The dew point is the temperature below which the water vapor in air at constant barometric pressure condenses into liquid water at the same rate at which it evaporates. The condensed water is called dew when it forms on a solid surface.
The dew point is a watertoair saturation temperature. The dew point is associated with relative humidity. A high relative humidity indicates that the dew point is closer to the current air temperature. Relative humidity of 100% indicates the dew point is equal to the current temperature and that the air is maximally saturated with water. When the moisture content remains constant and temperature increases, relative humidity decreases.^{[1]}
General aviation pilots use dewpoint data to calculate the likelihood of carburetor icing and fog, and to estimate the height of the cloud base.
At a given temperature but independent of barometric pressure, the dew point is a consequence of the absolute humidity, the mass of water per unit volume of air. If both the temperature and pressure rise, however, the dew point will increase and the relative humidity will decrease accordingly. Reducing the absolute humidity without changing other variables will bring the dew point back down to its initial value. In the same way, increasing the absolute humidity after a temperature drop brings the dew point back down to its initial level. If the temperature rises in conditions of constant pressure, then the dew point will remain constant but the relative humidity will drop.
For this reason, a constant relative humidity (%) with different temperatures implies that when it's hotter, a higher fraction of the air is water vapor than when it's cooler.
At a given barometric pressure but independent of temperature, the dew point indicates the mole fraction of water vapor in the air, or, put differently, determines the specific humidity of the air. If the pressure rises without changing this mole fraction, the dew point will rise accordingly; Reducing the mole fraction, i.e., making the air less humid, would bring the dew point back down to its initial value. In the same way, increasing the mole fraction after a pressure drop brings the relative humidity back up to its initial level.
Considering New York (33 ft elevation) and Denver (5,280 ft elevation),^{[2]} for example, this means that if the dew point and temperature in both cities are the same, then the mass of water vapor per cubic meter of air will be the same, but the mole fraction of water vapor in the air will be greater in Denver.
Relationship to human comfort
When the air temperature is high, the body's thermoregulation uses evaporation of perspiration to cool down, with the cooling effect directly related to how fast the perspiration evaporates. The rate at which perspiration can evaporate depends on how much moisture is in the air and how much moisture the air can hold. If the air is already saturated with moisture, perspiration will not evaporate. The body's cooling system will produce perspiration in an effort to keep the body at its normal temperature even when the rate it is producing sweat exceeds the evaporation rate. So even without generating additional body heat by exercising, one can become coated with sweat on humid days. It is the unevaporated sweat that tends to make one feel uncomfortable in humid weather.
As the air surrounding one's body is warmed by body heat, it will rise and be replaced with other air. If air is moved away from one's body with a natural breeze or a fan, sweat will evaporate faster, making perspiration more effective at cooling the body. The more unevaporated perspiration, the greater the discomfort.
A wet bulb thermometer also uses evaporative cooling, so it provides a good analog for use in evaluating comfort level.
Discomfort also exists when the dew point is low (below around −30 °C (−22 °F)). The drier air can cause skin to crack and become irritated more easily. It will also dry out the respiratory paths. OSHA recommends indoor air be maintained at 20 to 24.5 °C (68.0 to 76.1 °F) with a 2060% relative humidity (a dew point of −4.5 to 15.5 °C (23.9 to 59.9 °F)).^{[3]}
Lower dew points, less than 10 °C (50 °F), correlate with lower ambient temperatures and the body requires less cooling. A lower dew point can go along with a high temperature only at extremely low relative humidity (see graph below), allowing for relative effective cooling.
Those accustomed to continental climates often begin to feel uncomfortable when the dew point reaches between 15 and 20 °C (59 and 68 °F). Most inhabitants of these areas will consider dew points above 21 °C (70 °F) oppressive.
Dew point

Human perception^{[1]}

Relative humidity at 32 °C (90 °F)

