How to Find the Circumference and Area of a Circle
Learn the formula for circumference., Understand the different parts of the formula., Measure the radius or diameter of the circle., Plug in the variables and solve., Practice with a few examples., Learn the formula for area of a circle., Understand...
Step-by-Step Guide
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Step 1: Learn the formula for circumference.
There are two formulas that can be used to calculate the circumference of a circle:
C = 2πr or C = πd, where π is the mathematical constant approximately equal to
3.14,r is equal to the radius, and d is equal to the diameter.Because the radius of a circle is equal to twice its diameter, these equations are essentially the same.
The units for circumference can be any unit for the measure of length: feet, miles, meters, centimeters, etc. -
Step 2: Understand the different parts of the formula.
There are three components to finding circumference of a circle: radius, diameter, and π.
The radius and diameter are related: the radius is equal to half the diameter, while the diameter is equal to double the radius.
The radius (r) of a circle is the distance from one point on the circle to the center of the circle.
The diameter (d) of a circle is the distance from one point on the circle to another directly opposite it, going through the circle’s center.The Greek letter pi (π) represents the ratio of the circumference divided by the diameter and is represented by the number
3.14159265…, an irrational number that has neither a final digit nor a recognizable pattern of repeating digits.This number is commonly rounded to
3.14 for basic calculations. , Using a ruler, place one end at one side of the circle and place it through the center point to the other side of the circle.
The distance to the center of the circle is the radius, while the distance to the other end of the circle is the diameter.
In most textbook math problems, the radius or diameter is given to you. , Once you have determined the radius and/or diameter of the circle, you can plug these variables into the appropriate equation.
If you have the radius, use C = 2πr, but if you have the diameter, use C = πd.
For example:
What is the circumference of a circle with a radius of 3 cm? Write the formula:
C = 2πr Plug in the variables:
C = 2π3 Multiply through:
C = (2*3*π) = 6π =
18.84 cm For example:
What is the circumference of a circle with a diameter of 9 m? Write the formula:
C = πd Plug in the variables:
C = 9π Multiply through:
C = (9*π) =
28.26 m , Now that you’ve learned the formula, it’s time to practice with a few examples.
The more problems you solve, the easier it becomes to solve them in the future.
Find the circumference of a circle with a diameter of 5 ft.
C = πd = 5π =
15.7 ft Find the circumference of a circle with a radius of 10 ft.
C = 2πr = C = 2π10 = 2 * 10 * π =
62.8 ft. , The area of a circle can be calculated using the diameter or the radius with two different formulas:
A = πr2 or A = π(d/2)2,where π is the mathematical constant approximately equal to
3.14,r is equal to the radius, and d is the diameter.
Because the radius of a circle is equal to twice its diameter, these equations are essentially the same.
The units for area can be any unit for the measure of length squared: feet squared (ft2), meters squared (m2), centimeters squared (cm2), etc. , There are three components to finding circumference of a circle: radius, diameter, and π.
The radius and diameter are related: the radius is equal to half the diameter, while the diameter is equal to double the radius.
The radius (r) of a circle is the distance from one point on the circle to the center of the circle.
The diameter (d) of a circle is the distance from one point on the circle to another directly opposite it, going through the circle’s center.The Greek letter pi (π) represents the ratio of the circumference divided by the diameter and is represented by the number
3.14159265…, an irrational number that has neither a final digit nor a recognizable pattern of repeating digits.This number is commonly rounded to
3.14 for basic calculations. , Using a ruler, place one end at one side of the circle and place it through the center point to the other side of the circle.
The distance to the center of the circle is the radius, while the distance to the other end of the circle is the diameter.
In most textbook math problems, the radius or diameter is given to you. , Once you have determined the radius and/or diameter of the circle, you can plug these variables into the appropriate equation.
If you have the radius, use A = πr2, but if you have the diameter, use A = π(d/2)2.
For example:
What is the area of a circle with a radius of 3 m? Write the formula:
A = πr2 Plug in the variables:
A = π32 Square the radius: r2 = 32 = 9 Multiply by pi:
A = 9π =
28.26 m2 For example:
What is the area of a circle with a diameter of 4 m? Write the formula:
A = π(d/2)2 Plug in the variables:
A = π(4/2)2 Divide the diameter by 2: d/2 = 4/2 = 2 Square the result: 22 = 4 Multiply by pi:
A = 4π =
12.56 m2 , Now that you’ve learned the formula, it’s time to practice with a few examples.
