The ratio is 300 m2/500 m3 = 0.6 per meter.
(Fascinating factoid: The sphere's radius is 5 m.)
0.4 m-1 is the ration of surface area 588m2 to volume 1372m3 for a sphere.
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.
You measure or calculate the surface area; you measure or calculate the volume and then you divide the first by the second. The surface areas and volumes will, obviously, depend on the shape.
figures with the same volume does not have the same surface area.
The total surface area is 150mm2 and the volume of the cube 125mm3
0.6 is the surface area to volume ratio.
0.6 m-1 is the ratio of surface area to volume for a sphere.
0.5m-1
0.4 m-1 is the ration of surface area 588m2 to volume 1372m3 for a sphere.
It appears to be: 3 to 5
-- 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)
Perhaps if you read the question properly, you would not have to ask the question!
0.4 m-1 (Apex)
The ratio is 1/2 square meter per cubic meter.
It is not possible to have a sphere with a surface are of 300 metres squared and a volume of 500 metres cubed. A surface area of 300 sq metres would imply a volume of 488.6 cubic metres or a shape that is non-spherical!
To find the ratio of surface area to volume for the sphere, we divide the surface area by the volume. Given the surface area is 588 m² and the volume is 1372 m³, the ratio is calculated as follows: ( \frac{588 \text{ m}^2}{1372 \text{ m}^3} \approx 0.429 \text{ m}^{-1} ). Therefore, the ratio of surface area to volume for the sphere is approximately 0.429 m⁻¹.
Yikes! Can you give some measurements? What do you mean by the volume - the volume of the wood used?