If silver has a density of 9.32 g/cm^3 how do you find the length of one side of an 184 g silver cube

mass = volume x density or

volume = mass/density
You know the mass and density, solve for volume, then volume = (length side)^3,
Plug in the volume, take the cube root, and you have the length of the side.

12

V= m/D

V= 184g/(9.32g/cm^3)

V= 19.7cm^3 (REMEMBER SIG FIGS)

V= ^3√19.7cm^3

V= 2.70cm

To find the length of one side of a silver cube, you can use the formula for calculating the volume of a cube, which is:

Volume = (side length)^3

Since we want to find the length of one side, we can rearrange the formula to solve for it:

side length = cube root of (Volume)

In this case, we know the density of silver is 9.32 g/cm^3, and the mass of the cube is 184 g. We can use this information to calculate the volume of the cube.

Volume = mass / density

Let's plug in the values:

Volume = 184 g / 9.32 g/cm^3

When we divide the mass by the density, the units cancel out, leaving us with the volume in cubic centimeters (cm^3).

Now, to find the length of one side, we can take the cube root of the volume we just calculated:

side length = cube root of (Volume)

Now, let's calculate the side length:

side length = cube root of (184 g / 9.32 g/cm^3)

Using a calculator, you can find the cube root of 184 divided by 9.32. The result will give you the length of one side of the silver cube.