There are infinitely many rectangular prisms with a volume of 24 cm3.
Consider the following rectangular prims, with length, bredth and heights in cms:
(1,1,24), (1,10,2.4), (1,100,0.24), (1,1000,0.024), etc
and
(10,10,0.24), (10,100,0.024) and higher multiples of 10.
You could go through multiples of 2,3,4,5 etc.
and multiples of Irrational Numbers: (pi, 2*pi,12/pi2), for example.
Only one.
2 cm x 4 cm x 3 cm = 24cm3
3
Oh, what a happy little question! With 18 unit cubes, you can create different rectangular prisms by arranging the cubes in various ways. Remember to explore different combinations and see how many unique rectangular prisms you can discover. Just have fun and let your imagination guide you on this creative journey!
Volume of a rectangular prism = lenght*width*height. So 8 * 3 * 10 = 240 cm3
Only one.
No, rectangular prisms are 3 dimensional and rectangles are only 2 dimensional.
Density = Mass/Volume = 112/24 gcm-3 = 4.667 gcm-3
a box, a computer, and a speaker
5
If the ratio of the dimensions of the larger prism to the smaller prism is r then the ratio of their volumes is r^3.
All prisms have at least 3. They all have 2 identical polygonal faces which are linked by as many rectangular faces as they have edges.
They are cuboids - brick shaped objects. It has six rectangular faces and these come in 3 parallel and congruent pairs.
In exercises 3-4, the rectangular prisms demonstrate a specific relationship in their dimensions, such as having the same volume or surface area. A different rectangular prism can maintain this relationship by adjusting its dimensions proportionally. For example, if one prism has dimensions of 2 cm, 3 cm, and 4 cm (volume of 24 cm³), another prism could have dimensions of 3 cm, 2 cm, and 4 cm, also resulting in the same volume but in a different configuration. This illustrates that various combinations of dimensions can yield the same volumetric relationship.
2 cm x 4 cm x 3 cm = 24cm3
3
64 (16*24*12)/(6*4*3)=64