answersLogoWhite

0

They would have to have the same base area, if that's what you mean.

User Avatar

Wiki User

15y ago

What else can I help you with?

Related Questions

Can rectangular prisms have different heights and the same volume?

Yes, rectangular prisms can have different heights and still possess the same volume. The volume of a rectangular prism is calculated by multiplying its length, width, and height (Volume = length × width × height). As long as the product of the length and width adjusts accordingly to compensate for the difference in height, the overall volume can remain constant across different configurations.


Is it possible for two rectangular prisms to have the same volume but not the same measurements?

Two different rectangular prisms can both have the same volume of 72 cm3


How many different rectangular prisms can you make with the volume of 24cm?

4


How many different rectangular prisms can you make with a volume of 36 cubic units?

9


How many different rectangular prisms can you make with a volume of 18 cubic units?

There are 4 of them.


Can two rectangular prisms have the same surface area but different volume?

Yes, they can. They can also have the same surface area, but different volume.


Who created formula for volume of rectangular prisms?

i did


What is volume when speaking about rectangular prisms?

The volume of a rectangular prism is its cross-section area times its length.


How many different rectangular prisms can you make with volume cm sketch and label each prism you find?

4


How many different rectangular prisms with a volume of 11cm3 can you build with centimetre cubes?

Only one.


How can two rectangular prisms have the same surface area but different volumes?

Yes, they can. They can also have the same surface area, but different volume.


How many different prisms can you make with volume 24 cm2?

To determine how many different prisms can be made with a volume of 24 cm³, we need to consider the base area and height of the prism. The volume ( V ) of a prism is given by the formula ( V = \text{Base Area} \times \text{Height} ). Since the volume is fixed at 24 cm³, various combinations of base areas and heights can yield different prism shapes, depending on the base shape (triangular, rectangular, etc.). The specific number of different prisms depends on the choices of base shape and dimensions, making it difficult to provide an exact count without additional constraints.