Circles can be termed congruent if their radii are identical in length.A circle is a closed two-dimensional figure distinguished by its singular curved surface.Here’s a compilation of circle properties: Let’s progress and delve into some intriguing attributes that distinguish circles from other geometric shapes. Similar to segments, there are two types of sectors: the minor sector and the major sector.Īlso Check – Squares and Square Roots Formula Properties of Circle Two types of segments exist the minor segment and the major segment.Ī sector of a Circle: A sector is a region enclosed by two radii and the corresponding arc in a circle. Segment in a Circle: This refers to the area enclosed by a chord and the corresponding arc within a circle. Secant: A secant is a line intersecting the circle at two points along its circumference.Īrc of a Circle: An arc is a curved portion of the circle’s circumference, representing a segment or part of it. Tangent: A tangent is a straight line that touches the circle at a single point, while remaining outside the circle. The longest chord is the diameter, which divides the circle into two equal parts by passing through the center. Touching the boundary at two distinct points situated opposite each other.Ĭhord of a Circle: A chord denotes a line segment that touches the circle at two distinct points on its boundary.Noteworthy characteristics of a diameter include: An infinite number of radii exist within a circle.ĭiameter: A diameter is a straight line that passes through the center, connecting two points on the circle’s boundary. Radius of Circle: The radius is the distance extending from the circle’s center to any point on its boundary. Here are several significant aspects of a circle explained below:Ĭircumference: Also known as the perimeter, the circumference of a circle represents the length of its outer boundary. To comprehend the properties of a circle, it’s crucial to familiarize ourselves with its various components. The diagram presented below highlights the essential components of a circle, which are imperative for comprehending circles and their corresponding formulas. To familiarize yourself with the fundamental components of a circle, namely the center, radius, and diameter, please refer to the illustration below.Īlso Check – Line and Angles Formula Parts of a Circle The distance from the center to any point on the circle is referred to as the radius. With this fundamental understanding in place, we can now proceed to comprehend the array of circle formulas through the elucidation of solved examples.Īlso Check – Factorization Formula What Are All Circle Formulas?Ī circle is a flat, two-dimensional shape composed of a collection of points situated at a constant distance (known as the radius) from a specific point referred to as the center or origin. The distance extending from the center of the circle to its periphery is termed the radius. This particular fixed point is referred to as the circle’s center. A circle is characterized as the collection of points uniformly positioned at an identical distance from a specific point within a two-dimensional plane. How can the radius be calculated using the circle formula?Ĭircle Formula: Prior to delving into the intricacies of various circle formulas, let’s take a moment to revisit the concept of a circle itself. ![]()
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