Density

Density
SI unit		kg/m3
Extensive?	No
Intensive?	Yes
Conserved?	No
Derivations from other quantities	${\displaystyle \rho ={\frac {m}{V}}}$
Dimension	${\displaystyle {\mathsf {L}}^{-3}{\mathsf {M}}}$

Density (volumetric mass density or specific mass) is a substance's mass per unit of volume. The symbol most often used for density is ρ (the lower case Greek letter rho), although the Latin letter D can also be used. Mathematically, density is defined as mass divided by volume:^[1]

where ρ is the density, m is the mass, and V is the volume. In some cases (for instance, in the United States oil and gas industry), density is loosely defined as its weight per unit volume,^[2] although this is scientifically inaccurate – this quantity is more specifically called specific weight.

For a pure substance the density has the same numerical value as its mass concentration. Different materials usually have different densities, and density may be relevant to

.

To simplify comparisons of density across different systems of units, it is sometimes replaced by the

", i.e. the ratio of the density of the material to that of a standard material, usually water. Thus a relative density less than one relative to water means that the substance floats in water.

The density of a material varies with temperature and pressure. This variation is typically small for solids and liquids but much greater for gases. Increasing the pressure on an object decreases the volume of the object and thus increases its density. Increasing the temperature of a substance (with a few exceptions) decreases its density by increasing its volume. In most materials, heating the bottom of a fluid results in convection of the heat from the bottom to the top, due to the decrease in the density of the heated fluid, which causes it to rise relative to denser unheated material.

The reciprocal of the density of a substance is occasionally called its

in that increasing the amount of a substance does not increase its density; rather it increases its mass.

Other conceptually comparable quantities or ratios include

.

History

Density, floating, and sinking

The understanding that different materials have different densities, and of a relationship between density, floating, and sinking must date to prehistoric times. Much later it was put in writing. Aristotle, for example, wrote:^[3]

There is so great a difference in density between salt and fresh water that vessels laden with cargoes of the same weight almost sink in rivers, but ride quite easily at sea and are quite seaworthy. And an ignorance of this has sometimes cost people dear who load their ships in rivers. The following is a proof that the density of a fluid is greater when a substance is mixed with it. If you make water very salt by mixing salt in with it, eggs will float on it. ... If there were any truth in the stories they tell about the lake in Palestine it would further bear out what I say. For they say if you bind a man or beast and throw him into it he floats and does not sink beneath the surface.

— Aristotle,

Meteorologica

, Book II, Chapter III

Volume vs. density; volume of an irregular shape

In a well-known but probably

entered common parlance and is used today to indicate a moment of enlightenment.

The story first appeared in written form in Vitruvius' books of architecture, two centuries after it supposedly took place.^[5] Some scholars have doubted the accuracy of this tale, saying among other things that the method would have required precise measurements that would have been difficult to make at the time.^[6][7]

Nevertheless, in 1586, Galileo Galilei, in one of his first experiments, made a possible reconstruction of how the experiment could have been performed with ancient Greek resources^[8]

Units

From the equation for density (ρ = m/V), mass density has any unit that is mass divided by volume. As there are many units of mass and volume covering many different magnitudes there are a large number of units for mass density in use. The

may be used. See below for a list of some of the most common units of density.

The litre and tonne are not part of the SI, but are acceptable for use with it, leading to the following units:

• kilogram per litre (kg/L)
• millilitre
  (g/mL)
• tonne per cubic metre (t/m³)

Densities using the following metric units all have exactly the same numerical value, one thousandth of the value in (kg/m³). Liquid water has a density of about 1 kg/dm³, making any of these SI units numerically convenient to use as most solids and liquids have densities between 0.1 and 20 kg/dm³.

