A delivery truck service needs to transport 75 boxes. The boxes are all cubes with a side length of 18 in. How much space will the service need to transport the boxes? Use the formula for the volume of a cube.
The formula for the volume of a cube is V = s^3, where V is the volume and s is the length of one side.
In this case, the length of one side (s) is 18 inches, so we can plug that into the formula:
V = 18^3
V = 5,832 cubic inches
So each box has a volume of 5,832 cubic inches. To find the total space needed to transport 75 boxes, we can multiply that volume by the number of boxes:
Total space needed = 75 boxes x 5,832 cubic inches per box
Total space needed = 437,400 cubic inches
Therefore, the delivery truck service will need at least 437,400 cubic inches of space to transport all 75 boxes.
To find the volume of a cube, you need to use the formula V = s^3, where V is the volume and s is the side length. In this case, the side length of each box is 18 inches.
So, the volume of each box is V = 18^3 = 5832 cubic inches.
Since there are 75 boxes, you can find the total volume by multiplying the volume of one box by the number of boxes:
Total volume = 5832 cubic inches/box * 75 boxes = 437,400 cubic inches.
Therefore, the delivery service will need 437,400 cubic inches of space to transport all the boxes.
To find the volume of a cube, we use the formula V = side length^3.
In this case, the side length of each box is given as 18 inches.
So, to find the volume of one box, we substitute the value of the side length into the formula: V = 18^3.
Calculating this, we get V = 18 * 18 * 18 = 5832 cubic inches.
Since the delivery service needs to transport 75 boxes, we can multiply the volume of one box by the number of boxes to find the total volume required: 5832 * 75 = 437,400 cubic inches.
Therefore, the delivery service will need 437,400 cubic inches of space to transport the 75 boxes.