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15 sie 2020 · 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.
How to use this scale converter. Set the scale ratio according your needs, such as 1:10, 1:30, 35:1, 1:100, 1:200, 1:500. Select the unit of real length and scale length. Support multiple unit coversions, such as mm, cm, meter, km, inches, feet, yards, miles, nautical miles.
To convert a smaller, scaled measurement up to the actual measurement, simply multiply the scaled measurement by the scale factor. For example, if the scale factor is 1:8 and the scaled length is 4, multiply 4 × 8 = 32 to convert it to the larger actual size.
The scale 1 : 20 means that one centimetre on the scale drawing represents 20 cm in real life. The drawn length multiplied by 20 gives the real length.
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.
1 cm equals 10 mm. 1:1 Scale The 1:1 scale is full size. Each division, for instance, is 1mm in width, with the number-ing of calibrations at 10 mm intervals. The size of the drawing on the page is the size of the actual object. By dividing or multiplying by 10 or 100, this scale can easily go from 1:10 to 1:100 and so on. 1:2 Scale
To scale an object to a smaller size, you simply divide each dimension by the required scale factor. For example, if you would like to apply a scale factor of 1:6 and the length of the item is 60 cm, you simply divide 60 / 6 = 10 cm to get the new dimension.
