Chords & Tangents (OCR GCSE Maths)

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Circles & Chords

What is a chord?

  • A chord is any straight line is a circle that joins any two parts of the circumference
  • An isosceles triangle is formed by a chord and the two radii joining the ends of the chord to the centre of the circle
    • This is not technically a circle theorem, but is very useful in answering circle theorem questions
  • To start any circle theorem questions
    • first identify any radii and mark them as equal lines  
    • then look to see if the radii are joined to any chords

Circle Theorem: The perpendicular bisector of a chord is a radius

  • If a radius or diameter intersects a chord in a circle, in will bisect that short at a right angle
    • bisect means to cut in half
  • This circle theorem is seen less often, but can be very useful in finding equal lengths and angles
  • To spot it, look for a radius and see if it intersects any chords
  • Problems involving this theorem often have the radii being joined to the end of the chords and so creating two congruent triangles
  • This is also easier to see than remember from its description
    Radius chord bisect, IGCSE & GCSE Maths revision notes 

What else should I know about chords?

  • Although it is not strictly a circle theorem the following is a very important fact for solving some problems
  • A triangle which is formed from the centre using a chord and two radii is an isosceles triangle
    • This means at least two of the angles will be equal and there will be at least one line of symmetry
    • This is very useful in proving circle theorems 

Circles & Tangents

What is a tangent?

  • A tangent to a circle is a straight line outside of the circle that touches its circumference only once
  • Tangents are the easiest thing to spot quickly in a circle theorem question as they lie outside of the circle and stand out clearly

Circle Theorem: A radius and a tangent are perpendicular

  • Most of the time, if there is a tangent in a circle theorem question it will meet a radius at the point where it touches the circumference of a circle
    • Make sure that the line the tangent meets is definitely a radius; that it starts at O, the centre
  • This circle theorem states that a radius and a tangent meet at 90°
    • Perpendicular just means at right angles
  • If asked to state reasons and you use this theorem then use the key phrase;
    • "A radius and a tangent meet at right angles"

Radius tangent 90, IGCSE & GCSE Maths revision notes

What else should I know about tangents?

  • Although it is not strictly a circle theorem the following is a very important fact for solving some problems
  • Two tangents from a circle to the same point outside of a circle are equal length
  • This means that a kite can be formed by two tangents meeting a circle
    • Remember that a kite is essentially two congruent triangles about its main diagonal
    • The kite will have two right angles, where the tangents meets the radii
      Equal length tangents, IGCSE & GCSE Maths revision notes

Examiner Tip

  • If you spot a tangent on a circle diagram, look to see if it meets a radius and add in the right angle clearly to the diagram straight away
    • In some cases just the act of doing this can earn you a mark!

Worked example

Find the value of θ in the diagram below.Q1a Circle Theorems 1, IGCSE & GCSE Maths revision notes

  

The lines ST and RT are both tangents to the circle and meet the two radii on the circumference at the points and T.

Angle TSO = angle TRO = 90° (A radius and a tangent meet at right angles)

Use vertically opposite angles to find the value of the angle at T that is opposite the 25° angle.

Angle RTS = 25° (vertically opposite angles)

Mark these angles clearly on the diagram.

Q1a Circle Theorems 2, IGCSE & GCSE Maths revision notes

Angles in a quadrilateral add up to 360°. Use this to form an equation for θ.

theta space plus space 90 space plus space 90 space plus space 25 space equals space 360

Simplify.

theta space plus space 205 space equals space 360

Solve.

theta space equals space 360 space minus space 205 space

bold space bold italic theta bold space bold equals bold space bold 155 bold degree

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Amber

Author: Amber

Expertise: Maths

Amber gained a first class degree in Mathematics & Meteorology from the University of Reading before training to become a teacher. She is passionate about teaching, having spent 8 years teaching GCSE and A Level Mathematics both in the UK and internationally. Amber loves creating bright and informative resources to help students reach their potential.