The more problems you solve, the easier it becomes to solve them in the future.
Find the area of a circle with a diameter of 7 ft.
A = π(d/2)2 = π(7/2)2 = π(3.5)2 =
12.25 * π=
38.47 ft2.
Find the area of a circle with a radius of 3 ft.
A = πr2 = π32 = 9 * π =
28.26 ft2 , Some problems may give you a radius or diameter that has a variable in it: r = (x + 7) or d = (x + 3).
In this case, you can still solve for the area or circumference, but your final answer will also have that variable in it.
Write down the radius or diameter as it is stated in the problem.
For example:
Calculate the circumference of a circle with a radius of (x = 1). , Whether you are solving for area or circumference, you will still follow the basic steps of plugging in what you know.
Write down the formula for area or circumference and then write in the variables given.
For example:
Calculate the circumference of a circle with a radius of (x + 1).
Write the formula:
C = 2πr Plug in the given information:
C = 2π(x+1) , At this point, you can just solve the problem as you normally would, treating the variable as if it were just another number.
You may need to use the distributive property to simplify the final answer.
For example:
Calculate the circumference of a circle with a radius of (x = 1).
C = 2πr = 2π(x+1) = 2πx + 2π1 = 2πx +2π =
6.28x +
6.28 If you are given the value of “x” later in the problem, you can plug it in and get a whole number answer. , Now that you’ve learned the formula, it’s time to practice with a few examples.
The more problems you solve, the easier it becomes to solve them in the future.
Find the area of a circle with a radius of 2x.
A = πr2 = π(2x)2 = π4x2 =
12.56x2 Find the area of a circle with a diameter of (x + 2).
A = π(d/2)2 = π((x +2)/2)2 = ((x +2)2/4)π -
Step 3: Measure the radius or diameter of the circle.
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Step 4: Plug in the variables and solve.
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Step 5: Practice with a few examples.
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Step 6: Learn the formula for area of a circle.
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Step 7: Understand the different parts of the formula.
-
Step 8: Measure the radius or diameter of the circle.
-
Step 9: Plug in the variables and solve.
-
Step 10: Practice with a few examples.
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Step 11: Determine the radius or diameter of the circle.
-
Step 12: Write the formula with the information given.
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Step 13: Solve as if the variable were a number.
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Step 14: Practice with a few examples.
Detailed Guide
There are two formulas that can be used to calculate the circumference of a circle:
C = 2πr or C = πd, where π is the mathematical constant approximately equal to
3.14,r is equal to the radius, and d is equal to the diameter.Because the radius of a circle is equal to twice its diameter, these equations are essentially the same.
The units for circumference can be any unit for the measure of length: feet, miles, meters, centimeters, etc.
There are three components to finding circumference of a circle: radius, diameter, and π.
The radius and diameter are related: the radius is equal to half the diameter, while the diameter is equal to double the radius.
The radius (r) of a circle is the distance from one point on the circle to the center of the circle.
The diameter (d) of a circle is the distance from one point on the circle to another directly opposite it, going through the circle’s center.The Greek letter pi (π) represents the ratio of the circumference divided by the diameter and is represented by the number
3.14159265…, an irrational number that has neither a final digit nor a recognizable pattern of repeating digits.This number is commonly rounded to
3.14 for basic calculations. , Using a ruler, place one end at one side of the circle and place it through the center point to the other side of the circle.
The distance to the center of the circle is the radius, while the distance to the other end of the circle is the diameter.
In most textbook math problems, the radius or diameter is given to you. , Once you have determined the radius and/or diameter of the circle, you can plug these variables into the appropriate equation.
If you have the radius, use C = 2πr, but if you have the diameter, use C = πd.
For example:
What is the circumference of a circle with a radius of 3 cm? Write the formula:
C = 2πr Plug in the variables:
C = 2π3 Multiply through:
C = (2*3*π) = 6π =
18.84 cm For example:
What is the circumference of a circle with a diameter of 9 m? Write the formula:
C = πd Plug in the variables:
C = 9π Multiply through:
C = (9*π) =
28.26 m , Now that you’ve learned the formula, it’s time to practice with a few examples.
