Specific speed Ns, or suction specific speed, is a quasi non-dimensional number used to classify pump impellers as to their type and proportions. In Imperial units it is defined as the speed in revolutions per minute at which a geometrically similar impeller would operate if it were of such a size as to deliver one gallon per minute against one foot of hydraulic head. In metric units flow may be in l/s or m³/s and head in m, and care must be taken to state the units used.

Performance is defined as the ratio of the pump or turbine against a reference pump or turbine, which divides the actual performance figure to provide a unitless figure of merit. The resulting figure would more descriptively be called the "ideal-reference-device-specific performance." This resulting unitless ratio may loosely be expressed as a "speed," only because the performance of the reference ideal pump is linearly dependent on its speed, so that the ratio of [device-performance to reference-device-performance] is also the increased speed the reference device would need to turn, in order to produce the performance, instead of its reference speed of "1 unit."

Specific speed is used in engineering design where it is thought of as an index used to predict desired pump or turbine characteristics; e.g., the general shape of a pump's impeller. Often it is used to predict the type of pump or turbine required for a design flow rate and head. Once the desired specific speed is known, basic dimensions of the unit's components can be easily calculated.

Several mathematical definitions of specific speed (all of them actually ideal-device-specific) have been created for different devices and applications.

Pump specific speed

Low-specific speed radial flow impellers develop hydraulic head principally through centrifugal force. Pumps of higher specific speeds develop head partly by centrifugal force and partly by axial force. An axial flow or propeller pump with a specific speed of 10,000 or greater generates its head exclusively through axial forces. Radial impellers are generally low flow/high head designs whereas axial flow impellers are high flow/low head designs.

Centrifugal pump impellers have specific speed values ranging from 500 to 10,000 (English units), with radial flow pumps at 500-4000, mixed flow at 2000-8000 and axial flow pumps at 7000-20,000. Values of specific speed less than 500 are associated with positive displacement pumps.

As the specific speed increases, the ratio of the impeller outlet diameter to the inlet or eye diameter decreases. This ratio becomes 1.0 for a true axial flow impeller.

\(N_s = \frac { n \sqrt Q } { (gH)^{ 3/4 } } \)

where:

\[N_s\] is specific speed (unitless) \[n\] is pump rotational speed (revolutions per seconds) \[Q\] is flowrate (m³/s) at the point of best efficiency \[H\] is total head (m) per stage at the point of best efficiency \[g\] is acceleration due to gravity (m/s²)

Note that the units used affect the specific speed value and consistent units should be used for comparisons. Pump specific speed can be calculated using British gallons or using Metric units (m3/s or L/s and metres head), changing the values listed above.

Net suction specific speed

The net suction specific speed is mainly used to see if there will be problems with cavitation during the pump's operation on the suction side [1]. It is defined by centrifugal and axial pumps' inherent physical characteristics and operating point [2]. The net suction specific speed of a pump will define the range of operation in which a pump will experience stable operation [3]. The higher the net suction specific speed, then the smaller the range of stable operation. The envelope of stable operation is defined in terms of the best efficiency point of the pump.

The net suction specific speed is defined as[4]\[ N_{ss} = \frac{N\sqrt{Q}} {{NPSH}_R^{0.75}} \]

where:

\[N_{ss} = \]net suction specific speed \[N = \]rotational speed of pump in rpm \[Q = \]flow of pump in US gallons per minute \[{NPSH}_R = \] Net positive suction head (NPSH) required in feet at pump's best efficiency point

Turbine specific speed

The specific speed value (radian/second) for a turbine is the speed of a geometrically similar turbine which would produce one unit of the specific speed of a turbine is given by the manufacturer (along with other ratings) and will always refer to the point of maximum efficiency. This allows accurate calculations to be made of the turbine's performance for a range of heads.

Well-designed efficient machines typically use the following values: Impulse turbines have the lowest ns values, typically ranging from 1 to 10, a Pelton wheel is typically around 4, Francis turbines fall in the range of 10 to 100, while Kaplan turbines are at least 100 or more, all in imperial units[5].



\( n_s=n\sqrt{P}/H^{5/4} \) (dimensioned parameter), \( n\) = rpm [6]


where: \[\Omega\] = angular velocity (radians per second) \[H_n\] = Net head after turbine and waterway loss (m) \[Q\] = water flow (m³/s)

  • \(N\) = Wheel speed (rpm)
  • \(P\) = Power (kW)
  • \(H\) = Water head (m)


English units

Expressed in English units, the "specific speed" is defined as ns = n√(P)/h5/4

  • where n is the wheel speed in rpm
  • P is the power in horsepower
  • h is the water head in feet

Metric units

Expressed in metric units, the "specific speed" is ns = 0.2626 n√(P)/h5/4

  • where n is the wheel speed in rpm
  • P is the power in kilowatts
  • h is the water head in meters

The factor 0.2626 is only required when the specific speed is to be adjusted to English units. In countries which use the metric system, the factor is omitted, and quoted specific speeds are correspondingly larger.[citation needed]

Example

Given a flow and head for a specific hydro site, and the RPM requirement of the generator, calculate the specific speed. The result is the main criteria for turbine selection or the starting point for analytical design of a new turbine. Once the desired specific speed is known, basic dimensions of the turbine parts can be easily calculated.

Turbine calculations:

\[ N_s=\frac{2.294}{H_n^{0.486}} \]

\[ D_e=84.5(0.79+1.602 N_s) \frac{\sqrt{H_n}}{60 * \Omega} \]

\[ D_e\] = Runner diameter (m)


References

  1. "Specific speed". McNally Institute. http://www.mcnallyinstitute.com/09-html/09-12.html. Retrieved 2007-07-13.
  2. "NPSH and Suction Specific Speed - Goulds Pumps - ITT Corporation". ITT Corporation. http://www.gouldspumps.com/cpf_0008.html. Retrieved 2007-07-13.
  3. "Article #3: Suction Specific Speed (NSS)". Pumping Machinery. http://www.pumpingmachinery.com/pump_magazine/pump_articles/article_03/article_03.htm. Retrieved 2007-07-13.
  4. "Specific Suction Speed for Pumps". Engineering Toolbox. http://www.engineeringtoolbox.com/suction-speed-pumps-d_638.html. Retrieved 2007-07-13.
  5. Technical derivation of basic impulse turbine physics, by J.Calvert
  6. Script error

See also

pl:Wyróżnik szybkobieżności