In a diagram of a landscape plan, the scale is 1 cm=10 ft. In the diagram, the trees are 3.7 cm apart. How far apart should the actual trees be planted?
First, we need to convert the scale from centimeters to feet. One centimeter is equal to 10 feet, so the scale is actually 1 cm = 10ft x (1/12) = 0.8333 ft.
To find out how far apart the actual trees should be planted, we can use the ratio of the distances on the diagram and in real life:
(3.7 cm) x (0.8333 ft/cm) = 3.083 ft
Therefore, the actual trees should be planted 3.083 feet apart.
To determine how far apart the actual trees should be planted, we need to convert the distance on the diagram to the corresponding distance in real life.
Given:
- Scale: 1 cm = 10 ft
- Distance between trees on the diagram: 3.7 cm
To calculate the actual distance between the trees, we'll use the conversion factor from the scale.
Step 1: Convert the distance on the diagram to feet
3.7 cm x 10 ft/1 cm = 37 ft
Therefore, the trees should be planted 37 feet apart in real life.