# Streeter-Phelps equation

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The Streeter-Phelps equation is used in the study of water pollution as a water quality modelling tool. The model describes how dissolved oxygen (DO) decreases in a river or stream along a certain distance by degradation of biochemical oxygen demand (BOD). The equation was derived by Streeter and Phelps in 1925, based on field data from the Ohio River. The equation is also known as the DO sag equation.

## Streeter-Phelps equation

The Streeter-Phelps equation determines the relation between the dissolved oxygen concentration and the biological oxygen demand over time and is a solution to the linear first order differential equation

${\frac {\partial D}{\partial t}}=k_{1}L_{t}-k_{2}D$ This differential equation states that the total change in oxygen deficit (D) is equal to the difference between the two rates of deoxygenation and reaeration at any time.

The Streeter-Phelps equation, assuming a perfectly mixed stream at steady state is then

$D={\frac {k_{1}L_{a}}{k_{2}-k_{1}}}(e^{-k_{1}t}-e^{-k_{2}t})+D_{a}e^{-k_{2}t}$ where

$k_{1}$ lies typically within the range 0.05-0.5 $d^{-1}$ and $k_{2}$ lies typically within the range 0.4-1.5 $d^{-1}$ .
The Streeter-Phelps equation is also known as the DO sag equation. This is due to the shape of the graph of the DO over time.

### Minimum oxygen deficit

On the DO sag curve a minimum concentration occurs at some point, along a stream. If the Streeter-Phelps equation is differentiated with respect to time, and set equal to zero, the time at which the minimum DO occurs is expressed by

$t_{crit}={\frac {1}{k_{2}-k_{1}}}\ln {\left[{\frac {k_{2}}{k_{1}}}\left({1-{\frac {D_{a}(k_{2}-k_{1})}{L_{a}k_{1}}}}\right)\right]}$ To find the value of the critical oxygen deficit, $D_{crit}$ , the Streeter-Phelps equation is combined with the equation above, for the critical time, $t_{crit}$ . Then

$D_{crit}={\frac {k_{1}}{k_{2}}}e^{(-k_{1}-k_{2})t_{crit}}$ and thus the minimum dissolved oxygen concentration is

$DO_{crit}=DO_{sat}-D_{crit}$ It should be noted that, mathematically it is possible to get a negative value of $DO_{crit}$ , even though it is not possible to have a negative amount of DO in reality.

The distance travelled in a river from a given point source pollution or waste discharge downstream to the $DO_{crit}$ (which is the minimum DO) is found by

$x_{crit}=vt_{crit}$ ### Estimation of reaeration rate

Several estimations of the reaeration rate exists, which generally follow the equation

$k_{2}=Kv^{a}H^{-b}$ where

The constants depend on the system to which the equation is applied, i.e. the flow velocity and the size of the stream or river. Different values are available in the literature.

The software “International Hydrological Programme” applies the following equation derived on the basis of values used in published literature

$k_{2}=2.148v^{0.878}H^{-1.48}$ where

### Temperature correction

Both the deoxygenation rate, $k_{1}$ and reaeration rate, $k_{2}$ can be temperature corrected, following the general formula.

$k=k_{20}\theta ^{(T-20)}$ where

Normally θ has the value 1.048 for $k_{1}$ and 1.024 for $k_{2}$ . An increasing temperature has the most impact on the deoxygenation rate, and results in an increased critical deficit ($D_{crit}$ ), and $x_{crit}$ decreases. Furthermore, a decreased $DO_{sat}$ concentration occurs with increasing temperature, which leads to a decrease in the DO concentration.

### Mixing of rivers

When two streams or rivers merge or water is discharged to a stream it is possible to determine the BOD and DO after mixing assuming steady state conditions and instantaneous mixing. The two streams are considered as dilutions of each other thus the initial BOD and DO will be 

$L_{a}={\frac {L_{s}Q_{s}+L_{b}Q_{b}}{Q_{s}+Q_{b}}}$ and

$DO_{0}={\frac {DO_{s}Q_{s}+DO_{b}Q_{b}}{Q_{s}+Q_{b}}}$ where

### Numerical approach

Nowadays it is possible to solve the classical Streeter-Phelps equation numerically by use of computers. The differential equations are solved by integration.

