You can create five distinct rectangular prisms using 6 unit cubes. The possible dimensions are 1x1x6, 1x2x3, and their permutations, leading to the following combinations: 1x1x6, 1x2x3, and 2x3x1. Each combination can be arranged in different orientations, but the unique shapes remain limited to these configurations.
Four.
Three.
There are only four different configurations.
Ignoring rotations, there are 3 distinct solutions.
4
Four.
Three.
2 prisms
There are only four different configurations.
Well, honey, if the height is 4 cubes, that leaves you with 12 cubes to work with for the base. You can arrange those 12 cubes in various ways to form different rectangular prisms. So, technically speaking, there are multiple rectangular prisms you can create with 48 cubes and a height of 4 cubes.
Just one, although the orientation of the prism might vary.
6 i think
Ignoring rotations, there are 3 distinct solutions.
3
4
To determine how many rectangular prisms can be formed from 12 unit cubes, we must consider the possible dimensions (length, width, height) that multiply to 12. The factors of 12 give us several combinations, such as 1x1x12, 1x2x6, 1x3x4, and 2x2x3. Therefore, there are multiple distinct rectangular prisms that can be created using 12 unit cubes, depending on how we group the cubes into different dimensions.
To determine how many rectangular prisms can be made with 4 unit cubes, we need to consider the possible dimensions. The dimensions must be whole numbers that multiply to 4. The valid combinations are (1, 1, 4), (1, 2, 2), and their permutations. Thus, there are a total of 3 distinct rectangular prisms: one with dimensions 1x1x4, and one with dimensions 1x2x2.