Calculate the area of a circle in square inches from radius, diameter, or circumference. Instantly converts to sq ft, sq cm, and sq mm.
Whether you're sizing gaskets, comparing pizza values, measuring plate surfaces, or calculating fabric circles, knowing the area of a circle in square inches gives you the precision needed for smaller-scale measurements. While square feet work for rooms and yards, square inches are the go-to unit for objects you can hold, eat, or machine.
This Square Inches of a Circle Calculator accepts radius, diameter, or circumference in inches, centimeters, millimeters, or feet, and returns the area in square inches along with conversions to square feet, square centimeters, and square millimeters. It also displays the circle's radius, diameter, and circumference in inches for quick reference.
Eight presets cover common real-world circles—from a quarter coin to a large serving platter—so you can see results instantly. The reference table lists areas for everyday circular objects to put your result in context, while unit conversion factors are displayed in a separate table. Visual bars give you an intuitive comparison of area across different unit systems. This tool is perfect for crafters, engineers, students, and anyone who needs fast, accurate circle-area computations at the inch scale.
Square-inch area is the unit you usually need for smaller round objects such as pizzas, plates, lids, gaskets, patches, and craft templates. This calculator is useful because it accepts radius, diameter, or circumference in multiple units and converts everything back to square inches automatically, then shows related conversions to square feet, square centimeters, and square millimeters. It saves time when comparing object sizes, estimating material coverage, or pricing round items by area.
A = π × r² (in square inches). From diameter: r = d / 2. From circumference: r = C / (2π). Non-inch inputs converted to inches first.
Result: A 12-inch diameter circle has an area of about 113.0973 square inches.
With Diameter mode set to 12 inches, the calculator converts to radius = 6 inches and computes area = π × 6² ≈ 113.0973 sq in. It also shows the same circle as about 0.7854 sq ft, 729.6582 sq cm, and 72,965.82 sq mm.
For objects smaller than a room—gaskets, coins, pizzas, plates, fabric circles—square inches deliver practical precision that square feet cannot. Area scales with the square of the radius: doubling the radius from 3 to 6 inches quadruples the area from 28.3 to 113.1 sq in, not merely doubles it. A 6-inch radius circle covers 113.1 sq in but only 0.785 sq ft; working in square inches avoids cumbersome small decimals that are easy to misread or round incorrectly.
Pizza pricing is opaque because diameter is quoted, not area. Comparing by area reveals the true value:
| Diameter | Area (sq in) | |----------|-------------| | 8″ | 50.3 | | 10″ | 78.5 | | 12″ | 113.1 | | 14″ | 153.9 | | 16″ | 201.1 |
A 16-inch pizza (201 sq in) is 78% larger than a 12-inch pizza (113 sq in), even though the diameter is only 33% larger. Divide price by area to get cost per square inch—larger pizzas are almost always the better deal.
| Conversion | Factor | |------------|--------| | sq in → sq ft | ÷ 144 | | sq in → sq cm | × 6.4516 | | sq in → sq mm | × 645.16 | | sq cm → sq in | × 0.15500 |
When material coverage is listed in sq ft (e.g., a gallon of paint covers 350 sq ft = 50,400 sq in), divide the circle's area in sq in by the coverage figure to find the fraction of a gallon or can needed.
Circular seals are specified by inner diameter (ID) and outer diameter (OD). The face area = π(R_outer² − R_inner²). For a 4-inch OD, 3-inch ID gasket: A_face = π(4 − 2.25) = π × 1.75 ≈ 5.50 sq in. At $0.10/sq in for silicone sheet stock, each gasket costs about $0.55 in material—a calculation that scales directly with face area and guides purchasing decisions for custom seal production.
Use the formula A = π × r², where r is the radius in inches. For a 6-inch radius, the area is about 113.1 sq in.
A 12-inch diameter circle has radius 6 in, so area = π × 6² ≈ 113.1 sq in.
Divide by 144. For example, 113.1 sq in ÷ 144 ≈ 0.785 sq ft.
Yes. Select "Centimeters" and the tool converts to inches (1 cm ≈ 0.3937 in) before calculating.
Enter each pizza's diameter and note the square inches. A 16″ pizza (201 sq in) is 77 % bigger than a 12″ pizza (113 sq in), not just 33 %.
If you measured around the edge of a circle with a tape, enter that value as circumference and the calculator derives the radius. Use this as a practical reminder before finalizing the result.