Q.3. Scale factor of length = 65.6 feet/16.4 feet. area of five square units. Increase the dimensions of the given figure using scale factor \(4\). On this page, lets discuss everything about Scale Factor and its examples in detail. I'm 73 and vaguely remember it as semi perimeter theorem. To get the second, smaller figure, we multiply 211721\times \frac{1}{7}2171; the figure on the right uses a scale factor of1:7,17\frac{1}{7}71, oroneseventh. By using this service, some information may be shared with YouTube. Anyways, lets move forward: Scale factor of length = Scaled Length/Real Length, Scale Factor = sqrt{(Scale Area/Real Area)}, Scale Factor = * (Scale Volume/Real Volume). Here we're told, Rectangle N has an area of five square units. This means the shape is scaled up, and the formula is given below:The scale factor is more than the number \(1(k > 1)\) when the figure is enlarged.\({\rm{The\;scale\;factor\;formula}} = {\rm{Greater\;shape\;dimensions}} \div {\rm{Smaller\;shape\;dimensions\;}}\)If the shape has to be reduced:The scale factor is smaller than the number \(1 (0
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