Specific weight: Difference between revisions
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The formula for submerged unit weight is: |
The formula for submerged unit weight is: |
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:<math>\gamma^' = \gamma_s - \gamma_w</math> |
:<math>\gamma^{'} = \gamma_s - \gamma_w</math> |
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where |
where |
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:<math>\gamma^'</math> is the submerged unit weight of the material |
:<math>\gamma^{'}</math> is the submerged unit weight of the material |
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:<math>\gamma_s</math> is the saturated unit weight of the material |
:<math>\gamma_s</math> is the saturated unit weight of the material |
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:<math>\gamma_w</math> is the unit weight of water |
:<math>\gamma_w</math> is the unit weight of water |
Revision as of 14:19, 28 October 2014
The specific weight (also known as the unit weight) is the weight per unit volume of a material. The symbol of specific weight is γ (the Greek letter Gamma).
A commonly used value is the specific weight of water on Earth at 5°C which is 9.807 kN/m3 or 62.43 lbf/ft3. [1]
The terms specific gravity, and less often specific weight, are also used for relative density.
General formula
where
- is the specific weight of the material (weight per unit volume, typically N/m3 units)
- is the density of the material (mass per unit volume, typically kg/m3)
- is acceleration due to gravity (rate of change of velocity, given in m/s2, and on Earth usually given as 9.81 m/s2)
Changes of specific weight
Unlike density, specific weight is not absolute. It depends upon the value of the gravitational acceleration, which varies with location. A significant influence upon the value of specific gravity is the temperature of the material. Pressure may also affect values, depending upon the bulk modulus of the material, but generally, at moderate pressures, has a less significant effect than the other factors. [2]
Uses
Fluid mechanics
In fluid mechanics, specific weight represents the force exerted by gravity on a unit volume of a fluid. For this reason, units are expressed as force per unit volume (e.g., N/m3 or lb/ft3). Specific weight can be used as a characteristic property of a fluid. [2]
Soil mechanics
Specific weight is often used as a property of soil to solve earthwork problems.
In soil mechanics, specific weight may refer to:
- Moist unit weight, which is the unit weight of a soil when void spaces of the soil contain both water and air.
where
- is the moist unit weight of the material
- is the unit weight of water
- w is the moisture content of the material
- Gs is the specific gravity of the solid
- e is the void ratio
- Dry unit weight, which is the unit weight of a soil when all void spaces of the soil are completely filled with air, with no water.
The formula for dry unit weight is:
where
- is the moist unit weight of the material
- is the dry unit weight of the material
- is the unit weight of water
- w is the moisture content of the material
- Gs is the specific gravity of the solid
- e is the void ratio
Typical values of soil dry unit weight can be found on geotechdata.info database.
- Saturated unit weight, which is the unit weight of a soil when all void spaces of the soil are completely filled with water, with no air.
The formula for saturated unit weight is:
where
- is the saturated unit weight of the material
- is the unit weight of water
- w is the moisture content of the material
- Gs is the specific gravity of the solid
- e is the void ratio[3]
- Submerged unit weight, which is defined as the difference between the saturated unit weight and the unit weight of water. [4] It is often used in the calculation of the effective stress in a soil.
The formula for submerged unit weight is:
where
- is the submerged unit weight of the material
- is the saturated unit weight of the material
- is the unit weight of water
Mechanical engineering
Specific weight can be used in mechanical engineering to determine the weight of a structure designed to carry certain loads while remaining intact and remaining within limits regarding deformation.
Specific weight of water
Temperature(°C) | Specific weight (kN/m3) |
---|---|
0 | 9.805 |
5 | 9.807 |
10 | 9.804 |
15 | 9.798 |
20 | 9.789 |
25 | 9.777 |
30 | 9.765 |
40 | 9.731 |
50 | 9.690 |
60 | 9.642 |
70 | 9.589 |
80 | 9.530 |
90 | 9.467 |
100 | 9.399 |
Specific weight of water at standard sea-level atmospheric pressure (Metric units) [2] |
Temperature(°F) | Specific weight (lb/ft3) |
---|---|
32 | 62.42 |
40 | 62.43 |
50 | 62.41 |
60 | 62.37 |
70 | 62.30 |
80 | 62.22 |
90 | 62.11 |
100 | 62.00 |
110 | 61.86 |
120 | 61.71 |
130 | 61.55 |
140 | 61.38 |
150 | 61.20 |
160 | 61.00 |
170 | 60.80 |
180 | 60.58 |
190 | 60.36 |
200 | 60.12 |
212 | 59.83 |
Specific weight of water at standard sea-level atmospheric pressure (English units) [2] |
Specific weight of air
Temperature(°C) | Specific weight (N/m3) | |
---|---|---|
−40 | 14.86 | |
−20 | 13.86 | |
0 | 12.68 | |
10 | 12.24 | |
20 | 11.82 | |
30 | 11.43 | |
40 | 11.06 | |
60 | 10.4 | |
80 | 9.81 | |
100 | 9.28 | |
200 | 7.33 | |
Specific weight of air at standard sea-level atmospheric pressure (Metric units) [2] |
Temperature(°F) | Specific Weight (lb/ft3) | |
---|---|---|
−40 | ||
−20 | 0.0903 | |
0 | 0.08637 | |
10 | 0.08453 | |
20 | 0.08277 | |
30 | 0.08108 | |
40 | 0.07945 | |
50 | 0.0779 | |
60 | 0.0764 | |
70 | 0.07495 | |
80 | 0.07357 | |
90 | 0.07223 | |
100 | 0.07094 | |
120 | 0.06849 | |
140 | 0.0662 | |
160 | 0.06407 | |
180 | 0.06206 | |
200 | 0.06018 | |
250 | 0.05594 | |
Specific weight of air at standard sea-level atmospheric pressure (English units) [2] |
See also
References
- ^ National Council of Examiners for Engineering and Surveying (2005). Fundamentals of Engineering Supplied-Reference Handbook (7th ed.). Clemson: National Council of Examiners for Engineering and Surveying. ISBN 1-932613-00-5
- ^ a b c d e f Finnemore, J. E. (2002). Fluid Mechanics with Engineering Applications. New York: McGraw-Hill. ISBN 0-07-243202-0.
- ^ Das, Braja M. (2007). Principles of Geotechnical Engineering. Canada: Chris Carson. ISBN 0-495-07316-4.
- ^ The Transtec Group, Inc. (2012). Basic Definitions and Terminology of Soils. http://www.intelligentcompaction.com/downloads/IC_RelatedDocs/SoilCmpct_Basic%20definitions%20of%20Soils.pdf (Page viewed December 7, 2012