Definitions [6]
Symmetry means that one half of an object is an exact mirror image of the other half. If you could fold the object and both halves match perfectly, then it has symmetry.
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Mirror line mm′ = Line of Symmetry
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Object (F) and its image (F′) are equal distances from the line
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When folded along this line, both parts match exactly
A line of symmetry is an imaginary line that divides a shape into two identical halves. Each half is the mirror image of the other.
Some shapes, like a square, have more than one line of symmetry.
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
Theorems and Laws [2]
Two tangents TP and TQ are drawn to a circle with centre O from an external point T. Prove that ∠PTQ = 2∠OPQ.
Given: A circle with centre O and an external point T from which tangents TP and TQ are drawn to touch the circle at P and Q.
To prove: ∠PTQ = 2∠OPQ.
Proof: Let ∠PTQ = xº.
Then, ∠TQP + ∠TPQ + ∠PTQ = 180º ...[∵ Sum of the ∠s of a triangle is 180º]
⇒ ∠TQP + ∠TPQ = (180º – x) ...(i)
We know that the lengths of tangent drawn from an external point to a circle are equal.
So, TP = TQ.
Now, TP = TQ
⇒ ∠TQP = ∠TPQ
`= \frac{1}{2}(180^\text{o} - x)`
`= ( 90^\text{o} - \frac{x}{2})`
∴ ∠OPQ = (∠OPT – ∠TPQ)
`= 90^\text{o} - ( 90^\text{o} - \frac{x}{2})`
`= \frac{x}{2} `
`⇒ ∠OPQ = \frac { 1 }{ 2 } ∠PTQ`
⇒ 2∠OPQ = ∠PTQ
Given: TP and TQ are two tangents of a circle with centre O and P and Q are points of contact.
To prove: ∠PTQ = 2∠OPQ
Suppose ∠PTQ = θ.
Now by theorem, “The lengths of a tangents drawn from an external point to a circle are equal”.
So, TPQ is an isoceles triangle.
Therefore, ∠TPQ = ∠TQP
`= 1/2 (180^circ - θ)`
`= 90^circ - θ/2`
Also by theorem “The tangents at any point of a circle is perpendicular to the radius through the point of contact” ∠OPT = 90°.
Therefore, ∠OPQ = ∠OPT – ∠TPQ
`= 90^@ - (90^@ - 1/2theta)`
`= 1/2 theta`
= `1/2` ∠PTQ
Hence, 2∠OPQ = ∠PTQ.
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.
