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Surface area.
volume increases faster than the surface area.
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.
Its Volume Increases faster than its Surface area.
As the surface to volume ratio increases the rate of in exchange increases too.
As a cell increases in size the volume increases much faster than the surface area. The possible answer is C.
Surface area.
The Volume increases faster than the Surface Area
Yes
Volume
volume increases faster than the surface area.
The volume increases faster. (proportional to the cube of the radius)The surface area increases slower. (proportional to the square of the radius)
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.
If the cell's surface-to-volume ratio got too small as a result of the volume increasing faster than the surface area, the cell would no tbe able to get the nutrients it needs to survive and would die.
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.
Remember that as the diameter of a spherical cell increases, the surface area increases as the square of the diameter, and the volume increases as the cube of the diameter, so volume increases much faster than surface area. The same principle applies for other shapes than spherical cells, but the math is more complicated.
Its Volume Increases faster than its Surface area.