• kilogram per cubic decimetre (kg/dm³)
• gram per cubic centimetre (g/cm³)
  • 1 g/cm³ = 1000 kg/m³
• megagram (metric ton) per cubic metre (Mg/m³)

In

density can be stated in:

• Avoirdupois ounce per cubic inch
  (1 g/cm³ ≈ 0.578036672 oz/cu in)
• Avoirdupois ounce per fluid ounce
  (1 g/cm³ ≈ 1.04317556 oz/US fl oz = 1.04317556 lb/US fl pint)
• Avoirdupois pound per cubic inch (1 g/cm³ ≈ 0.036127292 lb/cu in)
• pound per cubic foot (1 g/cm³ ≈ 62.427961 lb/cu ft)
• pound per cubic yard (1 g/cm³ ≈ 1685.5549 lb/cu yd)
• pound per
  US liquid gallon
  (1 g/cm³ ≈ 8.34540445 lb/US gal)
• pound per US bushel (1 g/cm³ ≈ 77.6888513 lb/bu)
• slug per cubic foot

ounces and pounds, a possible cause of confusion.

Knowing the volume of the

ångström

is equal to a density of 1.660 539 066 60 g/cm³.

Measurement

A number of techniques as well as standards exist for the measurement of density of materials. Such techniques include the use of a hydrometer (a buoyancy method for liquids), Hydrostatic balance (a buoyancy method for liquids and solids), immersed body method (a buoyancy method for liquids), pycnometer (liquids and solids), air comparison pycnometer (solids), oscillating densitometer (liquids), as well as pour and tap (solids).[9] However, each individual method or technique measures different types of density (e.g. bulk density, skeletal density, etc.), and therefore it is necessary to have an understanding of the type of density being measured as well as the type of material in question.

Homogeneous materials

The density at all points of a

uses the displacement of water due to a submerged object to determine the density of the object.

Heterogeneous materials

If the body is not homogeneous, then its density varies between different regions of the object. In that case the density around any given location is determined by calculating the density of a small volume around that location. In the limit of an infinitesimal volume the density of an inhomogeneous object at a point becomes: ${\displaystyle \rho ({\vec {r}})=dm/dV}$, where ${\displaystyle dV}$ is an elementary volume at position ${\displaystyle {\vec {r}}}$. The mass of the body then can be expressed as

$${\displaystyle m=\int _{V}\rho ({\vec {r}})\,dV.}$$

Non-compact materials

In practice, bulk materials such as sugar, sand, or snow contain voids. Many materials exist in nature as flakes, pellets, or granules.

Voids are regions which contain something other than the considered material. Commonly the void is air, but it could also be vacuum, liquid, solid, or a different gas or gaseous mixture.

The

— is often obtained by a simple measurement (e.g. with a calibrated measuring cup) or geometrically from known dimensions.

Mass divided by bulk volume determines bulk density. This is not the same thing as the material volumetric mass density. To determine the material volumetric mass density, one must first discount the volume of the void fraction. Sometimes this can be determined by geometrical reasoning. For the close-packing of equal spheres the non-void fraction can be at most about 74%. It can also be determined empirically. Some bulk materials, however, such as sand, have a variable void fraction which depends on how the material is agitated or poured. It might be loose or compact, with more or less air space depending on handling.

In practice, the void fraction is not necessarily air, or even gaseous. In the case of sand, it could be water, which can be advantageous for measurement as the void fraction for sand saturated in water—once any air bubbles are thoroughly driven out—is potentially more consistent than dry sand measured with an air void.

In the case of non-compact materials, one must also take care in determining the mass of the material sample. If the material is under pressure (commonly ambient air pressure at the earth's surface) the determination of mass from a measured sample weight might need to account for buoyancy effects due to the density of the void constituent, depending on how the measurement was conducted. In the case of dry sand, sand is so much denser than air that the buoyancy effect is commonly neglected (less than one part in one thousand).

Mass change upon displacing one void material with another while maintaining constant volume can be used to estimate the void fraction, if the difference in density of the two voids materials is reliably known.

Changes of density

Main articles:

Thermal expansivity

In general, density can be changed by changing either the pressure or the temperature. Increasing the pressure always increases the density of a material. Increasing the temperature generally decreases the density, but there are notable exceptions to this generalization. For example, the density of water increases between its melting point at 0 °C and 4 °C; similar behavior is observed in silicon at low temperatures.

