How to Calculate the Area of a Ring (Annulus) — Step by Step

Calculating the area of a ring (annulus) is straightforward when you know the formula. This page walks through each step, shows a worked example, and lets you check your own numbers with our calculator.

2D Shapes
CircleSquareRectangleTriangleParallelogram Ring (Annulus)Hexagon (Regular)Trapezoid (General)Isosceles TrapezoidEllipseCircular SectorCircular SegmentRhombusPolygon (Regular N-gon)Pentagon (Regular)Octagon (Regular)
3D Shapes
Cube SphereCylinderRight ConeOblique Cone Box (Rect. Prism)Torus CapsuleTetrahedron (Regular)Octahedron (Regular) Dodecahedron (Regular)Icosahedron (Regular)Pyramid (Square Base)Frustum of ConeTriangular Prism

Ring (Annulus) Dimensions

in
in

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Calculations

Area (A = π(R²-r²))235.619449 in²
Perimeter 94.24778 in
Inner Radius (r)5 in
Outer Radius (R)10 in

Calculator

The Ring (Annulus): A Deep Dive into the Shape Between Circles

A ring, known in formal geometry as an annulus, is the flat, two-dimensional shape that exists in the region between two concentric circles—circles that share the exact same center point. It can be visualized as a larger circle with a smaller, perfectly centered circle removed from its interior, creating a circular band. This shape is fundamental in describing objects with a central hole or a defined boundary, often symbolizing pathways, frames, containment, or cycles.

Properties

The Two Radii: Outer (R) and Inner (r)

An annulus is defined by two key measurements. The Outer Radius (R) is the distance from the shared central point to the boundary of the larger, outer circle, which dictates the overall size of the shape. The Inner Radius (r) is the distance from the same central point to the boundary of the smaller, inner circle, which forms the central hole or void.

Concentricity: The Shared Center

The absolute defining characteristic of an annulus is that its inner and outer boundaries are circles that share the exact same center point. If the centers were different, the shape would be a more complex, non-annular region with a non-uniform width.

The Uniform Width of the Band

The width of the ring's band is the constant, uniform distance between its inner and outer boundaries. This width can be calculated simply by subtracting the inner radius from the outer radius (Width = R - r). This consistency is a direct result of the shape's concentric nature.

Formulas

How to Calculate the Area

A = π * (R² - r²)

The area of a ring is calculated by first finding the area of the entire outer circle (as if it were solid) and then subtracting the area of the empty central hole. The formula can be factored from A = (π * R²) - (π * r²) into its more efficient form. The result is the total surface area of the band itself.

How to Calculate the Total Boundary Length

P = 2πR + 2πr  or  P = 2π(R + r)

The total 'perimeter' or boundary length of a ring is the combined length of both its outer and inner circular boundaries. To find it, you must calculate the circumference of the outer circle (2πR) and add it to the circumference of the inner circle (2πr). It represents the total length of the 'fencing' on both sides of the band.

Ubiquitous in Mechanics, Nature, and Daily Life

The ring shape is critical in almost every field of mechanical engineering. It is the shape of washers (used to distribute loads), gaskets (used to create seals between parts), and bearings (used to reduce friction and allow rotation). It also represents the cross-section of countless common objects, like pipes, tubes, and hoses. In the natural world, the annual growth rings of a tree form a distinct and beautiful annular pattern that tells the story of its life. Everyday items such as a roll of tape, the lanes of an athletic running track, and even the planet Saturn's famous rings are all practical and inspiring examples of the annulus in action.

Frequently asked questions

What is a ring (annulus)?

An annulus, or a ring, is the flat area between two circles that share the same center but have different radii. Think of it as a circle with a smaller circle removed from its center.

How do you find the area of an annulus?

Calculate the area (A) with the formula A = π * (R² - r²), where R is the outer radius and r is the inner radius. This is the area of the big circle minus the area of the small circle.

What is the formula for the perimeter of an annulus?

The 'perimeter' of an annulus is the total length of both its inner and outer boundaries. Calculate it with the formula P = 2πR + 2πr, or P = 2π(R + r).

How do you calculate the width of the ring?

The width is simply the difference between the outer and inner radii. The formula is Width = R - r.

What if the two circles aren't concentric?

If the two circles do not share the same center, the shape is not a true annulus. It would have a non-uniform width.

How do I calculate area using diameters?

First, divide each diameter by two to find the radii R and r (R=D/2, r=d/2). Then use the standard area formula A = π * (R² - r²).

What's the difference between a ring and a disk?

A disk is a solid circle. A ring is a disk with a hole in the middle. Technically, a ring is a disk where the inner radius (r) is greater than zero.

What are some real-world examples of an annulus?

Common examples include washers, gaskets, CDs/DVDs, the growth rings of a tree, and the lanes of a running track.

What units are used for the area of a ring?

Area is always measured in square units. For example, if the radii are measured in inches, the area will be in square inches (in²).