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Scale Drawings and Maps

Scale Drawings and Maps

A scale drawing or a map is a proportional representation of a real-world object or place. Because we cannot draw a city or a house at its actual size on a piece of paper, we shrink it down using a scale factor.

Understanding Map Scales

A scale tells you how the measurements on the drawing relate to the actual measurements in the real world. Scales can be written in two common ways:

  • With units: e.g., 1 cm=50 km1\text{ cm} = 50\text{ km} (1 centimeter on the map represents 50 kilometers in reality).
  • As a ratio: e.g., 1:5001:500 (1 unit on the map represents 500 of the same units in reality).

Finding Actual Distances

To find a real-world distance from a map, multiply the map distance by the scale factor.

Example: A map has a scale of 1:5001:500. A street measures 3 cm3\text{ cm} on the map. What is the actual length of the street?

  1. The scale 1:5001:500 means 1 cm1\text{ cm} on the map equals 500 cm500\text{ cm} in real life.
  2. Multiply the map distance by 500: 3 cm×500=1500 cm3\text{ cm} \times 500 = 1500\text{ cm}
  3. Convert to meters (since 100 cm=1 m100\text{ cm} = 1\text{ m}): 1500 cm=15 m1500\text{ cm} = 15\text{ m}

The actual street is 15 meters15\text{ meters} long.

Creating a Scale Drawing

To create a drawing from real measurements, you divide the actual distance by the scale factor.

Example: You want to draw a map of a 200 km200\text{ km} highway using a scale of 1 cm=50 km1\text{ cm} = 50\text{ km}. How long should the line on your map be?

Divide the real distance by the scale value: 200 km÷50 km/cm=4 cm200\text{ km} \div 50\text{ km/cm} = 4\text{ cm}

Your drawn line should be 4 cm4\text{ cm} long.

How Scales Affect Area

It is important to remember that scales apply to lengths (1D), but areas (2D) scale differently.

Rule: If the lengths of a drawing are scaled by a factor of kk, the area is scaled by a factor of k2k^2.

Example: If a map's scale changes from 1:1001:100 to 1:2001:200, how does the drawn area change?

  1. The new scale (1:2001:200) means things are drawn half as large in length compared to the old scale (1:1001:100). So, the length scale factor is k=12k = \frac{1}{2}.
  2. To find the effect on area, square the length scale factor: k2=(12)2=14k^2 = \left(\frac{1}{2}\right)^2 = \frac{1}{4}

The new drawn area will be exactly 14\frac{1}{4} the size of the original drawn area.