73 inches by 2 inches
4.25 inches by 9.375 inches
1 inch represents 750 miles. A half inch represents 375 miles.
1inch = 7.5 ft 1 7.5 -- = ----- - set up the problem x 12 7.5x = 12 x = 12/7.5 x = 1.6 inches or approximately 1 5/8 inch for the 26 to save time x = 26/7.5 x = 3.4666.... or approximately 3 1/2 inch the scale drawing for the floor is 1 5/8 inches by 3 1/2 inches or 1.6 inch by 3 .466 inches
1/84
One inch on the model represents 72 inches -- or six feet -- on the real McCoy. Since the miniature is two inches long, the actual airplane it represents is 12 feet long.
4.25 inches by 9.375 inches
15" by 10" inches....lol...
1 inch represents 750 miles. A half inch represents 375 miles.
Anything from 0.25 inch by 0.25 inch by 0.1 inch to 50 feet by 50 feet by 8 feet, depending on the computer and what it is used for.
That thing is called a scale. It typically appears as a line marked off in miles, kilometers, or other units, showing the corresponding distance on the ground that each unit on the map represents.
The map scale represents the ratio of the map to the real thing. For example, a map scale might say that 1 inch equals 1 mile. That would mean that every inch on the map represents a mile for the real thing.
The scale of an inch on the map represents two miles on the surface of the Earth. If writing this in a fraction form the closest representation of this size scale would be 1:120,000.
1.5 feet
1inch = 7.5 ft 1 7.5 -- = ----- - set up the problem x 12 7.5x = 12 x = 12/7.5 x = 1.6 inches or approximately 1 5/8 inch for the 26 to save time x = 26/7.5 x = 3.4666.... or approximately 3 1/2 inch the scale drawing for the floor is 1 5/8 inches by 3 1/2 inches or 1.6 inch by 3 .466 inches
1/84
One inch on the model represents 72 inches -- or six feet -- on the real McCoy. Since the miniature is two inches long, the actual airplane it represents is 12 feet long.
You cannot. Inch pounds have dimensions [ML] where L represents length and M represents M. By contrast, a kilogram has dimensions [M]. The two have different dimensional units and according to the basic rules of dimensional analysis, any attempt to convert between two units with different dimensions is fundamentally flawed.