It depends on the unit. You could, for example, measure a prism in cubic metres, cubic centimetres, cubic nanometres.
If you mean one aestronomical unit one astronomical unit (AU) , the answer is 150,000,000,000 meters.
The answer depends on the scale: it could be millilitres, or litres, or cubic metres, or cubic kilometres.
None. A byte is a unit of storage (in this case), hertz is a unit of frequency.
A kilometre is a unit of distance. An hour is a unit of time. Without a unit of speed to compare, the two units are incompatible.
A minute is a unit of time. A mile is a unit of distance. Without some unit to convert, such as speed, the two units are incompatible.
The answer depends on how large the prism is.
To find the number of unit cubes in a rectangular prism, multiply its length, width, and height. Each dimension of the prism should be measured in the same unit as the unit cube. The formula is: Number of unit cubes = length × width × height. For example, a prism measuring 4 units long, 3 units wide, and 2 units high contains 24 unit cubes (4 × 3 × 2 = 24).
48 unit cubes
A prism with an n-sided base will have 2n vertices, n + 2 faces, and 3n edges. All rectangular prisms have six faces.
Three.
No, you need three measurements to measure a rectangular prism.
To find the dimensions of the new right rectangular prism with Y fewer unit cubes than the original prism, first determine the volume of the original prism, which is the product of its length, width, and height (V = l × w × h). Subtract Y from this volume to get the new volume (V' = V - Y). The new prism can have various dimensions that multiply to this new volume, depending on how you choose to adjust the length, width, or height while maintaining the rectangular shape. Specific dimensions will depend on the original dimensions and the value of Y.
Without cutting the cubes and using all of them 2 different oblongs can be made: 1 by 6 and 2 by 3.
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.
volume
The answer is 3.
To determine how many rectangular prisms can be formed with 20 unit cubes, we need to find the dimensions (length, width, height) that multiply to 20. The factors of 20 that can create rectangular prisms include combinations like (1, 1, 20), (1, 2, 10), (1, 4, 5), (2, 2, 5), and their permutations. Counting distinct combinations while considering the order of dimensions, there are a total of 9 unique rectangular prism configurations.