The effect of pressure and temperature on the densities of liquids and solids is small. The

thermal expansivity is 10⁻⁵ K⁻¹. This roughly translates into needing around ten thousand times atmospheric pressure to reduce the volume of a substance by one percent. (Although the pressures needed may be around a thousand times smaller for sandy soil and some clays.) A one percent expansion of volume typically requires a temperature increase on the order of thousands of degrees Celsius

.

In contrast, the density of gases is strongly affected by pressure. The density of an ideal gas is

$${\displaystyle \rho ={\frac {MP}{RT}},}$$

where M is the

absolute temperature

. This means that the density of an ideal gas can be doubled by doubling the pressure, or by halving the absolute temperature.

In the case of volumic thermal expansion at constant pressure and small intervals of temperature the temperature dependence of density is

$${\displaystyle \rho ={\frac {\rho _{T_{0}}}{1+\alpha \cdot \Delta T}},}$$

where ${\displaystyle \rho _{T_{0}}}$ is the density at a reference temperature, ${\displaystyle \alpha }$ is the thermal expansion coefficient of the material at temperatures close to ${\displaystyle T_{0}}$.

Density of solutions

The density of a solution is the sum of mass (massic) concentrations of the components of that solution.

Mass (massic) concentration of each given component ${\displaystyle \rho _{i}}$ in a solution sums to density of the solution,

$${\displaystyle \rho =\sum _{i}\rho _{i}.}$$

Expressed as a function of the densities of pure components of the mixture and their

excess molar volumes

:

$${\displaystyle \rho =\sum _{i}\rho _{i}{\frac {V_{i}}{V}}\,=\sum _{i}\rho _{i}\varphi _{i}=\sum _{i}\rho _{i}{\frac {V_{i}}{\sum _{i}V_{i}+\sum _{i}{V^{E}}_{i}}},}$$

provided that there is no interaction between the components.

Knowing the relation between excess volumes and activity coefficients of the components, one can determine the activity coefficients:

$${\displaystyle {\overline {V^{E}}}_{i}=RT{\frac {\partial \ln \gamma _{i}}{\partial P}}.}$$

List of densities

Various materials

This section is about the listing of only certain chemical elements. For the densities of all chemical elements, see List of chemical elements.

Densities of various materials covering a range of values

Material	ρ (kg/m3)[note 1]	Notes
Hydrogen	0.0898
Helium	0.179
Aerographite	0.2	[note 2][10][11]
Metallic microlattice	0.9	[note 2]
Aerogel	1.0	[note 2]
Air	1.2	At sea level
Tungsten hexafluoride	12.4	One of the heaviest known gases at standard conditions
Liquid hydrogen	70	At approximately −255 °C
Styrofoam	75	Approximate[12]
Cork	240	Approximate[12]
Pine	373	[13]
Lithium	535	Least dense metal
Wood	700	Seasoned, typical[14][15]
Oak	710	[13]
Potassium	860	[16]
Ice	916.7	At temperature < 0 °C
Cooking oil	910–930
Sodium	970
Water (fresh)	1,000	At 4 °C, the temperature of its maximum density
Water (salt)	1,030	3%
Liquid oxygen	1,141	At approximately −219 °C
Nylon	1,150
Plastics	1,175	Approximate; for PVC
Glycerol	1,261	[17]
Tetrachloroethene	1,622
Sand	1,600	Between 1,600 and 2000 [18]
Magnesium	1,740
Beryllium	1,850
Silicon	2,330
Concrete	2,400	[19][20]
Glass	2,500	[21]
Quartzite	2,600	[18]
Granite	2,700	[18]
Gneiss	2,700	[18]
Aluminium	2,700
Limestone	2,750	Compact[18]
Basalt	3,000	[18]
Diiodomethane	3,325	Liquid at room temperature
Diamond	3,500
Titanium	4,540
Selenium	4,800
Vanadium	6,100
Antimony	6,690
Zinc	7,000
Chromium	7,200
Tin	7,310
Manganese	7,325	Approximate
Mild steel	7,850
Iron	7,870
Niobium	8,570
Brass	8,600	[20]
Cadmium	8,650
Cobalt	8,900
Nickel	8,900
Copper	8,940
Bismuth	9,750
Molybdenum	10,220
Silver	10,500
Lead	11,340
Thorium	11,700
Rhodium	12,410
Mercury	13,546
Tantalum	16,600
Uranium	19,100
Tungsten	19,300
Gold	19,320
Plutonium	19,840
Rhenium	21,020
Platinum	21,450
Iridium	22,420
Osmium	22,570	Densest natural element on Earth

