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A line segment that joins two points on the circumference of the circle is defined to be the chord of a circle. Explore more about chords of a circle with concepts, definitions, formulas, theorem, proof and examples.
What is a Chord of a Circle. The chord of a circle is a straight line joining two points on the circumference of the circle. The diameter that passes through the center of the circle is the longest chord of the circle. Shown below are 3 chords AB, CD, and EF.
The chord of a circle can be defined as the line segment joining any two points on the circumference of the circle. It should be noted that the diameter is the longest chord of a circle which passes through the center of the circle. The figure below depicts a circle and its chord.
Chords of a Circle – Explanation & Examples. In this article, you’ll learn: What a chord of a circle is. Properties of a chord and; and; How to find the length of a chord using different formulas. What is the Chord of a Circle? By definition, a chord is a straight line joining 2 points on the circumference of a circle.
A chord (from the Latin chorda, meaning "bowstring") of a circle is a straight line segment whose endpoints both lie on a circular arc. If a chord were to be extended infinitely on both directions into a line , the object is a secant line .
What is a Chord? Answer: : A chord is a line segment that joins any two points on a circle. Diagram 1. In other words, a chord is basically any line segment starting one one side of a circle, like point A in diagram 2 below, and ending on another side of the circle, like point B. Points A and B are the endpoints of chord AB.
What is a chord of a circle? That's what this lesson is all about. You'll learn how to solve for missing measurements with easy step-by-step instruction.
The chord of a circle is a straight line that connects two points on the circumference of a circle. The longest chord in a circle is the diameter of the circle. The perpendicular from the centre of a circle to a chord bisects the chord (splits the chord into two equal parts). In the diagram above, ABAB is a chord and CECE is a radius.
1. What's the difference between a chord and a radius? 2. Can the chord of a circle ever be outside the circle? 3. Is the diameter of a circle also a chord? 4. Is every line that passes through the center of a circle a diameter? 5. How can the concept of a chord be useful in real life? 6.
Here you will learn about circle theorems involving the chords of a circle and the relationships they create. You will learn the application of these theorems, the proofs of these theorems, and how to use them to solve more complex problems.