Surface area.
True. As a cell grows in size, its volume increases faster than its surface area. This is because volume increases cubically with the size of the cell (length x width x height), while surface area increases squared with the size of the cell (length x width). This can lead to issues with nutrient exchange and waste removal if the cell becomes too large.
As cell size increases, the volume of the cell increases more quickly than the surface area. This is because volume increases cubically (length × width × height), while surface area increases squared (length × width). This can lead to challenges in nutrient and waste exchange for larger cells, as the surface area may not be sufficient to support the increased volume.
The volume of a cell grows more rapidly than its surface area. This is because volume increases with the cube of the cell's size, while surface area increases with the square of the cell's size. This has implications for processes like nutrient exchange, as a larger cell may struggle to adequately supply its interior with nutrients and remove waste.
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
Its Volume Increases faster than its Surface area.
Yes, as cell surface area increases, the cell volume increases at a faster rate. This is because the surface area to volume ratio decreases as the cell grows larger, which can affect the efficiency of nutrient uptake and waste removal within the cell.
If the sides of a cell double in length, its volume increases by a factor of 8 (2 cubed). This is because volume is calculated by length x width x height, so if all dimensions are doubled, the volume increases proportionally.
True. As a cell grows in size, its volume increases faster than its surface area. This is because volume increases cubically with the size of the cell (length x width x height), while surface area increases squared with the size of the cell (length x width). This can lead to issues with nutrient exchange and waste removal if the cell becomes too large.
The Volume increases faster than the Surface Area
As a cell grows, its volume increases faster than its surface area. This is because volume increases cubically with size, while surface area only increases quadratically. This can lead to challenges in nutrient exchange and waste removal for larger cells.
As cell size increases, the volume of the cell increases more quickly than the surface area. This is because volume increases cubically (length × width × height), while surface area increases squared (length × width). This can lead to challenges in nutrient and waste exchange for larger cells, as the surface area may not be sufficient to support the increased volume.
As a cell increases in size the volume increases much faster than the surface area. The possible answer is C.
The rate at which the cell increases in size depends on the DNA. The ratio of the surface area (calculated: length x width x # of sides) is divided by the cell volume (calculated: length x width x height). THE VOLUME OF THE CELL INCREASES MORE RAPIDLY THAN THE SURFACE AREA, CAUSING THE RATIO OF SURFACE AREA OVER VOLUME TO DECREASE. This decrease causes cell malfunction. If the cell volume increases too much, then the ratio will decrease causing problems for the cell's regular functions.
The rate at which the cell increases in size depends on the DNA. The ratio of the surface area (calculated: length x width x # of sides) is divided by the cell volume (calculated: length x width x height). THE VOLUME OF THE CELL INCREASES MORE RAPIDLY THAN THE SURFACE AREA, CAUSING THE RATIO OF SURFACE AREA OVER VOLUME TO DECREASE. This decrease causes cell malfunction. If the cell volume increases too much, then the ratio will decrease causing problems for the cell's regular functions.
The rate at which the cell increases in size depends on the DNA. The ratio of the surface area (calculated: length x width x # of sides) is divided by the cell volume (calculated: length x width x height). THE VOLUME OF THE CELL INCREASES MORE RAPIDLY THAN THE SURFACE AREA, CAUSING THE RATIO OF SURFACE AREA OVER VOLUME TO DECREASE. This decrease causes cell malfunction. If the cell volume increases too much, then the ratio will decrease causing problems for the cell's regular functions.
The volume of a cell grows more rapidly than its surface area. This is because volume increases with the cube of the cell's size, while surface area increases with the square of the cell's size. This has implications for processes like nutrient exchange, as a larger cell may struggle to adequately supply its interior with nutrients and remove waste.
As the cell gets bigger, the surface to volume ratio gets smaller.