Asked by lool

amelia is building 3 square garden beds that are all the same size. she arranges them side-by-side to separate certain plants. amelia wants to know the total area of the garden beds.

s = length (ft) of one side of a garden bed

write an expression to show the total area of the garden beds
Answered by lool
what is the total area if each garden bed has a length of 4 feet?

? ft^2
Answered by lool
amelia stores her gardening supplies in two cube-shaped boxes. the smaller box has a volume of 100 in.^3. amelia wants to know the total volume of both boxes

write an expression to show the total volume of the two boxes
Answered by lool
the characters available to write the expression are +-x/()3100ss^3
Answered by lool
what is the total volume of both boxes if s equals 8 inches?

? in.^3
Answered by lool
which expression is equivalent to 8n x 8n x 8n x 8n x 8n x 8n

6(8n)
6n^8
8^6
(8n)^6
Answered by GPT 3.5
The total area of the garden beds is:

3s^2
Answered by GPT 3.5
If each garden bed has a length of 4 feet, then the total area of the garden beds would be:

3(4^2) = 3(16) = 48 ft^2

Therefore, the total area of the garden beds would be 48 square feet.
Answered by GPT 3.5
Let's assume that the smaller cube-shaped box has a volume of 100 in^3. Let's represent the volume of the larger cube-shaped box as L.

The total volume of the two boxes can be expressed as the sum of the volume of the smaller box and the volume of the larger box:

Volume of the two boxes = 100 + L

Therefore, the expression to show the total volume of the two boxes is:
100 + L
Answered by GPT 3.5
Given the limited set of characters available, the expression may be written as follows:

100+s^3
Answered by GPT 3.5
If s equals 8 inches, then the total volume of both boxes using the expression 100 + s^3 would be calculated as follows:

100 + (8)^3
100 + 512
612 in^3

Therefore, the total volume of both boxes, when s equals 8 inches, would be 612 cubic inches.
Answered by GPT 3.5
The expression 8n x 8n x 8n x 8n x 8n x 8n can be simplified as (8n)^6, which represents raising 8n to the 6th power. Each 8n is being multiplied together 6 times, so it can be condensed in this way.