Centre–Chord Perpendicular Bisector

\( \text{A radius/diameter perpendicular to a chord bisects the chord} \)
Circle Theorems GCSE
Question 5 of 20
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A circle has radius 10 cm. A perpendicular from the centre to chord AB is 6 cm. Find AB.

Hint (H)
\( Right triangle OMA: OA² = OM² + AM². \)

Explanation

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Statement

In a circle, any radius or diameter drawn perpendicular to a chord will bisect that chord. That means the chord is cut into two equal halves at the point of intersection.

Why it’s true (short reason)

  • Join the centre of the circle to the endpoints of the chord: you create two congruent right-angled triangles.
  • Both triangles share the radius as their hypotenuse, and they share the perpendicular line as a height.
  • By symmetry, the two halves of the chord must be equal. This is why the perpendicular radius/diameter bisects the chord.

Recipe (how to use it)

  1. Identify the circle, its centre \(O\), and chord \(AB\).
  2. Draw a radius or diameter \(OM\) such that \(OM \perp AB\).
  3. By the perpendicular bisector property: \(AM = MB\).
  4. Use Pythagoras in right triangle \(OAM\) if you need to find chord length from radius and perpendicular distance: \[ OA^2 = OM^2 + AM^2. \]
  5. Multiply \(AM\) by 2 to get the full chord length: \(AB = 2AM\).

Spotting it

Use this property when:

  • A question involves a perpendicular line from the centre to a chord.
  • You are asked for the length of a chord, given the radius and the perpendicular distance from the centre.
  • You need to prove that a line bisects a chord or that two segments are equal.

Common pairings

  • Pythagoras’ theorem (to calculate chord length or perpendicular distance).
  • Circle theorems (equal radii, symmetry of chords).
  • Geometry of isosceles triangles (two radii are equal).

Mini examples

  1. A radius perpendicular to chord \(AB=12\) cm → each half is \(6\) cm.
  2. Circle with radius \(10\) cm, perpendicular from centre to chord is \(6\) cm. By Pythagoras: \(AM = \sqrt{10^2-6^2}=8\). So \(AB = 16\) cm.
  3. Circle radius \(13\) cm, perpendicular distance to chord = \(5\) cm. \(AM = \sqrt{13^2-5^2}=12\). So \(AB = 24\) cm.

Pitfalls

  • Forgetting that the chord is bisected: A perpendicular radius doesn’t just meet the chord; it splits it into two equal parts.
  • Using the whole chord instead of half: In Pythagoras, use \(AM = AB/2\), not the full chord.
  • Confusing tangent property: A tangent is perpendicular to a radius at the point of contact — not the same as this theorem.

Exam strategy

  • Mark the midpoint \(M\) of the chord where the radius/diameter meets it.
  • State clearly: “Radius ⟂ chord ⇒ chord is bisected.”
  • Apply Pythagoras: \(OA^2 = OM^2 + AM^2\).
  • Multiply the half-chord back up if the full chord length is required.

Extended micro-examples

  1. Circle with radius \(17\) cm, perpendicular distance to chord = \(8\) cm. \(AM = \sqrt{17^2-8^2}=\sqrt{225}=15\). So \(AB=30\) cm.
  2. Chord length \(40\) cm, perpendicular distance = \(9\) cm. Half chord = \(20\). Radius = \(\sqrt{20^2+9^2}=\sqrt{481}\approx 21.9\) cm.
  3. Chord \(AB\) bisected by diameter, \(AM=6\). Then \(AB=12\) cm.

Summary

A radius or diameter drawn perpendicular to a chord always bisects the chord, splitting it into two equal segments. This gives a simple way to find chord lengths or perpendicular distances using Pythagoras’ theorem: \[ AB = 2\sqrt{r^2 - OM^2}. \] Remember: perpendicular → bisected, and the property works for any chord inside the circle.

Worked examples

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  1. In a circle, a radius is drawn perpendicular to a chord of length 10 cm. How long is each half of the chord?
    1. A radius perpendicular to a chord bisects the chord.
    2. \( Therefore, each half = 10 ÷ 2 = 5. \)
    Answer: 5 cm
  2. \( A circle has centre O. A perpendicular from O to chord AB makes OA = 13 cm and distance from O to AB = 5 cm. Find AB. \)
    1. Drop perpendicular from O to midpoint M of AB.
    2. \( Triangle OMA is right-angled: OA² = OM² + AM². \)
    3. \( AM² = 13² - 5² = 169 - 25 = 144. \)
    4. \( AM = 12, so AB = 24. \)
    Answer: 24 cm
  3. \( Chord AB of a circle is bisected at right angles by a diameter. If AB = 16 cm, find AM. \)
    1. Perpendicular diameter bisects chord AB.
    2. \( So AM = AB/2 = 8 cm. \)
    Answer: 8 cm
  4. \( In a circle, radius = 10 cm. A perpendicular from the centre to chord AB is 6 cm. Find length of AB. \)
    1. \( Right triangle OMA: OA² = OM² + AM². \)
    2. \( 10² = 6² + AM² ⇒ AM² = 100 − 36 = 64. \)
    3. \( AM = 8 ⇒ AB = 16. \)
    Answer: 16 cm
  5. \( A chord AB is bisected by a perpendicular diameter at M. If AM = 9 cm, find AB. \)
    1. \( Perpendicular bisector gives AM = MB. \)
    2. \( So AB = 2×9 = 18 cm. \)
    Answer: 18 cm
  6. A circle has radius 13 cm. Distance from centre to chord AB is 12 cm. Find AB.
    1. \( OM = 12, OA = 13. \)
    2. \( AM² = OA² − OM² = 169 − 144 = 25 ⇒ AM = 5. \)
    3. \( So AB = 10. \)
    Answer: 10 cm
  7. \( A diameter bisects chord AB perpendicularly. AB = 20 cm. Find MB. \)
    1. Perpendicular bisector splits chord equally.
    2. \( So MB = 10 cm. \)
    Answer: 10 cm
  8. A circle has centre O, radius 25 cm. A chord is 48 cm long. Find the perpendicular distance from O to the chord.
    1. \( Chord bisected: AM = 24. \)
    2. \( OA = 25, AM = 24. \)
    3. \( OM² = OA² − AM² = 625 − 576 = 49. \)
    4. \( OM = 7. \)
    Answer: 7 cm
  9. \( In a circle, a diameter bisects chord AB at right angles. If AM = 6 cm, find AB. \)
    1. \( Perpendicular bisector property: AM = MB. \)
    2. \( So AB = 2×6 = 12. \)
    Answer: 12 cm
  10. A circle has radius 17 cm. The perpendicular distance from the centre to a chord is 8 cm. Find chord length.
    1. \( OA = 17, OM = 8. \)
    2. \( AM² = 17² − 8² = 289 − 64 = 225. \)
    3. \( AM = 15 ⇒ AB = 30. \)
    Answer: 30 cm