The more problems you solve, the easier it becomes to solve them in the future.
Find the circumference of a circle with a diameter of 5 ft.
C = πd = 5π =
15.7 ft Find the circumference of a circle with a radius of 10 ft.
C = 2πr = C = 2π10 = 2 * 10 * π =
62.8 ft. , The area of a circle can be calculated using the diameter or the radius with two different formulas:
A = πr2 or A = π(d/2)2,where π is the mathematical constant approximately equal to
3.14,r is equal to the radius, and d is the diameter.
Because the radius of a circle is equal to twice its diameter, these equations are essentially the same.
The units for area can be any unit for the measure of length squared: feet squared (ft2), meters squared (m2), centimeters squared (cm2), etc. , There are three components to finding circumference of a circle: radius, diameter, and π.
The radius and diameter are related: the radius is equal to half the diameter, while the diameter is equal to double the radius.
The radius (r) of a circle is the distance from one point on the circle to the center of the circle.
The diameter (d) of a circle is the distance from one point on the circle to another directly opposite it, going through the circle’s center.The Greek letter pi (π) represents the ratio of the circumference divided by the diameter and is represented by the number
3.14159265…, an irrational number that has neither a final digit nor a recognizable pattern of repeating digits.This number is commonly rounded to
3.14 for basic calculations. , Using a ruler, place one end at one side of the circle and place it through the center point to the other side of the circle.
The distance to the center of the circle is the radius, while the distance to the other end of the circle is the diameter.
In most textbook math problems, the radius or diameter is given to you. , Once you have determined the radius and/or diameter of the circle, you can plug these variables into the appropriate equation.
If you have the radius, use A = πr2, but if you have the diameter, use A = π(d/2)2.
For example:
What is the area of a circle with a radius of 3 m? Write the formula:
A = πr2 Plug in the variables:
A = π32 Square the radius: r2 = 32 = 9 Multiply by pi:
A = 9π =
28.26 m2 For example:
What is the area of a circle with a diameter of 4 m? Write the formula:
A = π(d/2)2 Plug in the variables:
A = π(4/2)2 Divide the diameter by 2: d/2 = 4/2 = 2 Square the result: 22 = 4 Multiply by pi:
A = 4π =
12.56 m2 , Now that you’ve learned the formula, it’s time to practice with a few examples.
The more problems you solve, the easier it becomes to solve them in the future.
Find the area of a circle with a diameter of 7 ft.
A = π(d/2)2 = π(7/2)2 = π(3.5)2 =
12.25 * π=
38.47 ft2.
Find the area of a circle with a radius of 3 ft.
A = πr2 = π32 = 9 * π =
28.26 ft2 , Some problems may give you a radius or diameter that has a variable in it: r = (x + 7) or d = (x + 3).
In this case, you can still solve for the area or circumference, but your final answer will also have that variable in it.
Write down the radius or diameter as it is stated in the problem.
For example:
Calculate the circumference of a circle with a radius of (x = 1). , Whether you are solving for area or circumference, you will still follow the basic steps of plugging in what you know.
Write down the formula for area or circumference and then write in the variables given.
For example:
Calculate the circumference of a circle with a radius of (x + 1).
Write the formula:
C = 2πr Plug in the given information:
C = 2π(x+1) , At this point, you can just solve the problem as you normally would, treating the variable as if it were just another number.
You may need to use the distributive property to simplify the final answer.
For example:
Calculate the circumference of a circle with a radius of (x = 1).
C = 2πr = 2π(x+1) = 2πx + 2π1 = 2πx +2π =
6.28x +
6.28 If you are given the value of “x” later in the problem, you can plug it in and get a whole number answer. , Now that you’ve learned the formula, it’s time to practice with a few examples.
The more problems you solve, the easier it becomes to solve them in the future.
Find the area of a circle with a radius of 2x.
A = πr2 = π(2x)2 = π4x2 =
12.56x2 Find the area of a circle with a diameter of (x + 2).
A = π(d/2)2 = π((x +2)/2)2 = ((x +2)2/4)π
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John Edwards
Specializes in breaking down complex pet care topics into simple steps.
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