If the sides of a cell doubles, this volume will increase by 8 times.
Here is an explanation:
Say you have a cell with the side dimension equal to n.
The volume of the cube is n3
Double the side lenght to 2n
The volume is now (2n)(2n)(2n) = 8n3
Eightfold page 202 of glencoe science book grade 10
eight
If the sides of a cell doubles, this volume will increase by 8 times. Here is an explanation: Say you have a cell with the side dimension equal to n. The volume of the cube is n3 Double the side lenght to 2n The volume is now (2n)(2n)(2n) = 8n3
It doubles by eight (8), or increases by eight (8).
If you double a 2-inch cube to a four-inch cube, its volume increases from eight cubic inches to 64 cubic inches.
A cube cannot have different length, height and width.
It depends on the shape you are attempting to compute the volume of. If you are attempting to compute the volume of a box (eight sides, each perpendicular), then it is simply length times width times height.
increases by a factor of eight
increases by a factor of eight
As a cell increases in size, its volume increases more rapidly than its surface area. This is because volume increases cubically with size, while surface area only increases squared. This can create challenges for the cell in terms of nutrient exchange and waste removal as the cell grows larger.
Each side would be 10.04645057 cm (to eight decimal places !)
No, it's not that simple. the volume of a box, if let us say (for simplicity's sake) it is cubical in shape, is the length cubed (or if it is rectangular, it is length x width x height). So let us say we have a cubical box 2' on an edge. Its volume is 2x2x2=8 cubic feet. Now let us say that we double the length of an edge. Now we have 4x4x4=64 cubic feet. It has eight times the volume of the smaller box. If we are dealing with a rectangular box rather than a cubical box, the calculations are more complicated, but it remains true that the volume grows much faster than the linear dimensions.
The answer depends on what characteristic of the planets you are interested in: their mass, radius, volume, length of orbit, average distance from the sun, etc.