A drainage equation is an equation describing the relation between depth and spacing of parallel subsurface drains, depth of the watertable, depth and hydraulic conductivity of the soils. It is used in drainage design. A well known steady-state drainage equation is the Hooghoudt drain spacing equation. Its original publication is in Dutch. The equation was introduced in the USA by van Schilfgaarde.
In steady state, the level of the water table remains constant and the discharge rate equals the rate of groundwater recharge, i.e. the amount of water entering the groundwater through the watertable per unit of time. By considering a long-term average depth of the water table in combination with the long-term average recharge rate, the netstorage of water in that period of time is negligibly small and the steady state condition is satisfied: one obtains a dynamic equilibrium. Derivation of the equation
the design drain spacing can be found from the equation in dependence of the drain depth and drain radius. Drainage criteria
One would not want the water table to be too shallow to avoid crop yield depression nor too deep to avoid drought conditions. This is a subject of drainage research. The figure shows that a seasonal average depth of the water table shallower than 70 cm causes a yield depression
In 1991 a closed-form expression was developed for the equivalent depth that can replace the Hooghoudt tables: where:
x = 2π / L
F = Σ 4e−2nx/ n, with n = 1, 3, 5,...
Extended use
Theoretically, Hooghoudt's equation can also be used for sloping land. The theory on drainage of sloping land is corroborated by the results of sand tank experiments. In addition, the entrance resistanceencountered by the water upon entering the drains can be accounted for.
Amplification
The drainage formula can be amplified to account for :
anisotropric hydraulic conductivity, the vertical conductivity being different from the horizontal
drains of different dimensions with any width
Computer program
The amplified drainage equation uses an hydraulic equivalent of Joule's law in electricity. It is in the form of a differential equation that cannot be solved analytically but the solution requires a numerical method for which a computer program is indispensable. The availability of a computer program also helps in quickly assessing various alternatives and performing a sensitivity analysis. The blue figure shows an example of results of a computer aided calculation with the amplified drainage equation using the EnDrain program. It shows that incorporation of the incoming energy associated with the recharge leads to a somewhat deeper water table.
