What is a Secant of a Circle?
A secant of a circle is a straight line that intersects the circle at two distinct points. When this line crosses a circle, it enters the interior of the circle, creating two points of intersection on the circle itself. Essentially, a secant line connects two points on the circle’s circumference by passing through its interior. It’s important to note that a straight line can intersect any given circle at a maximum of two different points, and when it does, it is referred to as a secant line to that circle.
Secant of Circle Definition
A secant of a circle is a straight line that intersects the circle at two distinct points. This line passes through the circle, creating two points of intersection on its boundary.
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Secant of a Circle
Secant of a circle is a fundamental concept in geometry that can be described as a straight line intersecting the circle at two distinct points. In this article, we will understand the definition, properties, theorems, and real-world examples surrounding the concept of secants.
In this article, we will learn about the meaning of secant, the formula to calculate the secant of a circle, properties, Intersecting secants, tangent of a circle, theorem of the secant of a circle, the difference between secant, tangent, and chord, and real-life examples of Secant of a Circle.
Table of Content
- What is a Secant of a Circle?
- Formula of Secant of a Circle
- Properties of Secant of a Circle
- Tangent and Secant of a Circle
- Secant of a Circle Theorem
- Examples of Secant of a Circle
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