It has no volume because it's a 2D shape but its surface area is:-
length*perpendicular height
Surface Area: 2πr2 + 2πrh Volume: πr2h
to obtain the ratio of surface area to volume, divide the surface area by the volume.
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.
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.
rectangle and octahedron
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: 2πr2 + 2πrh Volume: πr2h
to obtain the ratio of surface area to volume, divide the surface area by the volume.
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.
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.
The Surface area of a triangle = 0.5*base*height The volume of a prism = area of its cross-section*length
Write a c program to compute the surface area and volume of a cube
1) Calculate the area 2) Calculate the volume 3) Divide the area by the volume to get the ratio
rectangle and octahedron
To tackle this you first need to know the equations for both volume and surface area. The surface area of a cube is 6x2 where x is the side length. The volume of the cube is x3. Thus x is the cube root of the volume. We can substitute this in to the surface area equation and say that the surface area of a cube is 6volume2/3 This can also be rearranged to say that the volume of the cube is (the surface area/6)1.5
To find the ratio of surface area to volume, you can use the formula: Ratio = Surface Area / Volume. In this case, the ratio would be 300 m² / 500 m³, which simplifies to 0.6 m⁻¹. This means the surface area is 0.6 square meters for every cubic meter of volume.
Make the height the subject of the fornula for the volume or surface area of the cylinder