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These worksheets might provide students with a simple floor plan, showing the layout of rooms in a house or building with a scale like “1 centimeter represents 2 meters.” The task could be to draw the room at a different scale, such as reducing the size to “1 centimeter equals 4 meters,” or to create a new room layout using the given scale.
A scale drawing with the scale of 50 : 1 gives the width of one component as 2 cm. Find the actual width of this component. Image caption, The scale 50 : 1 is a unitary ratio in the form...
Functional Skills: Maps and Scale Drawings Example Questions. Question 1: The diagram below shows a scale drawing of an ant. The ruler shown is a centimetre ruler. The drawing has a scale of 1:0.15. Calculate the length of the ant in real life.
Two maps are drawn of a play park and a garage using the Scale 1:200 and 1:50. Here are some measurements and real life sizes of objects on the plans. Fill in the boxes to complete the table: Scale 1:200 (every 1cm on map = 200cm in real life size) DRAWING SIZE. REAL LIFE SIZE.
Scales and Scale Factors. Below is a scale drawing of a tennis court with a scale 1\text { cm}:4\text { m} or 1:400. We can use a scale of 1:400 to calculate the scale factor, by dividing the left hand side of the ratio by the right hand side: Scale factor: 1\div400=\dfrac {1} {400}
Here we will learn about scale drawings, including creating scale drawings, using scale factors, and word problems. There are also scale diagrams and drawings worksheets based on Edexcel, AQA and OCR exam questions, along with further guidance on where to go next if you’re still stuck.
For example, below is a scale drawing of a rectangular pool with a scale of 1 \, cm \, \text{:} \, 2 \, m or 1 \, \text{:} \, 200. This means that every centimeter on the diagram represents 2 meters (or 200 \, cm ) in real life.