1. standard conditions for temperature and pressure,
   that is, 273.15 K
   (0.00 °C) and 100 kPa (0.987 atm).
2. ^ ^{a b c} Air contained in material excluded when calculating density

Others

Entity	ρ (kg/m3)	Notes
Interstellar medium	1.7×10−26	Based on 10−5 hydrogen atoms per cubic centimetre[22]
Local Interstellar Cloud	5×10−22	Based on 0.3 hydrogen atoms per cubic centimetre[22]
Interstellar medium	1.7×10−16	Based on 105 hydrogen atoms per cubic centimetre[22]
The Earth	5,515	Mean density.[23]
Earth's inner core	13,000	Approx., as listed in Earth.[24]
The core of the Sun	33,000–160,000	Approx.[25]
White dwarf star	2.1×109	Approx.[26]
Atomic nuclei	2.3×1017	Does not depend strongly on size of nucleus[27]
Neutron star	1×1018

Water

See also:

Water density

Density of liquid water at 1

atm

pressure

Temp. (°C)[note 1]	Density (kg/m3)
−30	983.854
−20	993.547
−10	998.117
0	999.8395
4	999.9720
10	999.7026
15	999.1026
20	998.2071
22	997.7735
25	997.0479
30	995.6502
40	992.2
60	983.2
80	971.8
100	958.4
Notes: ^ Values below 0 °C refer to supercooled water.

Air

Main article: Density of air

Density of air at 1 

atm

pressure

T (°C)	ρ (kg/m3)
−25	1.423
−20	1.395
−15	1.368
−10	1.342
−5	1.316
0	1.293
5	1.269
10	1.247
15	1.225
20	1.204
25	1.184
30	1.164
35	1.146

Molar volumes of liquid and solid phase of elements

See also

• Densities of the elements (data page)
• List of elements by density
• Air density
• Area density
• Bulk density
• Buoyancy
• Charge density
• Density prediction by the Girolami method
• Dord
• Energy density
• Lighter than air
• Linear density
• Number density
• Orthobaric density
• Paper density
• Specific weight
• Spice (oceanography)
• Standard temperature and pressure
• Volumic quantity

