Definitions [5]
A circle is a closed curve where all points on the boundary (called the circumference) are at the same distance from a fixed point inside it.
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The fixed point inside the circle is called the center (O)
The radius is a straight line segment that connects the center of the circle to any point on its circumference.
Characteristics:
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Symbol: Usually represented as r
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All radii of a circle have the same length
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A circle has infinite radii (one to every point on the circumference)
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The radius is always half the diameter
- Radius = `"Diameter"/"2"`
The diameter is a straight line segment that passes through the center of the circle and has both endpoints on the circumference.
Characteristics:
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The diameter passes through the center
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A circle has infinite diameters
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The diameter is the longest possible chord of a circle
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The diameter is twice the radius
- Diameter = 2 × Radius and
A chord is a straight line segment that connects any two points on the circumference of the circle.
Characteristics:
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A circle has infinite chords
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The diameter is the longest chord in any circle
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Chords closer to the centre are longer than chords farther from the center
Central Angle: An angle whose vertex is the centre of the circle is called a central angle.
Theorems and Laws [1]
A circle touches the side BC of a ΔABC at a point P and touches AB and AC when produced at Q and R respectively. As shown in the figure that AQ = `1/2` (Perimeter of ΔABC).
We have to prove that
AQ = `1/2` (perimeter of ΔABC)
Perimeter of ΔABC = AB + BC + CA
= AB + BP + PC + CA
= AB + BQ + CR + CA
(∵ Length of tangents from an external point to a circle are equal ∴ BP = BQ and PC = CR)
= AQ + AR ...(∵ AB + BQ = AQ and CR + CA = AR)
= AQ + AQ ...(∵ Length of tangents from an external point are equal)
= 2AQ
⇒ AQ = `1/2` (Perimeter of ΔABC)
Hence proved.
Key Points
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Arc Definition: An arc is a curved portion of a circle's circumference between two points.
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Two Types: Minor arc (< 180°) and Major arc (> 180°).
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Semicircle: When the arc angle is exactly 180°, it's called a semicircle.
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Complete Circle: Minor arc + Major arc = 360° (complete circumference).
