Choked flow

	Main Article	Discussion	Related Articles  [?]	Bibliography  [?]	External Links  [?]	Citable Version  [?]
	This editable, developed Main Article is subject to a disclaimer. [edit intro]

The choked flow (often referred to as critical flow) of a flowing gas is a limiting point which occurs under specific conditions when the gas at a certain pressure and temperature flows through a restriction (such as a valve, a convergent-divergent nozzle, the hole in an orifice plate, or a leak in a gas pipeline or other gas container) into a lower pressure environment.

As the gas flows through the smaller cross-sectional area of the restriction, its velocity must increase. The limiting point is reached when the gas velocity increases to the speed of sound in the gas. At that point, the gas velocity becomes independent of the downstream pressure, meaning that the gas velocity can not be increased any further by further lowering of the downstream pressure. The physical point at which the choking occurs (i.e., the cross-sectional area of the restriction) is sometimes called the choke plane. It is important to note that although the gas velocity becomes choked, the mass flow of the gas can still be increased by increasing the upstream pressure or by decreasing the upstream temperature.

The choked flow of gases is useful in many engineering applications because, under choked conditions, valves and calibrated orifice plates can be used to produce a particular mass flow rate.

In the case of liquids, a different type of limiting condition (also known as choked flow) occurs when the Venturi effect acting on the liquid flow through the restriction decreases the liquid pressure to below that of the liquid vapor pressure at the prevailing liquid temperature. At that point, the liquid will partially "flash" into bubbles of vapor and the subsequent collapse of the bubbles causes cavitation. Cavitation is quite noisy and can be sufficiently violent to physically damage valves, pipes and associated equipment. In effect, the vapor bubble formation in the restriction limits the flow from increasing any further.^[1][2]

Conditions under which gas flow becomes choked

All gases flow from upstream higher pressure sources to downstream lower pressure environments. Choked flow occurs when the ratio of the absolute upstream pressure to the absolute downstream pressure is equal to or greater than:

${\displaystyle (1)}$     ${\displaystyle {\big [}(k+1)/2{\big ]}^{\,k/(k-1)}}$

where ${\displaystyle k}$ is the specific heat ratio of the discharged gas (sometimes called the isentropic expansion factor and sometimes denoted as ${\displaystyle \gamma }$ ).

For many gases, ${\displaystyle k}$ ranges from about 1.09 to about 1.41, and therefore the expression in (1) ranges from 1.7 to about 1.9, which means that choked velocity usually occurs when the absolute upstream vessel pressure is at least 1.7 to 1.9 times as high as the absolute downstream pressure.

Mass flow equations for the choked flow of gases

When the gas velocity is choked, the equation for the mass flow rate in SI metric units is: ^[3][4][5][6]

${\displaystyle {\dot {m}}\;=\;C\;A\;{\sqrt {\;k\;\rho _{u}\;P_{u}\;{\bigg (}{\frac {2}{k+1}}{\bigg )}^{(k+1)/(k-1)}}}}$

where the terms are defined as in listed below. If the upstream gas density, ${\displaystyle \rho _{u}}$ is not known directly, then it is useful to eliminate it using the Ideal gas law corrected for the real gas compressiblity:

${\displaystyle {\dot {m}}\;=\;C\;A\;P_{u}\;{\sqrt {{\bigg (}{\frac {\;\,k\;M}{Z\;R\;T}}{\bigg )}{\bigg (}{\frac {2}{k+1}}{\bigg )}^{(k+1)/(k-1)}}}}$

so that the mass flow rate is primarily dependent on the cross-sectional area ${\displaystyle A}$ of the hole and the upstream pressure ${\displaystyle P_{u}}$, and only weakly dependent on the temperature ${\displaystyle T}$. The mass flow rate does not depend on the downstream pressure at all. All other terms are constants that depend only on the composition of the gas.

where:
${\displaystyle {\dot {m}}}$	= mass flow rate, kg/s
${\displaystyle C}$	= discharge coefficient, dimensionless (usually about 0.72)
${\displaystyle A}$	= discharge hole area, m2
${\displaystyle k}$	= ${\displaystyle c_{p}/c_{v}}$ = specific heat ratio of the gas
${\displaystyle c_{p}}$	= specific heat capacity of the gas at constant pressure
${\displaystyle c_{v}}$	= specific heat capacity of the gas at constant volume
${\displaystyle \rho _{u}}$	= real gas upstream density, kg/m3 = ${\displaystyle (MP_{u})/(Z\,R\,T_{u})}$
${\displaystyle P_{u}}$	= absolute upstream pressure, Pa
${\displaystyle M}$	= the gas molecular mass, kg/kmole    (also known as the molecular weight)
${\displaystyle R}$	= the universal gas law constant = 8314.5 Pa·m3/(kmole·K)
${\displaystyle T_{u}}$	= absolute upstream gas temperature, K
${\displaystyle Z}$	= the gas compressibility factor at ${\displaystyle P_{u}}$ and ${\displaystyle T_{u}}$, dimensionless

The technical literature can be confusing because many authors do not explain whether they are using the universal gas law constant ${\displaystyle R}$ which applies to any ideal gas or whether they are using ${\displaystyle R_{s}}$ which only applies to a specific individual gas. The relationship between the two constants is ${\displaystyle R_{s}}$ = ${\displaystyle R/M}$.

If the gas flow restriction is a leak hole in a closed pressure vessel or a gas pipeline, then the above equations calculate the initial instantaneous mass flow rate for the pressure and temperature existing in the source vessel when the leak first occurs. The initial instantaneous flow rate from a leak in a pressurized gas system or vessel is much higher than the average flow rate during the overall release period because the upstream pressure and the flow rate decrease with time as the vessel or pipeline empties. Calculating the flow rate versus time since the initiation of the leak is much more complicated, but more accurate. A comparison between two methods for performing such calculations is available online.^[7]

Notes:

• The above equations are for a real gas.
• For an ideal gas, ${\displaystyle Z}$ = 1 and ${\displaystyle \rho _{u}}$ is the ideal gas density.
• kmole = 1000 moles

Minimum pressure ratio required for choked flow to occur

The minimum pressure ratios (also referred to as the critical pressure ratio) required for choked gas flow conditions to occur are presented in Table 1 for some industrial gases:

The above tabulated minimum pressure ratios were calculated by using the criterion that choked flow occurs when the ratio of the absolute upstream pressure to the absolute downstream pressure, ${\displaystyle P_{u}/P_{d}}$ is equal to or greater than ${\displaystyle {\big [}(k+1)/2{\big ]}^{\,k/(k-1}}$.

Thin-plate orifices

Experiments carried out by RG Cunningham (1951)^[9][10] demonstrated that the assumption that choked flow could occur for gases flowing through thin, square-edged orifice plates is not correct. The flow continued to increase as the downstream pressure was reduced to as low as 0.2 of the upstream pressure.^[11]

Cunningham’s work included tests using air and steam with the results and conclusions presented as tables, charts and formulas. Limited information was provided for the tests with steam.^[11]

Critical flow can, however, be expected for thick orifice plates (i.e., plates with a thickness of at least 6 times the orifice hole diameter).^[11]

References