## History

In 1925, a study on the phenomena of oxidation and reaeration in the Ohio River in the US was published by the sanitary engineer, Harold Warner Streeter and the consultant, Earle Bernard Phelps (1876–1953). The study was based on data obtained from May 1914 to April 1915 by the United States Public Health Service under supervision of Surg. W.H. Frost.

More complex versions of the Streeter-Phelps model were introduced during the 1960s, where computers made it possible to include further contributions to the oxygen development in streams. At the head of this development were O'Connor (1960) and Thomann (1963). O'Connor added the contributions from photosynthesis, respiration and sediment oxygen demand (SOD). Thomann expanded the Streeter-Phelps model to allow for multi segment systems.

## Applications and limitations

The simple Streeter-Phelps model is based on the assumptions that a single BOD input is distributed evenly at the cross section of a stream or river and that it moves as plug flow with no mixing in the river. Furthermore only one DO sink (carbonaceous BOD) and one DO source (reaeration) is considered in the classical Streeter-Phelps model. These simplifications will give rise to errors in the model. For example the model does not include BOD removal by sedimentation, that suspended BOD is converted to a dissolved state, that sediment has an oxygen demand and that photosynthesis and respiration will impact the oxygen balance.

## Expanded model

In addition to the oxidation of organic matter and the reaeration process, there are many other processes in a stream which affect the DO. In order to make a more accurate model it is possible to include these factors using an expanded model.

The expanded model is a modification of the traditional model and includes internal sources (reaeration and photosynthesis) and sinks (BOD, background BOD, SOD and respiration) of DO. It is not always necessary to include all of these parameters. Instead relevant sources and sinks can be summed to yield the overall solution for the particular model. Parameters in the expanded model can be either measured in the field or estimated theoretically.

### Background BOD

Background BOD or benthic oxygen demand is the diffuse source of BOD represented by the decay of organic matter that has already settled on the bottom. This will give rise to a constant diffuse input thus the change in BOD over time will be

${\frac {dL}{dt}}=-k_{1}L+L_{b}$ where

### Sedimentation of BOD

Sedimented BOD does not directly consume oxygen and this should therefore be taken into account. This is done by introducing a rate of BOD removal combined with a rate of oxygen consumption by BOD. Giving a total rate for oxygen removal by BOD 

$k_{r}=k_{1}+k_{3}$ where

The change in BOD over time is described as

${\frac {dL}{dt}}=-k_{r}L$ ### Sediment oxygen demand Measurement of SOD using an oxygen electrode. A: Water, B: Sediment, C: Box, D: Oxygen electrode.

Oxygen can be consumed by organisms in the sediment. This process is referred to as sediment oxygen demand (SOD). Measurement of SOD can be undertaken by measuring the change of oxygen in a box on the sediment. The change in oxygen deficit due to consumption by sediment is described as

${\frac {dD}{dt}}=-k_{2}D+{\frac {S}{H}}$ where

The range of the SOD is typically in the range of 0.1 – 1 ${\tfrac {g}{m^{2}d}}$ for a natural river with low pollution and 5 – 10 ${\tfrac {g}{m^{2}d}}$ for a river with moderate to heavy pollution.

### Nitrification

Ammonium is oxidized to nitrate under aerobic conditions

NH4+ + 2O2 → NO3- + H2O + 2H+

Ammonium oxidation can be treated as part of BOD, so that BOD = CBOD + NBOD, where CBOD is the carbonaceous biochemical oxygen demand and NBOD is nitrogenous BOD. Usually CBOD is much higher than the ammonium concentration and thus NBOD often does not need to be considered. The change in oxygen deficit due to oxidation of ammonium is described as

${\frac {dD}{dt}}=k_{N}N-k_{2}D$ where

### Photosynthesis and respiration

Photosynthesis and respiration are performed by algae and by macrophytes. Respiration is also performed by bacteria and animals. Assuming steady state (net daily average) the change in deficit will be

${\frac {dD}{dt}}=-k_{2}D+(R+P)_{avg}$ where

Note that BOD only includes respiration of microorganisms e.g. algae and bacteria and not by macrophytes and animals.

Due to the variation of light over time, the variation of the photosynthetic oxygen can be described by a periodical function over time, where time is after sunrise and before sunset

$P(t)=P_{max}sin\left({\frac {\pi }{f}}+(t-t_{s})\right)$ where

This contribution was made originally as part of the Water Pollution course at the Technical University of Denmark in 2011.