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If you're wondering how to calculate the diameter of a circle, this diameter of a circle calculator is a perfect choice. You will need either the radius, the circumference, or the area of a given circle for the calculations. Take a look at the picture above the calculator to visualize each element.
This calculator computes the values of typical circle parameters such as radius, diameter, circumference, and area, using various common units of measurement.
Diameter of a circle is any straight line segment that passes through the center of the circle and whose endpoints lie on the circumference of a circle. Learn how to find the diameter of a circle using radius, circumference, and area.
The diameter is the distance from one point on the surface of a circle to the other point on the surface of the circle through the centre. Visit BYJU’S to learn the different formulas, properties and examples.
This circle calculator finds c (circumference), d (diameter), a (area), and r (radius) of a circle.
Just divide the circumference by π to find the diameter. For example, if your circle has a circumference of 23 inches, the diameter would be 23/π, or approximately 7.32 inches. If you only know the area of the circle, use the formula diameter = 2 x √ (area/π).
A diameter is a chord that runs through the center point of the circle. It is the longest possible chord of any circle. The center of a circle is the midpoint of its diameter. That is, it divides it into two equal parts, each of which is a radius of the circle. The radius is half the diameter.
The diameter of a circle is the line segment that passes through the center of the circle and has its two endpoints on the circle. It is the longest distance from one end of the circle to the other and is twice the radius.
Our circle measurements calculator helps to calculate the radius, diameter, circumference and area of a circle.
Calculate the area, circumference, radius and diameter of circles. Find A, C, r and d of a circle. Given any 1 known variable of a circle, calculate the other 3 unknowns. Circle formulas and geometric shape of a circle.