area is length times width so the actual area is 50 x 50 or 2500 times higher, or 2500 x 6 = 15000 sq ft
Mathmatics a drawing with dimensions at a specific ratio relative to the actual size of the object drawn found on http://dictionary.reference.com/browse/Scale%20Drawing Mathmatics a drawing with dimensions at a specific ratio relative to the actual size of the object drawn found on http://dictionary.reference.com/browse/Scale%20Drawing Mathmatics a drawing with dimensions at a specific ratio relative to the actual size of the object drawn found on http://dictionary.reference.com/browse/Scale%20Drawing
When it is a scale model the model is proportional to the actual object only much smaller.
Most people will, without hesitation, say a rectangle. In actual fact, though, the paper DOES have a thickness. If it did not, then a stack of dollar bills would still have no height. So, at a very fine level of detail, it is shaped like a rectangular prism.
To simplify a scale, convert to the same units, drop the units and divide by their highest common factor: 1 cm = 10 mm drawing : object = 8 mm : 1 cm → 8 mm : 1 × 10 mm → 8 mm : 10 mm → 8 : 10 → 4 : 5 → object is larger than scale drawing.
It would be: 96/12 = 8 inches
If the dimensions of the actual playground are 50 times those of the scale drawing, then the length and width of the actual playground can be represented as 50 times the length and width of the scale drawing. The area of a rectangle is calculated by multiplying length by width. Since the area of the scale drawing is 6 square feet, the area of the actual playground will be ( (50 \times \text{length}) \times (50 \times \text{width}) = 2500 \times \text{(length} \times \text{width)} ). Therefore, the area of the actual playground is ( 2500 \times 6 = 15,000 ) square feet.
# is the ratio of the demensions in the drawing to the corresponding actual dimensions. The scale factor for a scale drawing is the ratio of the dimensions in the drawing to the corresponding acual bimensions.
Mathmatics a drawing with dimensions at a specific ratio relative to the actual size of the object drawn found on http://dictionary.reference.com/browse/Scale%20Drawing Mathmatics a drawing with dimensions at a specific ratio relative to the actual size of the object drawn found on http://dictionary.reference.com/browse/Scale%20Drawing Mathmatics a drawing with dimensions at a specific ratio relative to the actual size of the object drawn found on http://dictionary.reference.com/browse/Scale%20Drawing
5.625
To find the area of the actual playground, you need to square the scale factor of 3, which equals 9. Then, multiply the area of the scale model (6 square yards) by this squared scale factor to get the area of the actual playground. Therefore, the area of the actual playground is 6 square yards multiplied by 9, which equals 54 square yards.
Many manufactured or constructed items are too large (or too small) to be be drawn actual size.The engineer has to produce a drawing of convenient size to be read by those doing the construction. The scale will be on the drawing and used to convert the dimensions to actual size
6
Yes, a scale drawing is mathematically similar to the actual size because it maintains the same proportions between corresponding dimensions. This means that the ratios of lengths, angles, and other geometric properties are consistent, allowing for accurate representation of the original object. However, the scale drawing is a reduced or enlarged version, depending on the scale factor used.
A scale drawing.
When it is a scale model the model is proportional to the actual object only much smaller.
Measurements can be conveyed through drawings using dimensions, notes, symbols, scales, and annotations. Dimensions show the size of the object, while notes provide additional information. Symbols represent specific features, scales indicate the ratio between drawing size and actual size, and annotations offer explanations or instructions.
how can it