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What it's the for surface area to volume ratio of a cube?
The surface area to volume ratio of a cube is calculated by dividing its surface area by its volume. For a cube with side length ( s ), the surface area is ( 6s^2 ) and the volume is ( s^3 ). Thus, the surface area to volume ratio is ( \frac{6s^2}{s^3} = \frac{6}{s} ). This means that as the side length of the cube increases, the surface area to volume ratio decreases.
What is the relationship between cube size and surface area-to-volume ratio?
The ratio of the surface area of a cube to its volume is inversely proportional to the length of its side.
What is the unit for surface area to volume ratio?
1/length
If the length side of a cube is increased the surface areea to volume ratio of the cube?
When the side length of a cube is increased, the surface area increases at a different rate compared to the volume. The surface area of a cube is given by (6a^2) and the volume by (a^3), where (a) is the length of a side. As the side length increases, the surface area-to-volume ratio decreases, meaning that larger cubes have a lower ratio compared to smaller cubes. This reflects that while more surface area is created, the volume increases even more significantly.
How can you obtain a cell's ratio of surface area to volume?
To obtain the ratio of surface area to volume, divide the surface area by the volume.
What it's the for surface area to volume ratio of a cube?
The surface area to volume ratio of a cube is calculated by dividing its surface area by its volume. For a cube with side length ( s ), the surface area is ( 6s^2 ) and the volume is ( s^3 ). Thus, the surface area to volume ratio is ( \frac{6s^2}{s^3} = \frac{6}{s} ). This means that as the side length of the cube increases, the surface area to volume ratio decreases.
What is the relationship between cube size and surface area-to-volume ratio?
The ratio of the surface area of a cube to its volume is inversely proportional to the length of its side.
What is the unit for surface area to volume ratio?
1/length
Describe what happens to the surface area to volume ratio for larger and larger cubes?
For a cube with edge length, L. Surface area = 6L2. Volume = L3. So ratio of Surface Area / Volume = 6 / L. Therefore, as the side length, L, increases, the ratio will decrease.
If the length side of a cube is increased the surface areea to volume ratio of the cube?
When the side length of a cube is increased, the surface area increases at a different rate compared to the volume. The surface area of a cube is given by (6a^2) and the volume by (a^3), where (a) is the length of a side. As the side length increases, the surface area-to-volume ratio decreases, meaning that larger cubes have a lower ratio compared to smaller cubes. This reflects that while more surface area is created, the volume increases even more significantly.
How can you obtain a cell's ratio of surface area to volume?
To obtain the ratio of surface area to volume, divide the surface area by the volume.
How do you calculate the surface-area-to-volume-ratio?
The surface-area-to-volume ratio may be calculated as follows: -- Find the surface area of the shape. -- Find the volume of the shape. -- Divide the surface area by the volume. The quotient is the surface-area-to-volume ratio.
What is the ratio of surface area if the surface area is 588 and the volume is 1372?
To find the ratio of surface area to volume, we divide the surface area by the volume. Given a surface area of 588 and a volume of 1372, the ratio is ( \frac{588}{1372} ), which simplifies to approximately 0.429. Thus, the ratio of surface area to volume is about 0.429:1.
When the volume of a cube increases does the ratio of its surface area to its volume decrease?
If the length of the cube's side is 'S', then the surface area is 6S2 and the volume is S3 .The ratio of surface area to volume is 6S2/S3 = 6/S .This number is inversely proportional to 'S'. So as the side increases ...causing the volume to increase ... the ratio does decrease, yes.
What is the ratio of surface area 300 square and volume 500 cube?
The ratio is 0.6 per unit of length.
How can you find a cell's survace area to volume ratio?
to obtain the ratio of surface area to volume, divide the surface area by the volume.
What is the ratio of surface area to volume for a sphere with following measurements surface area 588 And volume 1372?
To find the ratio of surface area to volume for the sphere, you divide the surface area by the volume. Given that the surface area is 588 and the volume is 1372, the ratio is ( \frac{588}{1372} \approx 0.428 ). Thus, the ratio of surface area to volume for the sphere is approximately 0.428.
