Volume and surface area can never be the same because volume is a measure in 3-dimensional space whereas area is a measure in 2-dimensional space. The dimensions are different and so equality is not possible.
Volume and surface area can never be the same because volume is a measure in 3-dimensional space whereas area is a measure in 2-dimensional space. The dimensions are different and so equality is not possible.
Volume and surface area can never be the same because volume is a measure in 3-dimensional space whereas area is a measure in 2-dimensional space. The dimensions are different and so equality is not possible.
Volume and surface area can never be the same because volume is a measure in 3-dimensional space whereas area is a measure in 2-dimensional space. The dimensions are different and so equality is not possible.
There is no reason for the surface area to remain the same even if the volume is the same.
no
yes.
To obtain the ratio of surface area to volume, divide the surface area by the volume.
surface area/ volume. wider range of surface area to volume is better for cells.
There is no reason for the surface area to remain the same even if the volume is the same.
figures with the same volume does not have the same surface area.
Yes, they can. They can also have the same surface area, but different volume.
Yes Volume: Is the amount it takes to build it. Surface Area: Is how much is on the surface.
If they have the same radius then it is: 3 to 2
No, rectangular prisms with the same volume do not necessarily have the same surface area. The surface area depends on the dimensions of the prism, which can vary even if the volume remains constant. For example, a long, thin prism and a short, wide prism can both have the same volume but different surface areas. Thus, while volume is a fixed quantity, surface area can differ based on the specific dimensions used.
no
The Volume increases faster than the Surface Area
Yes, they can. They can also have the same surface area, but different volume.
It decreases. As the dimensions increase by a number, the surface area increases by the same number to the power of 2, but the volume increases by the same number to the power of 3, meaning that the volume increases faster than the surface area.
yes.
To obtain the ratio of surface area to volume, divide the surface area by the volume.