Define h = height w = width d = depth Then, the surface area is 2hw+2hd+2wd.
A cube with a face diagonal of 25cm has a surface area of 1875cm2
If a sphere and a cube have the same volume, the sphere will have a larger surface area. This is because the sphere has the smallest surface area to volume ratio of any geometric shape, resulting in a larger surface area for a given volume compared to other shapes like cubes. The surface area of a sphere is given by the formula 4πr^2, where r is the radius of the sphere, while the surface area of a cube is given by 6s^2, where s is the length of one side of the cube.
The volume of this cube is: 1.728m3
The volume is 64 cubic cm
24 cm2
Surface area if a cube with six sides can be calculated by finding the surface area of one side and then multiplying the result by 6.
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.
The surface area of a cube can be calculated by finding the area of each of the cube's six square faces and adding them together. Since all sides of a cube are equal, the area of one face is the side length squared. Therefore, the surface area of a cube with a side length of 8mm is 6 times 8mm squared, which equals 384 square millimeters.
Total surface area of a cube = 6*area of cube face = 6*cube side*cube side
Zero. A cube does not have a curved surface area.
The surface area of a 0.5cm cube is 1.5cm2
The surface area of a 1mm cube is 6mm2
The surface area of a cube can be calculated using the formula (6s^2), where (s) is the length of a side. For a cube with a side length of 4 meters, the calculation is (6 \times (4^2) = 6 \times 16 = 96) square meters. Therefore, the surface area of the cube is 96 m².
The area of a cube typically refers to its surface area. For a cube with a side length of 3 cm, the surface area can be calculated using the formula (6a^2), where (a) is the length of a side. Thus, the surface area is (6 \times (3 , \text{cm})^2 = 6 \times 9 , \text{cm}^2 = 54 , \text{cm}^2). Therefore, the surface area of the 3 cm cube is 54 cm².
A 3 cm cube has a greater surface area compared to smaller cubes because surface area increases with the square of the side length. The surface area of a cube is calculated using the formula (6a^2), where (a) is the length of one side. For a 3 cm cube, this results in a surface area of (54 , \text{cm}^2). In general, larger cubes will always have a greater surface area than smaller ones, assuming they are solid and perfectly cubic in shape.
If a is the side,lateral surface area of cube=4a2
Surface area also decreases