Properties of Circle
Let’s look at some interesting qualities that distinguish circles from other geometric forms. This is a list of circular properties:
- A circle is a closed two-dimensional form defined by its single curving perimeter.
- Circles are deemed congruent when their radii have the same length.
- Chords of equal length in a circle are always equidistant from the centre.
- The perpendicular bisector of a chord travels through the centre of the circle.
- When two circles meet, the line connecting their points of intersection is perpendicular to the line connecting their centres.
- Tangents drawn at the ends of a diameter are parallel.
Circle Formulas For Diameter, Area and Circumference
Circle formulas are basic formulas used in geometry to solve various problems of circles and are used in solving various mathematical and other problems. Before moving with various circle formulas one must familiarise with the basic definition of a circle. “A circle is a basic geometrical shape in which all points on the circumference of the circle are equidistant from the centre of the circle.”
In this article, we will learn about various circle formulas their uses and others in detail.
Table of Content
- Circle Formulas
- Parts of a Circle
- What are Circle Formulas?
- Properties of Circle
- List of All Circle Formulas
- Examples on Circle Formulas