson, MA. Grace Imson is a math teacher with over 40 years of teaching experience. Grace is currently a math instructor at the City College of San Francisco and was previously in the Math Department at Saint Louis University. She has taught math at the elementary, middle, high school, and college levels. She has an MA in Education, specializing in Administration and Supervision from Saint Louis University. This article has been viewed 480,685 times.
Co-authors: 39
Updated: March 21, 2025
Views: 480,685
Categories: Calculating Volume and Area
Article SummaryX
To find the surface area of a cylinder, use the equation 2πr2 + 2πrh. Start by inserting the value of the radius of the circles and the height of the longest edge of the cylinder into the equation. Once you have all of the variables, begin solving the first part of the equation by squaring the radius, multiplying by pi, and then multiplying by 2. Solve the second part of the equation by multiplying the radius, height, and pi together, and then multiply by 2. To get the surface area of the cylinder, add the two values together and record your answer in units squared! If you need help finding the radius of the circles, keep reading the article!
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