Difference between revisions of "Bioretention: Sizing and modeling"
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In some situations, it may be possible to reduce the size of the bioretention required, by accounting for rapid drainage. Typically, this is only worth exploring over sandy soils with rapid infiltration. | In some situations, it may be possible to reduce the size of the bioretention required, by accounting for rapid drainage. Typically, this is only worth exploring over sandy soils with rapid infiltration. | ||
Note that narrow, linear bioretention features drain faster than round or blocky footprint geometries. | Note that narrow, linear bioretention features drain faster than round or blocky footprint geometries. | ||
− | *Begin the drainage time calculation by dividing the area of the practice (''A<sub> | + | *Begin the drainage time calculation by dividing the storage reservoir area of the practice (''A<sub>r</sub>'') by the perimeter (''x''). |
*Use the following equation to estimate the time (''t'') to fully drain the facility: | *Use the following equation to estimate the time (''t'') to fully drain the facility: | ||
− | :<math>t=\frac{nA_{ | + | :<math>t=\frac{nA_{r}}{f'x}ln\left [ \frac{\left (d_{r}+ \frac{A_{r}}{x} \right )}{\left(\frac{A_{r}}{x}\right)}\right]</math> |
{{Plainlist|1=Where: | {{Plainlist|1=Where: | ||
− | *''n'' is the porosity of the fill materials | + | *''n'' is the porosity of the storage reservoir fill materials |
− | *''A<sub> | + | *''A<sub>r</sub>'' is the storage reservoir footprint area (m<sup>2</sup>), |
− | *''f''' is the design infiltration rate (mm/ | + | *''f''' is the design infiltration rate of the native soil (mm/h), |
*''x'' is the perimeter of the practice (m), and | *''x'' is the perimeter of the practice (m), and | ||
− | *''d<sub> | + | *''d<sub>r</sub>'' is the depth of the storage reservoir (m).}} |
− | This 3 dimensional equation makes use of the hydraulic radius (''A<sub> | + | This 3 dimensional equation makes use of the hydraulic radius (''A<sub>r</sub>''/''x''), where ''x'' is the perimeter (m) of the facility. <br> |
Maximizing the perimeter of the facility directs designers towards longer, linear shapes such as [[bioswales]]. | Maximizing the perimeter of the facility directs designers towards longer, linear shapes such as [[bioswales]]. | ||
[[category: modeling]] | [[category: modeling]] | ||
[[category: infiltration]] | [[category: infiltration]] |
Revision as of 22:05, 28 May 2020
Before beginning the sizing calculations most of the following parameters must be known or estimated. The exceptions are the depth (dT) and practice permeable (footprint) area (Ap), as only one of these is required to find the other. Note that some of these parameters are limited:
- The maximum total depth will be limited by construction practices i.e. not usually > 2 m.
- The maximum total depth may be limited by the conditions underground e.g. the groundwater or underlying geology/infrastructure.
- The minimum total depth will be limited by the need to support vegetation (e.g not less than 0.6 m to support deep rooting perennials and shrubs).
- Bioretention has a maximum recommended catchment impervious area to practice permeable (footprint) area ratio, R (or I/P ratio) of 20.
Size a bioretention cell receiving flows directly to the storage reservoir for a constrained depth[edit]
If there is a constraint to the depth (dT) of the practice, calculate the required storage reservoir footprint area (Ar), as:
Where:
- Ar = Area of the infiltration practice storage reservoir (m2)
- Ai = Catchment impervious area (m2)
- D = Duration of design storm (h)
- i = Intensity of design storm (mm/h)
- f' = design infiltration rate (m/h)
- n' = Effective porosity of the fill materials within the active storage component(s) of practice, depth-weighted mean
- dr = Storage reservoir depth, based on depth available between the elevation of the invert of the underdrain perforated pipe and one (1) metre above the seasonally high water table or top of bedrock (m) or other value determined to be suitable through groundwater mounding analysis.
If R is greater than 20, consider decreasing catchment impervious area (Ai) by draining less area to the practice.
Size a bioretention cell with no underdrain for constrained ground area[edit]
If the land area is limited, determine the I/P ratio, which is the ratio of catchment impervious area (Ai) to practice pervious footprint area (Ap):
Where:
- R = Ratio of catchment impervious area to practice pervious footprint area, also referred to as I/P ratio
- Ap = Practice pervious footprint area in m2
- Ai = Catchment impervious area in m2
Then calculate the required depth (dT), as:
Where:
- D = Duration of design storm (h)
- i = Intensity of design storm (m/h)
- f' = Design infiltration rate (m/h)
- n' = Effective porosity of the fill materials within the practice, depth weighted mean
- dT = Total depth of infiltration practice (m).
The following equations assume that infiltration occurs primarily through the base of the facility. They may be easily applied for any shape and size of infiltration facility, in which the reservoir storage is filled with aggregate.
This spreadsheet tool has been set up to perform all of the infiltration BMP sizing calculations shown above
Calculate drawdown time[edit]
In some situations, it may be possible to reduce the size of the bioretention required, by accounting for rapid drainage. Typically, this is only worth exploring over sandy soils with rapid infiltration. Note that narrow, linear bioretention features drain faster than round or blocky footprint geometries.
- Begin the drainage time calculation by dividing the storage reservoir area of the practice (Ar) by the perimeter (x).
- Use the following equation to estimate the time (t) to fully drain the facility:
Where:
- n is the porosity of the storage reservoir fill materials
- Ar is the storage reservoir footprint area (m2),
- f' is the design infiltration rate of the native soil (mm/h),
- x is the perimeter of the practice (m), and
- dr is the depth of the storage reservoir (m).
This 3 dimensional equation makes use of the hydraulic radius (Ar/x), where x is the perimeter (m) of the facility.
Maximizing the perimeter of the facility directs designers towards longer, linear shapes such as bioswales.