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What is the ratio of surface area to volume for a sphere with surface area and volume m?
Wiki User
Answered 2015-05-13 14:48:07
If they have the same radius then it is: 3 to 2
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What is the ratio of surface area to volume for a sphere with the following measurements. Surface area equals 300 m2 Volume equals 500 m3?
0.6 m-1 is the ratio of surface area to volume for a sphere.
What is the ratio of surface area to volume for a sphere with the following measurements surface area 300m2 volume 500m3?
0.6 is the surface area to volume ratio.
Why does a sphere have the lowest surface area to volume ratio?
because the surface area is spread out over the volume of mass
What is the ratio of surface area to volume for a sphere with the following measurements surface area 588m2 volume 1372m3?
-- The ratio of 588 to 1,372 is 0.4286 (rounded) -- A sphere with surface area of 588 has volume closer to 1,340.7 . (rounded)
What is the ratio of surface area to volume for a sphere with the Surface area of 300m2 and a volume of 500 m3?
Well, first of all, that's no sphere.-- A sphere with surface area = 300 has volume = 488.6.-- A sphere needs surface area of 304.6 in order to have volume = 500.But this is just a ratio exercise, not a geometry problem, so we'll just use the numbersgiven in the question. It's just some sort of wacky humongous paramecium:Surface area = 300Volume = 500Ratio of (surface area)/(volume) = 300/500 = 0.6 .
How do you find what the ratio of surface area to volume for a sphere is?
1) Calculate the area 2) Calculate the volume 3) Divide the area by the volume to get the ratio
Surface-area-to-volume ratio in nanoparticles?
Surface area to volume ratio in nanoparticles have a significant effect on the nanoparticles properties. Firstly, nanoparticles have a relative larger surface area when compared to the same volume of the material. For example, let us consider a sphere of radius r: The surface area of the sphere will be 4πr2 The volume of the sphere = 4/3(πr3) Therefore the surface area to the volume ratio will be 4πr2/{4/3(πr3)} = 3/r It means that the surface area to volume ration increases with the decrease in radius of the sphere and vice versa.
What is the ratio of surface area to volume for a sphere with the surface area is 432m2 and volume is 864m3?
A sphere can either have a surface area of 432 m2 but not a volume of 864 m3, or it can have a volume of 864 m3 but not a surface area of 432 m2.
What happens to the surface area and volume ratio as the cell decreases in size?
The ratio of surface area to volume increases. The area of a sphere is proportional to its radius squared. Volume is proportional to radius cubed. As the radius increases, the volume increases more than the surface area. As the radius decreases, the volume decreases more than the surface area, so the ratio of surface area to volume increases.
What is the ratio of surface area to volume for a sphere with the following measurements surface area 432m square volume 864m Square?
-- "864m square" is not a volume. "864m cubed" is a volume.-- A sphere can't have those measurements.If it's really a sphere with surface area of 432 m2, then its volume is 844.3 m3.If it's really a sphere with volume 864 m3, then its surface area is 438.7 m2.-- The answer to the question is: The ratio of 432 m2 to 864 m2 is 0.5 .-- If those are really an area and a volume, then the ratio of 432 m2 to 864 m3 is 0.5 per meter.
What is the ratio of surface area to volume for a sphere with the following measurements Surface area equals 588 m2Volume equals 1372 m3?
0.4 m-1 is the ration of surface area 588m2 to volume 1372m3 for a sphere.
What is the ratio of surface area to volume for a sphere when the surface area equals 432m2 and volume equals 864m3?
This is pretty easy, just divide 432 by 864 and you get a 1:2 ratio.
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.
Surface area equals 300 m2 Volume equals 500 m3. What is the ratio of surface area to volume for a sphere with the following measurements?
If the shape is a perfect sphere, then the ratio of surface area to volume will always be: 4πr2 / 4/3πr3 = 3/r If the volume = 500m3, then we can say: 500m3 = 4/3πr3 375m3 = r3 r = 5∛3 m So the ratio of surface area to volume on that sphere would be 3 / (5∛3 m), or: 3∛3/5m
What is the ratio of surface area to the volume of a sphere whose surface area is 588 M2 and volume is 1372 m3?
It appears to be 3 to 7 in its simplest form
Why is a sphere one of the strongest shapes to use in construction?
It has the lowest ratio of surface area to volume.
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 Consider the following geometric solids a sphere with a ratio of surface area to volume equal 0.08m-1 a right circular cirlinder with a ratio of surface area to volume equal 2.1 m-1 APEX?
The rate of diffusion would be faster for the right cylinder (APEX)
Surface area to volume ratio in cells?
if cells surface area is 6 and its volume is 1cm then what is its ratio of surface are volume to volume
What is the surface area of a sphere with a volume of 3500pi?
The surface area of a sphere with a volume of 3500pi is: 2,391 square units.
What is meant by surface area to volume ratio?
where is the answer to what is meant by each of the following terms:cell volume, surface area, ratio of surface area to volume?
What is the ratio of surface area to volume for a sphere with the following measurements surface area equals 432 m2 volume equals 864 m3?
The ratio is 1/2 square meter per cubic meter.
How do you calculate surface area to volume ratio-?
Surface area to volume ratio can be calculated by taking area and dividing by volume.
What is the relationship between surface area and volume as a cell grows?
A cell is roughly spherical in shape and the relationship between surface area and volume is therefore expressed by:-The volume of a sphere of radius R is (4/3)*Pi*R3.The surface area of a sphere of radius R is 4*Pi*R2The surface area to volume ratio is therefore 3/RAs the radius R gets bigger the ratio gets smaller.
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