Bearings (Definition)

\( \text{Bearings are measured clockwise from North, as 3-digit angles} \)
Measures GCSE
Question 5 of 20
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A ship sails South-West. What is the bearing?

Hint (H)
SW is 225°

Explanation

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Statement

Bearings describe directions in navigation and geometry. They are measured as angles clockwise from North and are always expressed as three-digit numbers, such as 045°, 120°, or 270°.

Why it’s true (short reason)

  • North is the fixed reference direction for navigation.
  • Measuring clockwise ensures consistency.
  • Using 3 digits removes ambiguity, so 45° becomes 045°.

Recipe (how to use it)

  1. Draw a North line at the point of origin.
  2. Measure the angle clockwise from North to the direction of travel.
  3. Write the bearing as a 3-digit number (e.g. 75° → 075°).

Spotting it

You will see bearings in questions involving:

  • Maps and navigation problems.
  • Geometry questions about directions.
  • Angles between places, ships, or aircraft.

Common pairings

  • Scale drawings of maps.
  • Trigonometry for distances between places.
  • Compass directions (N, E, S, W).

Mini examples

  1. From town A, town B is due East. Bearing of B from A = 090°.
  2. A ship sails directly South. Bearing = 180°.
  3. A plane heads North-West (45° West of North). Bearing = 315°.

Pitfalls

  • Forgetting bearings must always be 3 digits.
  • Measuring anticlockwise instead of clockwise.
  • Mixing up “bearing of A from B” with “bearing of B from A” (they differ by 180°).

Exam strategy

  • Always start with a North line before measuring angles.
  • Use a protractor clockwise, not anticlockwise.
  • Write answers with 3 digits (e.g. 045° not 45°).
  • Check reciprocal bearings: they differ by 180°.

Summary

Bearings give precise directions by measuring clockwise from North. They avoid confusion by always using 3-digit numbers. They are widely used in maps, navigation, and geometry problems in exams.

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Worked examples

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  1. A ship sails due East. What is its bearing?
    1. \( East = 90° clockwise from North \)
    2. Write as 3 digits → 090°
    Answer: 090°
  2. A plane flies due South. What is the bearing?
    1. \( South = 180° clockwise from North \)
    2. \( Bearing = 180° \)
    Answer: 180°
  3. A car travels due West. Find the bearing.
    1. \( West = 270° clockwise from North \)
    2. \( Bearing = 270° \)
    Answer: 270°
  4. A ship sails North-West. Find its bearing.
    1. NW is 45° West of North
    2. \( Bearing = 360° - 45° = 315° \)
    Answer: 315°
  5. A point is at bearing 060°. Which compass direction is this approximately?
    1. 060° is 60° clockwise from North
    2. Closer to NE direction
    Answer: North-East
  6. Town B is due North of Town A. What is the bearing of A from B?
    1. A is due South from B
    2. \( South = 180° \)
    Answer: 180°
  7. Town C is at bearing 225° from Town D. Find the reciprocal bearing (D from C).
    1. Reciprocal differs by 180°
    2. \( 225° - 180° = 45° \)
    3. Write as 045°
    Answer: 045°
  8. A plane flies with bearing 135°. What compass direction is this?
    1. \( 135° = SE direction (45° past East) \)
    2. So SE
    Answer: South-East
  9. Town A is at bearing 300° from Town B. Find the bearing of B from A.
    1. Reciprocal differs by 180°
    2. \( 300° - 180° = 120° \)
    Answer: 120°
  10. A ship sails at bearing 045°. What direction is this?
    1. \( 045° = NE direction (halfway between North and East) \)
    2. Answer NE
    Answer: North-East