References

1. The National Aeronautic and Atmospheric Administration's Glenn Research Center. "Gas Density Glenn research Center". grc.nasa.gov. Archived from the original
   on April 14, 2013. Retrieved April 9, 2013.
2. ^ "Density definition in Oil Gas Glossary". Oilgasglossary.com. Archived from the original on August 5, 2010. Retrieved September 14, 2010.
3. ^ Aristotle. (1952) [c. 340 BC]. Meteorologica (in Ancient Greek and English). Translated by Lee, H. D. P. Harvard University Press. pp. 2.3, 359a.
4. ^ Archimedes, A Gold Thief and Buoyancy Archived August 27, 2007, at the Wayback Machine – by Larry "Harris" Taylor, Ph.D.
5. ^ Vitruvius on Architecture, Book IX, paragraphs 9–12, translated into English and in the original Latin.
6. doi:10.1126/science.305.5688.1219e
   .
7. ^ Biello, David (December 8, 2006). "Fact or Fiction?: Archimedes Coined the Term "Eureka!" in the Bath". Scientific American.
8. ^ La Bilancetta, Complete text of Galileo's treatise in the original Italian together with a modern English translation [1]
9. ISSN 2074-5753
   .
10. ^ New carbon nanotube struructure aerographite is lightest material champ Archived October 17, 2013, at the Wayback Machine. Phys.org (July 13, 2012). Retrieved on July 14, 2012.
11. ^ Aerographit: Leichtestes Material der Welt entwickelt – SPIEGEL ONLINE Archived October 17, 2013, at the Wayback Machine. Spiegel.de (July 11, 2012). Retrieved on July 14, 2012.
12. ^ ^{a b} "Re: which is more bouyant [sic] styrofoam or cork". Madsci.org. Archived from the original on February 14, 2011. Retrieved September 14, 2010.
13. ^
    ISBN 0-534-49143-X, archived
    from the original on May 17, 2016
14. ^ "Wood Densities". www.engineeringtoolbox.com. Archived from the original on October 20, 2012. Retrieved October 15, 2012.
15. ^ "Density of Wood". www.simetric.co.uk. Archived from the original on October 26, 2012. Retrieved October 15, 2012.
16. ISBN 9781315214092
    .
17. ^ glycerol composition at Archived February 28, 2013, at the Wayback Machine. Physics.nist.gov. Retrieved on July 14, 2012.
18. ^
    ISBN 9781139171168
19. ^ "Density of Concrete - The Physics Factbook". hypertextbook.com.
20. ^
    ISBN 978-0-321-69686-1
    .
21. ^ "Density of Glass - The Physics Factbook". hypertextbook.com.
22. ^ ^{a b c} "Our Local Galactic Neighborhood". Interstellar Probe Project. NASA. 2000. Archived from the original on November 21, 2013. Retrieved August 8, 2012.
23. ^ Density of the Earth, wolframalpha.com, archived from the original on October 17, 2013
24. ^ Density of Earth's core, wolframalpha.com, archived from the original on October 17, 2013
25. ^ Density of the Sun's core, wolframalpha.com, archived from the original on October 17, 2013
26. ^ Johnson, Jennifer. "Extreme Stars: White Dwarfs & Neutron Stars]" (PDF). lecture notes, Astronomy 162. Ohio State University. Archived from the original (PDF) on September 25, 2007.
27. ^ "Nuclear Size and Density". HyperPhysics. Georgia State University. Archived from the original on July 6, 2009.

External links

• "Density" . Encyclopædia Britannica. Vol. 8 (11th ed.). 1911.
• "Density" . The New Student's Reference Work . 1914.
• Video: Density Experiment with Oil and Alcohol
• Video: Density Experiment with Whiskey and Water
• Glass Density Calculation – Calculation of the density of glass at room temperature and of glass melts at 1000 – 1400°C
• List of Elements of the Periodic Table – Sorted by Density
• Calculation of saturated liquid densities for some components
• Field density test
• Water – Density and specific weight
• Temperature dependence of the density of water – Conversions of density units
• A delicious density experiment Archived July 18, 2015, at the Wayback Machine
• Water density calculator Archived July 13, 2011, at the Wayback Machine Water density for a given salinity and temperature.
• Liquid density calculator^{[permanent dead link]} Select a liquid from the list and calculate density as a function of temperature.
• Gas density calculator^{[permanent dead link]} Calculate density of a gas for as a function of temperature and pressure.
• Densities of various materials.
• Determination of Density of Solid, instructions for performing classroom experiment.
• Lam EJ, Alvarez MN, Galvez ME, Alvarez EB (2008). "A model for calculating the density of aqueous multicomponent electrolyte solutions". Journal of the Chilean Chemical Society. 53 (1): 1393–8.
  doi:10.4067/S0717-97072008000100015
  .
• Radović IR, Kijevčanin ML, Tasić AŽ, Djordjević BD, Šerbanović SP (2010). "Derived thermodynamic properties of alcohol+ cyclohexylamine mixtures". Journal of the Serbian Chemical Society. 75 (2): 283–293.
  doi:10.2298/JSC1002283R
  .