Bearings (AQA GCSE Maths)

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Bearings

What are bearings?

  • Bearings are a way of describing and using directions as angles
  • They are specifically defined for use in navigation because they give a precise location and/or direction

How are bearings defined?

  • There are three rules which must be followed every time a bearing is defined
    • They are measured from the North direction

      North is usually straight up in terms of a scale drawing or map drawn on a piece of paper and should be shown somewhere on the diagram

    • They are measured clockwise (from North)
      If you get muddled up look at a clock on the wall

    • The angle should always be written (said) with 3 figures
      So angles under 100° should have zero(es) to fill in the missing figures, eg 059, 008

  • Notice also that the degree symbols are not usually included when talking about bearings

What are bearings used for?

  • Bearings questions will normally involve the use of Pythagoras or trigonometry to find missing distances (lengths) and directions (angles) within navigation questions
    • You should always draw a diagram
  • There may be a scale given or you may need to consider using a scale
  • Some questions may involve the use of angle facts to find the missing directions
  • To answer a question involving drawing bearings the following steps may help:
    • STEP 1: Draw a diagram adding in any points and distances you have been given
    • STEP 2: Draw a North line (arrow pointing vertically up) at the point you wish to measure the bearing from
      • If you are given the bearing from A to B draw the North line at A
    • STEP 3: Measure the angle of the bearing given from the North line in the clockwise direction
    • STEP 4: Draw a line and add the point B at the given distance
  • You will likely then need to use Pythagoras's theorem or trigonometry to calculate another distance

Exam Tip

  • Make sure you have all the equipment you need for your maths exams, along with a spare pen and pencil
    • A rubber and pencil sharpener can be essential on these questions as they are all about accuracy
    • Make sure you have compasses that aren’t loose and wobbly
    • Make sure you can see and read the markings on your ruler and protractor
  • Always draw a big, clear diagram and annotate it, be especially careful to label the angles in the correct places!

Worked example

A ship sets sail from the point P, as shown on the map below.

It sails on a bearing of 105 until it reaches the point Q, 70 km away. The ship then changes path and sails on a bearing of 065 for a further 35km, where its journey finishes.

Show on the map below the point Q and the final position of the ship. 
Blank map, IGCSE & GCSE Maths revision notes

Draw in a north line at the point P.

Measure an angle of 105° clockwise from the north line.

Make sure you are accurate, carefully make a small but visible mark on the map. 


Map Angle 1, IGCSE & GCSE Maths revision notes

 

Draw a line from P through the mark you have made. Make this line longer than you expect to need it to be so that you can easily measure along it accurately.
Map Line 1, IGCSE & GCSE Maths revision notes

Use the scale given on the map (1 cm = 10 km) to work out the number of cm that would represent 70 km.

70 km = 70 ÷ 10 = 7 cm

Accurately measure 7 cm from the point P along the line and make a clear mark on the line. 
This is the point Q.
 
Map Point Q, IGCSE & GCSE Maths revision notes

A bearing of 065 means 65° clockwise from the North.

First, draw a north line at the point Q, then carefully measure an angle of 65° clockwise from this line. Make a mark and then draw a line from Q through this mark.

Using the scale, find the distance in cm along the line you will need to measure. 

  35 km = 35 ÷ 10 = 3.5 cm

Accurately measure 3.5 cm from the point Q along this new line and make a clear mark on the line. 
This is the final position of the ship.
Answer map, IGCSE & GCSE Maths revision notes

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Amber

Author: Amber

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.