In order to answer the question whether 5 cm3 of silver or 5 cm3 of gold has the greatest mass, one need to know the density of each metal. It turns out the density of silver is 10.3 g/cm3 and that for gold is 19.3 g/cm3. Therefore, for silver, 5 cm3 x 10.3 g/cm3 = 51.5 g and for gold, 5 cm3 x 19.3 g/cm3 = 96.5 g. So, 5 cm3 of gold will have a greater mass (96.5 g v. 51.5 g)
density = mass / volume 89.1 cm3 / 53.5
A chunk of sulfur has a volume of 5.95 cm3. What is the mass of this sulfur? (Density of sulfur = 2.07 g/cm3.)
density= mass/volume =1800g/200cm3 divide density= 9 g/cm3
For water, 1 gram.
Mass density is the amount of mass (g) per unit of volume (cm3). Divide mass by volume to get density: 15.2 grams / 0.8 cm3 = 19 grams/cm3
The volume is (6 x 3 x 1) = 18 cm3 . The density is (whatever amount of mass is contained in 1 cm3 ) per cm3 , or (1/18 of the mass of the total solid you described) per cm3 .
No. It cannot be. Mass cannot be measured in cm3, which is a measure of volume.
The nugget of gold has a volume of 2.6 cm3, and the nugget of pyrite has a volume of 10 cm3.
In order to answer the question whether 5 cm3 of silver or 5 cm3 of gold has the greatest mass, one need to know the density of each metal. It turns out the density of silver is 10.3 g/cm3 and that for gold is 19.3 g/cm3. Therefore, for silver, 5 cm3 x 10.3 g/cm3 = 51.5 g and for gold, 5 cm3 x 19.3 g/cm3 = 96.5 g. So, 5 cm3 of gold will have a greater mass (96.5 g v. 51.5 g)
.10g/cm3
density = mass ÷ volume= 20 g ÷ 12 cm3≈ 1.67 g/cm3
Mass = [ gram ]Volume = [ cm3 ]Density = [ gram per cm3 ]
The density of the mass is 48 g/cm3
The density of the 6 cm3 block of ice is approximately 0.67 grams/cm3. This can be calculated by dividing the mass (4 grams) by the volume (6 cm3).
An object with a mass of 579 g and volume of 30 cm3 will have a density of 19.3 g/cm3.
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