you multiply all numbers you see. If triangle you multiply all numbers then divide it by three
3:5
1mm cube has volume of 1mm3 and a surface area of 6*(1*1) = 6mm²2mm cube has a volume of 8mm3 and a surface area of 6(2*2)=24mm²Ratio for 1mm cube is 6-1 and ratio for 2mm cube is 3-1 ■
The ratio of the surface area of a cube to its volume is inversely proportional to the length of its side.
To find the volume of the smaller cube, we can use the ratio of the volumes of the two cubes. Given that the volume of the larger cube is 250 and the ratio of the volumes is 2:5, we can set up the equation ( \frac{V_{\text{smaller}}}{250} = \frac{2}{5} ). Solving for ( V_{\text{smaller}} ), we get ( V_{\text{smaller}} = 250 \times \frac{2}{5} = 100 ). Therefore, the volume of the smaller cube is 100.
The sides (linear dimensions) of the cubes are in the ratio of 0.6 .
63 = 216 and 143 = 2744 6:14 = 3:7
3:5
1mm cube has volume of 1mm3 and a surface area of 6*(1*1) = 6mm²2mm cube has a volume of 8mm3 and a surface area of 6(2*2)=24mm²Ratio for 1mm cube is 6-1 and ratio for 2mm cube is 3-1 ■
The ratio of the surface area of a cube to its volume is inversely proportional to the length of its side.
To find the volume of the smaller cube, we can use the ratio of the volumes of the two cubes. Given that the volume of the larger cube is 250 and the ratio of the volumes is 2:5, we can set up the equation ( \frac{V_{\text{smaller}}}{250} = \frac{2}{5} ). Solving for ( V_{\text{smaller}} ), we get ( V_{\text{smaller}} = 250 \times \frac{2}{5} = 100 ). Therefore, the volume of the smaller cube is 100.
The sides (linear dimensions) of the cubes are in the ratio of 0.6 .
The surface-area-to-volume ratio also called the surface-to-volume ratio and variously denoted sa/volor SA:V, is the amount of surface area per unit volume of an object or collection of objects. The surface-area-to-volume ratio is measured in units of inverse distance. A cube with sides of length a will have a surface area of 6a2 and a volume of a3. The surface to volume ratio for a cube is thus shown as .For a given shape, SA:V is inversely proportional to size. A cube 2 m on a side has a ratio of 3 m−1, half that of a cube 1 m on a side. On the converse, preserving SA:V as size increases requires changing to a less compact shape.
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.
No. The surface to volume ratio of a sphere is always smaller than that of a cube. This is because the sphere has the smallest surface area compared to its volume, while the cube has the largest surface area compared to its volume.
It is 10 : 3.
It is 10 : 3.
Find the cube root of the volume. Volume of a cube = length of side^3 therefore length of side = volume^(1/3)