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Chapter 7 – Moist Air. The Dew (Frost) Point If saturation is reached with respect to ice we are at the frost point temperature , T f . Dew point temperature is a new variable that can be used to characterize the humidity of the air.
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Chapter 7 – Moist Air • The Dew (Frost) Point • If saturation is reached with respect to ice we are at the frost point temperature, Tf. • Dew point temperature is a new variable that can be used to characterize the humidity of the air. • Additional assumption – pressure can change (rising or subsiding air) AND humidity may change (e.g., turbulent diffusion of vapor from a water source or rain falling through the air mass). • To find the relation between Td, w, and p, we have to apply the C-C equation for the equilibrium curve.
Chapter 7 – Moist Air • The Dew (Frost) Point • By definition, at Tdew, e = esw(Tdew). • We can use the C-C equation in the following way • where e is the vapor pressure of the air mass at T, and Tdew corresponds to e over the saturation curve. • Tdew and e are humidity parameters giving the same info.
Chapter 7 – Moist Air • The Dew (Frost) Point • If we solve for Tdew, we get • Expressing this as a relative variation we have • where we have used Tdew = 270K indicating that the relative increase in Tdew is ~5% of the sum of the relative increases in w and p.
Chapter 7 – Moist Air • The Dew (Frost) Point • If we integrate the C-C between Tdew and T, we get • If we solve for (T – Tdew), and substitute for constants, we get (using lv = 2.501 106 J kg-1) • For the frost point we get (using lf = 2.8345 106 J kg-1)
Chapter 7 – Moist Air • The Dew (Frost) Point • The figure shows the relationships between Tand e during a process. • The process starts at P at temperature Tand vapor pressure e. • Isobarically cool the air to Q where T = Tdewand e is on the saturation curve. • The integration we performed was between points Q and R.
Chapter 7 – Moist Air • The Dew (Frost) Point • This figure shows the relation between Tdew, Tf(frost point temperature), and triple point. • Starting at P and isobarically cooling the air, we pass thru Tfbefore reaching Tdew. • Once the Tdew is reached, condensation begins (requires solid surface or CN). • Without surface or CN no condensation occurs and the air becomes supersaturated. liquid vapor solid
Chapter 7 – Moist Air • The Dew (Frost) Point • As isobaric cooling proceeds from P, sublimation will not generally occur at F. • Between F and D, air will be supersaturated with respect to ice, but only condense water at D. • Tfand Tdew only indicate the point where condensation or sublimation can occur. They do not guarantee that such will occur. liquid vapor solid
Chapter 7 – Moist Air • The Dew (Frost) Point • The determining factor is the CN availability. • Atmosphere has abundant CN, so condensation is not a problem (only small supersaturations). • With respect to ice, if a suitable surface is present freezing or sublimation will proceed as soon as the water or the vapor reaches the equilibrium curve. • Ice Nuclei favor the appearance of ice crystals, but only activate at temperatures well below the equilibrium curve. • Spontaneous nucleation of ice does not take place with either small supercooling of water or supersaturation of vapor.
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures Equivalent temperature is the temperature of an air parcel from which all the water vapor has been extracted by an adiabatic process and p=const. Wet-Bulb Temperature is associated with the moisture content of the air: it is the temperature a sample of air would have if cooled adiabatically to saturation at constant pressure by evaporation of water into it, all latent heat being supplied by the sample of air.
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • Consider a closed system of dry air, water vapor (moist air), and water (or ice). • The enthalpy of the system can be written as • where we have made use of lv(T) = hv – hwand mt = mv + mw. We can substitute h = cpTfor vapor and liquid phase.
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • Consider two states of the system linked by an isenthalpic process (H = 0). Each state may be represented by a form of the previous expression. • where md, mt, and const are the same in both states. Then, since H = 0,
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • We can rewrite this as • The denominator on each side is a constant for any (closed) system. Each of the 2 sides of the equation is a function of the state of the system only, i.e., the expression on either side of the equation is an invariant for an isenthalpic process.
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • Divide both numerator and denominator in the quotients by mdand use the fact that wt = (mv +mw)/md = mt/mdto get • Note that (cpd + wtcw) is constant for a given system, but will vary for different systems according to their total water value (liquid + vapor).
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • We can simplify this expression first by neglecting the heat capacity of the water (wt w) yielding, • Now the denominator is no longer constant. Consider wcw as small compared with cpd and make lva constant, we get
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • In this expression cp can be taken as cpd, or approximated, to a better degree of accuracy, as where the mixing ratio is an average value of w. • Consider the physical process that links 2 specific states (T’, w’) – unsaturated moist air + water – and (T, w) – saturated or unsaturated moist air without water – of the system to which our approximate equation applies. • We have dry air with w gm of water vapor and (w’ – w) gm of liquid water (may or may not be droplets in suspension).
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • Assume w’ > wand that saturation is not reached at any time (except eventually when the final state is achieved). • Liquid water evaporates so the mixing ratio increases from w to w’. • As water evaporates, it takes up heat of vaporization from moist air and water (system is adiabatically isolated). • Cooling results reducing temperature from Tto T’. • At any instant, the system state differs finitely from saturation – process is spontaneous and irreversible.
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • Equivalent temperature(isobaric equivalent temperature) Tei, is defined as the temperature moist air would reach if it were completely dried by condensation of all its water vapor. • Water is withdrawn in a continuous fashion, process is performed isobarically, and system is thermally isolated. • The formulation assumes no liquid water initially and starts from an infinitesimal variation dH, condensing
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • In this expression, dmv is considered negative, i.e., we are condensing a mass dmv of vapor to liquid. • Having condensed this infinitesimal amount of liquid, we remove it before condensing any more vapor. • The enthalpy of the system will decrease by hwdmv, but T is not affected. • For the next infinitesimal condensation, the equation is valid with a new value of mv. • Our equation describes the process with mv as a variable.
Chapter 7 – Moist Air • Equivalent and Wet-Bulb Temperatures • Dividing through by md, and rewriting the differentials as differences, we get • Assuming the latent heat to be constant, we get • Assuming Ti = T, Tf= Tei, wi = w, and wf = 0, we get • Leading to equivalent temperature
