Maps, plans and diagrams are scaled representations of real spaces. In Foundation Mathematics, you need to interpret these representations to find actual distances, areas, and directions — and to navigate in real-world contexts.
KEY TAKEAWAY: A scale tells you the relationship between a measurement on the diagram and the real-world measurement. Always apply the scale before drawing any conclusions about actual size.
A scale shows how a map measurement converts to a real measurement.
\(\$1 : 5000 \quad \text{(1 unit on map = 5000 of the same units in reality)}\)\$
A drawn line on the map labelled with its real-world length.
Worked Example:
A map has scale \(1\text{ cm} : 200\text{ m}\). Two towns are \(4.5\text{ cm}\) apart on the map.
\$\(\text{Real distance} = 4.5 \times 200 = 900\text{ m} = 0.9\text{ km}\)\$
Worked Example:
Same map (\(1\text{ cm} : 200\text{ m}\)). A road is \(1.4\text{ km}\) long in reality.
\$\(1.4\text{ km} = 1400\text{ m}\)\$
\$\(\text{Map distance} = \frac{1400}{200} = 7\text{ cm}\)\$EXAM TIP: Convert units before applying the scale. A scale of \(1:5000\) means \(1\text{ cm} = 5000\text{ cm} = 50\text{ m}\).
Cardinal directions: North (N), South (S), East (E), West (W)
Intercardinal: NE, NW, SE, SW
Compass bearings: Measured clockwise from North, from \(0°\) to \(360°\).
| Direction | Bearing |
|---|---|
| North | \(0°\) or \(360°\) |
| East | \(090°\) |
| South | \(180°\) |
| West | \(270°\) |
| North-East | \(045°\) |
| South-West | \(225°\) |
True bearing: Always written as 3 digits, e.g. \(045°\), \(135°\), \(270°\).
COMMON MISTAKE: Confusing the bearing of \(090°\) (East) with going upward. Bearings always start from North and go clockwise.
Floor plans show the layout of a building from above. Key skills:
- Identify rooms and their dimensions from the scale
- Calculate actual areas using the scale
- Read door/window positions
Example:
A floor plan uses scale \(1:100\). A room measures \(3\text{ cm} \times 4\text{ cm}\) on the plan.
\$\(\text{Actual dimensions} = 3\text{ cm} \times 100 = 300\text{ cm} = 3\text{ m}, \quad 4\text{ cm} \times 100 = 4\text{ m}\)\$
\$\(\text{Actual area} = 3 \times 4 = 12\text{ m}^2\)\$
VCAA FOCUS: Map and plan questions typically ask you to find a real distance, calculate an area from a plan, identify a direction or bearing, or read a grid reference. Always show the scale conversion step.
