Mrs Nelson has a rectangular flower box that is 5 feet long and 2 feet tall. She wants the width of the box to be no more than 5 feet. If the width is a whole number, what are the possible volumes for the flower box?

10,20,30,40,50

I NEED the answer

Any help?

10,20,30,40,50.

Kaka

To find the possible volumes of the flower box, we need to find the range of possible widths and then calculate the volume for each width.

Given:
Length = 5 feet
Height = 2 feet
Maximum Width = 5 feet

1) Find the range of possible widths:
Since the width cannot be more than 5 feet, the possible widths are whole numbers from 1 to 5.

2) Calculate the volume for each width:
The volume of a rectangular box is given by the formula Volume = Length × Width × Height.

Let's calculate the volume for each width:
For width = 1 foot:
Volume = 5 feet × 1 foot × 2 feet = 10 cubic feet

For width = 2 feet:
Volume = 5 feet × 2 feet × 2 feet = 20 cubic feet

For width = 3 feet:
Volume = 5 feet × 3 feet × 2 feet = 30 cubic feet

For width = 4 feet:
Volume = 5 feet × 4 feet × 2 feet = 40 cubic feet

For width = 5 feet:
Volume = 5 feet × 5 feet × 2 feet = 50 cubic feet

Therefore, the possible volumes for Mrs. Nelson's flower box are:
10 cubic feet, 20 cubic feet, 30 cubic feet, 40 cubic feet, and 50 cubic feet.