If by s and v you mean surface area and volume, then SA=6x^2 and V=x^3 where x is the length of a side.
500 cm ^1/3 = 7.937 cm
The volume of a cube is (length of side)3.
To calculate the enlargement of a cube, you first determine the scale factor by which the cube's dimensions are increased. If the original side length is ( s ) and the new side length after enlargement is ( s' ), the scale factor ( k ) is given by ( k = \frac{s'}{s} ). The volume of the original cube is ( V = s^3 ), and the volume of the enlarged cube is ( V' = (s')^3 ), which can also be expressed as ( V' = k^3 \times V ). Thus, the volume increase can be determined by cubing the scale factor.
The answer depends on what information you have about the cube. If, for example, you know the volume, V, then the surface area is 6*cuberoot(V)^2. If you have the lengths of an edge, s, then it is 6*s^2.
To find the volume of a cube, you use the formula ( V = s^3 ), where ( s ) is the length of a side. In this case, with each side measuring 3 units, the volume would be ( V = 3^3 = 27 ) cubic units. Therefore, the volume of the cube is 27 cubic units.
To find the length of an edge of a cube given its volume, you can use the formula for the volume of a cube: ( V = s^3 ), where ( s ) is the length of an edge. Given the volume ( V = 3375 ) cubic inches, you can find ( s ) by taking the cube root: ( s = \sqrt[3]{3375} ). This calculates to ( s = 15 ) inches. Thus, the length of an edge of the cube is 15 inches.
The volume of a cube is calculated using the formula V = s^3, where s represents the length of one side of the cube. In this case, the length of the cube is 4 inches. Therefore, the volume of the cube would be V = 4^3 = 64 cubic inches.
500 cm ^1/3 = 7.937 cm
The volume of a cube is (length of side)3.
To calculate the enlargement of a cube, you first determine the scale factor by which the cube's dimensions are increased. If the original side length is ( s ) and the new side length after enlargement is ( s' ), the scale factor ( k ) is given by ( k = \frac{s'}{s} ). The volume of the original cube is ( V = s^3 ), and the volume of the enlarged cube is ( V' = (s')^3 ), which can also be expressed as ( V' = k^3 \times V ). Thus, the volume increase can be determined by cubing the scale factor.
it's V=LxWxH (volume is equal to length times width times height)
The volume of a cube is a side cubed. V=S3 So, to find the length of a side, solve for S, to find that the side equals the cube root of the volume. Ex: Volume=8 cubic meters Then 8=S3, therefore s=2 meters.
The answer depends on what information you have about the cube. If, for example, you know the volume, V, then the surface area is 6*cuberoot(V)^2. If you have the lengths of an edge, s, then it is 6*s^2.
To find the volume of a cube, you use the formula ( V = s^3 ), where ( s ) is the length of a side. In this case, with each side measuring 3 units, the volume would be ( V = 3^3 = 27 ) cubic units. Therefore, the volume of the cube is 27 cubic units.
To find the volume of a cube V = s^3. Therefore a cube with a side of 8 inches is calculated like 8 x 8 x 8 which equals 512.
Ah, the 's' in V equals s cubed stands for the side length of a cube. When we say V equals s cubed, we're talking about the volume of a cube, which is calculated by multiplying the side length by itself three times. It's a beautiful way to express the relationship between the volume and the side length of a cube.
Where v=s^3, for this cube, v=(7cm)^3=343cm^3. -343 cubic centimeters.