the volume of a right rectangular prism is 36 cubic units. list at least 3 possible lengths widths and heights that this shape could have

W*L*H=36

1*1*36=36

To find at least three possible lengths, widths, and heights of a right rectangular prism with a volume of 36 cubic units, we need to consider all the factors of 36.

The factors of 36 are: 1, 2, 3, 4, 6, 9, 12, 18, and 36.

Here are three possible combinations of dimensions that could result in a volume of 36 cubic units:

1) Length = 6 units, Width = 6 units, Height = 1 unit
2) Length = 12 units, Width = 2 units, Height = 3 units
3) Length = 9 units, Width = 2 units, Height = 2 units

These are just a few possible combinations, and there are many more.

To find the possible lengths, widths, and heights of a right rectangular prism with a volume of 36 cubic units, we can use trial and error or mathematical calculations.

One way to approach this is to find all the possible integer dimensions of the prism that multiply to 36:

1. Length = 1 unit, Width = 1 unit, Height = 36 units
The volume = Length * Width * Height = 1 * 1 * 36 = 36 cubic units

2. Length = 2 units, Width = 2 units, Height = 9 units
The volume = Length * Width * Height = 2 * 2 * 9 = 36 cubic units

3. Length = 3 units, Width = 3 units, Height = 4 units
The volume = Length * Width * Height = 3 * 3 * 4 = 36 cubic units

These are just three possible combinations, and there may be more. By finding all the possible factors of 36 and trying different combinations, you can find additional lengths, widths, and heights that satisfy the given volume.

In summary, some possible combinations of lengths, widths, and heights for a right rectangular prism with a volume of 36 cubic units are:
- (1 unit, 1 unit, 36 units)
- (2 units, 2 units, 9 units)
- (3 units, 3 units, 4 units)