Each side of the cube measures 2 cm,and the mass of the cube is 32g.what is the density of the cube?
Density is equal to mass divided by volume.
To find volume, multiply the length, width, and height. This applies for any rectangular prism. In the case of a cube, all sides are the same, so multiply 2*2*2 or 2^3. You'll get 8 cm^3.
D = m/V, so D = 32/8 = 4 g/cm^3. :)
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To find the density of the cube, we need to know the formula for density, which is:
Density = Mass / Volume
We are given the mass of the cube (32 g), but we need to calculate the volume first.
The volume of a cube can be found by cubing the length of its sides. In this case, each side measures 2 cm, so the volume would be:
Volume = (2 cm)^3 = 2 cm × 2 cm × 2 cm = 8 cm^3
Now we can plug the values into the formula for density:
Density = Mass / Volume
= 32 g / 8 cm^3
The resulting units would be g/cm^3, which is the standard unit for density.
Therefore, the density of the cube is 4 g/cm^3.
To find the density of the cube, you need to use the formula for density:
Density = Mass/Volume
First, let's find the volume of the cube. Since each side of the cube measures 2 cm, the volume can be calculated by cubing the length of one side:
Volume = (Length of one side)^3 = 2^3 = 8 cm^3
Next, we divide the mass of the cube by its volume:
Density = Mass/Volume = 32g / 8 cm^3
The density of the cube is 4 g/cm^3.
In summary, the density of the cube is obtained by dividing the mass of the cube by its volume, which is determined by cubing the length of one side of the cube.