Hazen–Williams equation
The Hazen–Williams equation is an empirical relationship which relates the flow of water in a pipe with the physical properties of the pipe and the pressure drop caused by friction. It is used in the design of water pipe systems such as fire sprinkler systems, water supply networks, and irrigation systems. It is named after Allen Hazen and Gardner Stewart Williams.
The Hazen–Williams equation has the advantage that the coefficient C is not a function of the Reynolds number, but it has the disadvantage that it is only valid for water. Also, it does not account for the temperature or viscosity of the water.
General form
discovered that the velocity of a fluid was proportional to the square root of its head in the early 18th century. It takes energy to push a fluid through a pipe, and Antoine de Chézy discovered that the hydraulic head loss was proportional to the velocity squared. Consequently, the Chézy formula relates hydraulic slope S to the fluid velocity V and hydraulic radius R:The variable C expresses the proportionality, but the value of C is not a constant. In 1838 and 1839, Gotthilf Hagen and Jean Léonard Marie Poiseuille independently determined a head loss equation for laminar flow, the Hagen–Poiseuille equation. Around 1845, Julius Weisbach and Henry Darcy developed the Darcy–Weisbach equation.
The Darcy-Weisbach equation was difficult to use because the friction factor was difficult to estimate. In 1906, Hazen and Williams provided an empirical formula that was easy to use. The general form of the equation relates the mean velocity of water in a pipe with the geometric properties of the pipe and slope of the energy line.
where:
- V is velocity
- k is a conversion factor for the unit system
- C is a roughness coefficient
- R is the hydraulic radius
- S is the slope of the energy line
The conversion factor k was chosen so that the values for C were the same as in the Chézy formula for the typical hydraulic slope of S=0.001. The value of k is 0.001−0.04.
Typical C factors used in design, which take into account some increase in roughness as pipe ages are as follows:
| Material | C Factor low | C Factor high | Reference |
| Asbestos-cement | 140 | 140 | - |
| Cast iron new | 130 | 130 | |
| Cast iron 10 years | 107 | 113 | |
| Cast iron 20 years | 89 | 100 | |
| Cast iron 30 years | 75 | 90 | |
| Cast iron 40 years | 64 | 83 | |
| Cement-Mortar Lined Ductile Iron Pipe | 140 | 140 | – |
| Concrete | 100 | 140 | |
| Copper | 130 | 140 | |
| Steel | 90 | 110 | – |
| Galvanized iron | 120 | 120 | |
| Polyethylene | 140 | 140 | |
| Polyvinyl chloride | 150 | 150 | |
| Fibre-reinforced plastic | 150 | 150 |
Pipe equation
The general form can be specialized for full pipe flows. Taking the general formand exponentiating each side by gives
Rearranging gives
The flow rate, so
The hydraulic radius for a full pipe of geometric diameter is ; the pipe's cross sectional area is, so
U.S. customary units (Imperial)
When used to calculate the pressure drop using the US customary units system, the equation is:where:
- Spsi per foot = frictional resistance in psig/ft
- Pd = pressure drop over the length of pipe in psig
- L = length of pipe in feet
- Q = flow, gpm
- C = pipe roughness coefficient
- d'' = inside pipe diameter, in
SI units
where:
- S = Hydraulic slope
- hf = head loss in meters over the length of pipe
- L = length of pipe in meters
- Q = volumetric flow rate, m3/s
- C = pipe roughness coefficient
- d = inside pipe diameter, m