Over 26 °C

Over 80 °F

Severely high. Even deadly for asthma related illnesses

65% and higher

24–26 °C

75–80 °F

Extremely uncomfortable, fairly oppressive

62%

21–24 °C

70–74 °F

Very humid, quite uncomfortable

52–60%

18–21 °C

65–69 °F

Somewhat uncomfortable for most people at upper edge

44–52%

16–18 °C

60–64 °F

OK for most, but all perceive the humidity at upper edge

37–46%

13–16 °C

55–59 °F

Comfortable

38–41%

10–12 °C

50–54 °F

Very comfortable

31–37%

Under 10 °C

Under 50 °F

A bit dry for some

30%

Measurement
Devices called dew point meters are used to measure dew point over a wide range of temperatures. These devices consist of a polished metal mirror which is cooled as air is passed over it. The temperature at which dew forms is, by definition, the dew point. Manual devices of this sort can be used to calibrate other types of humidity sensors, and automatic sensors may be used in a control loop with a humidifier or dehumidifier to control the dew point of the air in a building or in a smaller space for a manufacturing process.
Calculating the dew point
A wellknown approximation used to calculate the dew point, T_{dp}, given just the actual ("dry bulb") air temperature, T and relative humidity (in percent), RH, is the Magnus formula:
 $\backslash begin\{align\}$
\gamma(T,R\!H)&=\ln\left(\frac{R\!H}{100}\exp\left(\frac{bT}{c+T}\right)\right)=\ln\left(\frac{R\!H}{100}\right)+\frac{bT}{c+T};\\
T_{dp}&= \frac{c\gamma(T,R\!H)}{b\gamma(T,R\!H)};\end{align}
The more complete formulation and origin of this approximation involves the interrelated saturated water vapor pressure (in units of millibar, which is also hPa) at T, P_{s}(T), and the actual water vapor pressure (also in units of millibar), P_{a}(T), which can be either found with RH or approximated with the barometric pressure (in millibar units), BP_{mb}, and "wetbulb" temperature, T_{w} is:
 Note: unless declared otherwise, all temperatures are expressed and worked in degrees Celsius
 $$
\begin{align}
P_s(T)& = \frac{100}{R\!H}P_\text{a}(T) = a\exp\left(\frac{bT}{c+T}\right);\\[8pt]
P_\text{a}(T) & = \frac{R\!H}{100}P_s(T)=a\exp(\gamma(T,R\!H)),\\
&\approx P_s(T_\text{w})  B\!P_\text{mb} 0.00066 \left[1 + (0.00115T_\text{w} \right)]\left(TT_\text{w}\right);\\[5pt]
T_\text{dp} & = \frac{c\ln(P_\text{a}(T)/a)}{b\ln(P_\text{a}(T)/a)};\end{align}
For greater accuracy, P_{s}(T) (and, therefore, γ(T,RH)) can be enhanced, using part of the Bögel modification, also known as the Arden Buck equation, which adds a fourth, d constant:
 $\backslash begin\{align\}P\_\{s:m\}(T)\&=a\backslash exp\backslash bigg(\backslash left(b\backslash frac\{T\}\{d\}\backslash right)\backslash left(\backslash frac\{T\}\{c+T\}\backslash right)\backslash bigg);\backslash \backslash [8pt]$
\gamma_m(T,R\!H)&=\ln\Bigg(\frac{R\!H}{100}\exp
\bigg(\left(b\frac{T}{d}\right)\left(\frac{T}{c+T}\right)\bigg)
\Bigg);\\
T_{dp}&= \frac{c\gamma_m(T,R\!H)}{b\gamma_m(T,R\!H)};\end{align}
 (where $\backslash scriptstyle\{a=6.1121\backslash \; \backslash mathrm\{millibar\};\backslash quad\backslash ;b=\; 18.678;\backslash quad\backslash ;c=\; 257.14^\backslash circ\; \backslash mathrm\{C\};\backslash quad\backslash ;d=234.5^\backslash circ\; \backslash mathrm\{C\}.\}$)
There are several different constant sets in use. The ones used in NOAA's presentation ^{[4]} are taken from a 1980 paper by David Bolton in the Monthly Weather Review:^{[5]}
 $\backslash begin\{align\}a\&=6.112\backslash \; \backslash mathrm\{millibar\};\backslash quad\backslash ;b\&=\; 17.67;\backslash quad\backslash ;c\&=\; 243.5^\backslash circ\; \backslash mathrm\{C\};\backslash end\{align\}$
These valuations provide a minimum accuracy of 0.1%, for
 30°C ≤ T ≤ +35°C;
 1% < RH < 100%;
Also noteworthy is the Sonntag1990,^{[6]}
