965 g is a measure of mass, and 50 cm is a measure of length. They are two different physical quantities and cannot be directly converted into each other.
The density of the gold nugget is 19.3 g/cm^3. This was calculated by dividing the mass (965 g) by the volume (50 cm^3).
The density of the object is 3.68 g/cm³. Density is calculated by dividing the mass of the object by its volume. In this case, 184 g ÷ 50 cm³ = 3.68 g/cm³.
The density of the object is 0.2 g/cm^3. This is calculated by dividing the mass (10g) by the volume (50 cm^3).
To calculate density, you divide the mass by the volume. In this case, the density would be 2.7 g/cm³ (135g / 50 cm³).
The density of the object is 6 g/cm³. Density = mass/volume, mass is 300 g, volume is length x width x height = 10 cm x 5 cm x 2 cm = 100 cm³. Density = 300 g / 100 cm³ = 3 g/cm³.
The density of the gold nugget is 19.3 g/cm^3. This was calculated by dividing the mass (965 g) by the volume (50 cm^3).
The density of the object is 3.68 g/cm³. Density is calculated by dividing the mass of the object by its volume. In this case, 184 g ÷ 50 cm³ = 3.68 g/cm³.
The density of the metal block is 10.5 g/cm^3. This is calculated by dividing the mass (525 g) by the volume (50 cm^3).
The density of the object is 0.2 g/cm^3. This is calculated by dividing the mass (10g) by the volume (50 cm^3).
To calculate density, you divide the mass by the volume. In this case, the density would be 2.7 g/cm³ (135g / 50 cm³).
This mass is 10,123 kg.
50/2.6 = 19.231 gm/cm3 (rounded)
There can be no possible answer to this question. Volume cannot be measured in g. Mass cannot be measured in cm - nor can volume.
That is very interesting.
10 mm = 1 cm → 50 mm = 50 ÷ 10 cm = 5 cm
50 cm / 2m = 50 cm / 200 cm = 1/4
A metal sphere is found to have a density of 5.2 g/cm cubed at 25 degrees Celseus and a density of 5.1 g/cm cubed at 50 degrees Celseus.