Use the scales and scale drawings to approximate the actual length of the wingspan of the plane, to the nearest foot.

Use the scales and scale drawings to approximate the actual length of the height of the plane, to the nearest foot.

Use the scales and scale drawings to approximate the actual length of the length of the Lysander Mk. I, to the nearest meter.

A blueprint for a building includes a rectangular room that measures 3 inches long and 5.5 inches wide. The scale for the blueprint says that 1 inch on the blueprint is equivalent to 10 feet in the actual building. [br]What are the dimensions of this rectangular room in the actual building?

The scale is shown in the lower left corner. Find the actual side lengths of Lafayette Square in feet.

Use the inch ruler to measure the line segment of the graphic scale. About how many feet does one inch represent on this map?

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[/img][br]How many times larger is the area of of the scaled copy compared to that of Triangle A?

What scale factor did Lin apply to the Triangle A to create the copy?

What is the length of bottom side of the scaled copy?