 $\backslash scriptstyle\{a=6.112\backslash \; \backslash mathrm\{millibar\};\backslash quad\backslash ;b=\; 17.62;\backslash quad\backslash ;c=\; 243.12^\backslash circ\; \backslash mathrm\{C\}:\backslash quad\; 45^\backslash circ\; \backslash mathrm\{C\}\backslash le\; T\backslash le\; +60^\backslash circ\; \backslash mathrm\{C\}\backslash quad\; (<0.35^\backslash circ\; \backslash mathrm\{C\})\}$
Another common set of values originates from the 1974 Psychrometry and Psychrometric Charts, as presented by Paroscientific,^{[7]}
 $\backslash scriptstyle\{a=6.105\backslash \; \backslash mathrm\{millibar\};\backslash quad\backslash ;b=\; 17.27;\backslash quad\backslash ;c=\; 237.7^\backslash circ\; \backslash mathrm\{C\}:\backslash quad\; 0^\backslash circ\; \backslash mathrm\{C\}\backslash le\; T\backslash le\; +60^\backslash circ\; \backslash mathrm\{C\}\backslash quad\; (\backslash pm0.4^\backslash circ\; \backslash mathrm\{C\})\}$
Also, in the Journal of Applied Meteorology and Climatology,^{[8]} Arden Buck presents several different valuation sets, with different minimum accuracies for different temperature ranges. Two particular sets provide a range of 40°C → +50°C between the two, with even greater minimum accuracy than all of the other, above sets (maximum error at given C° extreme):
 $\backslash scriptstyle\{a=6.1121\backslash \; \backslash mathrm\{millibar\};\backslash quad\backslash ;b=\; 17.368;\backslash quad\backslash ;c=\; 238.88^\backslash circ\; \backslash mathrm\{C\}:\backslash quad\backslash quad\backslash !\; 0^\backslash circ\; \backslash mathrm\{C\}\backslash le\; T\backslash le\; +50^\backslash circ\; \backslash mathrm\{C\}\backslash ;\backslash ;(\backslash le0.05\%)\}$
 $\backslash scriptstyle\{a=6.1121\backslash \; \backslash mathrm\{millibar\};\backslash quad\backslash ;b=\; 17.966;\backslash quad\backslash ;c=\; 247.15^\backslash circ\; \backslash mathrm\{C\}:\backslash quad\; 40^\backslash circ\; \backslash mathrm\{C\}\backslash le\; T\backslash le\; 0^\backslash circ\; \backslash mathrm\{C\}\backslash quad\backslash !\; \backslash ;\backslash ;(\backslash le0.06\%)\}$
Simple approximation
There is also a very simple approximation that allows conversion between the dew point, temperature and relative humidity. This approach is accurate to within about ±1°C as long as the relative humidity is above 50%:
 $T\_\{dp\}\backslash approx\; T\backslash frac\{100R\backslash !H\}\{5\};$
and
 $R\backslash !H\backslash approx\; 1005(TT\_\{dp\});\backslash ,$
This can be expressed as a simple rule of thumb:
For every 1°C difference in the dew point and dry bulb temperatures, the relative humidity decreases by 5%, starting with RH = 100% when the dew point equals the dry bulb temperature.
The derivation of this approach, a discussion of its accuracy, comparisons to other approximations, and more information on the history and applications of the dew point are given in the Bulletin of the American Meteorological Society.^{[9]}
For temperatures in degrees Fahrenheit, these approximations work out to
 $T\_\{dp:f\}\backslash approx\; T\_\{f\}\backslash frac\{9\}\{25\}(100R\backslash !H);$
and
 $R\backslash !H\backslash approx\; 100\backslash frac\{25\}\{9\}(T\_\{f\}T\_\{dp:f\});$
For example, a relative humidity of 100% means dew point is the same as air temp. For 90% RH, dew point is 3 degrees Fahrenheit lower than air temp. For every 10 percent lower, dew point drops 3 °F.
Frost point
The frost point is similar to the dew point, in that it is the temperature to which a given parcel of humid air must be cooled, at constant barometric pressure, for water vapor to be deposited on a surface as ice without going through the liquid phase. (Compare with sublimation.) The frost point for a given parcel of air is always higher than the dew point, as the stronger bonding between water molecules on the surface of ice requires higher temperature to break.^{[10]}
See also
References
External links
 Dew point definition NOAA Glossary
 Often Needed Answers about Temp, Humidity & Dew Point from the sci.geo.meteorology
sv:Luftfuktighet#Daggpunkt
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