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A scale drawing of an object has the same shape as the object, but a different size. The scale of the drawing is the ratio length on the drawing : length on the actual object. A scale can be written as the ratio of two lengths, or as the ratio of two numbers. For example: scale = 1 cm : 5 m or scale = 1 : 500.
1 cm on the scale drawing represents 12∙5 cm in real life. The drawn length multiplied by 12∙5 gives the real length. The scale drawing enlarges the size of the machine component by scale ...
The statement “1 cm represents 2 m” is the scale of the drawing. It can also be expressed as “1 cm to 2 m,” or “1 cm for every 2 m.” What do you think the scale tells us? How long would each measurement from the first question be on an actual basketball court? Explain or show your reasoning.
A four-bevel scale has four scale ratios; two are on each side. A triangle scale can have the largest scale ratio range because it has three sides, and each side can have up to two scale ratios.
The scale of a drawing is usually stated as a ratio. For example, 1 \, cm \, \text{:} \, 5 \, m. You would read this as “ 1 centimeter to 5 meters” which means that every 1 centimeter on the diagram represents 5 meters in real life.
15 sie 2020 · Measure the distances on the scale drawing that are labeled a–d to the nearest tenth of a centimeter. Record your results in the first row of the table. The statement “1 cm represents 2 m” is the scale of the drawing. It can also be expressed as “1 cm to 2 m,” or “1 cm for every 2 m.”.
15 sie 2020 · In the first scale drawing, 1 cm represented 90 m. In the new drawing, we would need 3 cm to represent 90 m. That means each length in the new scale drawing should be 3 times as long as it was in the original drawing.
