The area of a circle can be considered as the number of square units of space the circle occupies.
For example, if you draw a square of 2 cm by cm inside the circle, then the total number of squares placed inside the circle represents the area of a circle. The units in which the area of the circle can be measured are m², km², in², mm², etc.
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Let us learn important circle formulas through this article.
Area of a Circle Formulas
The area of circle formula in terms of the radius is given as:
Area of a Circle = [pi r^{2}] |
The area of circle formula in terms of diameter is given as:
Area of a Circle = [frac{pi}{4} times d^{2}] |
In the above area of circle formulas, ris the radius and d of the circle.
The value of [pi] is [frac{22}{7}] or 3.14.
Surface Area of Circle Formula
The surface area of a circle is defined as the total area occupied by the circle. The surface area of circle formula is given as:
Surface Area of a Circle = [pi r^{2}] |
What is a Circle?
A circle is defined as the set of all points in the plane that maintains a fixed finite distance (r) from a fixed centre point (x,y). Here, r is the radius and O is the centre point of a circle.
Equation of a Circle
The equation of a circle has two forms. These are:
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The general form of the circle.
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The standard form of the circle.
If the equation of a circle is given in the standard form, we can easily identify the coordinates of a centre and radius (r) of a circle. It should be noted that the radius (r) is always positive.
General Equation of a Circle
The general equation of a circle with coordinates of a centre (h,k), and radius r is given as:
General Equation of a Circle = [sqrt{(x – h)^{2} + (y – k)^{2}} = r] |
Standard Equation of a Circle
The standard equation of a circle provides appropriate information about the centre point and radius of a circle and is, therefore, can be written and read easily.
The standard equation of a circle with centre (a,b), and radius r is given as:
Standard Equation of a Circle = [(x – a)^{2} + (y – b)^{2} = r^{2}] |
A unique circle with centre point O = (a, b), and radius r can be constructed as shown below:
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Radius of a Circle Formula
The radius of a circle is the length of a line segment from the centre point of a circle to any point on its circumference. It is represented by “r”.
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The radius of a circle formula in terms of diameter is given as:
Radius of a Circle = Diameter/2 |
The radius of a circle formula in terms of the circumference is given as:
Radius of a Circle = Circumference/2π |
If the area of a circle is represented by A, then the radius of a circle formula in terms of area is given as:
Radius of a Circle = [sqrt{frac{A}{pi}}] |
Diameter of a Circle Formula
The diameter of a circle is defined as the length of a line that starts from one point on the circle, passes through the centre, and ends on the other point on the circle’s opposite side.
The diameter of a circle formula is given as :
Diameter of a Circle = 2 x radius |
Circumference of Circle Formula
The circumference of a circle is the boundary or length of the complete arc of a circle.
The circumference of a circle formula is given as:
Circumference of a Circle = 2 × π × r |
In the circumference of a circle formula, ris the radius of the circle and the value of π is 22/7 or 3.14.
Solved Examples
1. Find the area, circumference, and diameter of a circle of radius 5 cm.
Solution:
Area of a circle = π × r²
Here, r = 5 cm, π = 3.14
Area of a circle = 3.14 × 5² = 78.5 cm
Circumference of a circle = 2πr
Here, r = 5 cm, π = 3.14
Circumference of a circle = 2 × 3.14 × 5 = 31.4 cm
Diameter of a circle = 2 × radius
Here, r = 5 cm,
Diameter of a circle = 2 × 5 = 10 cm
2. What will be the equation of the circle whose centre is (2,6) and the radius is 4 units.
Solution:
Here, the centre of the circle is not an origin. Hence, the general equation of the circle will be applied.
The general equation of a circle = (x – x₁)² + (y – y₁)² = r²
Substituting the values:
(x – 2)² + (y – 6)² = 4²
Hence, the required equation of a circle is (x – 2)² + (y – 6)² = 4²
Conclusion
With these circle formulas, you will be easily able to solve different questions based on the equation of a circle, area of a circle, the diameter of a circle, the radius of a circle, and circumference. So, understand the concepts behind the formula and apply them wherever required.