EVAPCALC SOFTWARE FOR THE DETERMINATION OF DAM EVAPORATION AND SEEPAGE

EVAPCALC SOFTWARE FOR THE DETERMINATION OF DAM EVAPORATION AND SEEPAGE Authors: Ian Craig, Erik Schmidt and Nigel Hancock Affiliation: Faculty of Engineering and Surveying (FOES National Centre for Engineering in Agriculture (NCEA Cooperative Research Centre for Irrigation Futures (CRC-IF Australian Centre for Sustainable Catchments (ACSC University of Southern Queensland (USQ Email: craigi@usq.edu.au ABSTRACT Irrigation accounts for approximately two thirds of fresh water use across Australia, and evaporative loss from a million or so small dams constitutes a significant wastage of this valuable resource. The Pressure Sensitive Transducer / Automatic Weather Station (PST/AWS technique can be used to quantify the rate of evaporative loss from farm dams, and distinguish this from seepage occurring through the dam walls and floor. EvapCalc version 3.0 software calculates dam evaporation based upon established Penman-Monteith theory, and also Morton s dry to wet transition algorithm for small ponds. Model outputs will be compared against direct measurements of moisture flux obtained using floating Eddy Covariance (ECV equipment, and also DamCFD, a FLUENT based model developed at the University of Southern Queensland. Keywords Evaporation, Farm Dam, Advection INTRODUCTION Background and aims A technique to evaluate dam evaporation and seepage known as the AWS/PST method was developed as part of the Queensland Dept of Natural Resources and Water (NRW Evaporation Control Project (Craig et al 1995. The method relies on an accurate independent estimation of dam evaporation and that is what EvapCalc software attempts to do. The procedure is based on an industry standard method FAO56 described adequately by Allen el al 1998. From recorded meteorological variables, the FAO56 method predicts reference evapotranspiration (ETo according to Penman-Monteith theory (P-M, with albedo and aerodynamic and surface resistance values fixed and appropriate for moist grass with a height of 12mm. The measured evapotranspiration from a particular crop is then related to ETo via a crop factor, k crop. A similar approach is described in this paper, whereby, the evaporation from a particular dam may be related to ETo via a dam factor, k dam.

METHOD Analysis procedure The analysis of data simply relies on the water balance of a dam or water storage over a specified time interval which may be expressed as Q in + P + δd = Q out + S + E 1 where Q in is the inflow, P is precipitation, δd is the change in level measured using a PST unit, Q out is the outflow, S is seepage and E is the evaporation rate (all in mm/day. To increase accuracy of this analysis, tests on dams are usually carried out when Q in, Q out and P are zero. The change in water depth δd is measured with PST unit(s. The evaporation term E can be estimated from the Bureau of Meteorology SILO database, or, as indicated above, from AWS-recorded meteorological parameters obtained at the actual dam site using the Penman-Monteith equation (Jensen, 2005 and Craig, 2006. These techniques offer potentially more accurate estimates since cloud cover and local windspeed are actually measured at the site, but precautions have to be taken to ensure that all meteorological parameters are measured and logged accurately, particularly solar radiation. Water depth measurement using PST instrumentation Pressure sensitive transducers (PSTs were used to precisely measure water depth and therefore accurately determine seepage and evaporation loss. Water depth was measured to an accuracy of approximately ±1mm was achieved using submersible PST units with custom (per unit compensation for water temperature variation. Each PST unit was placed at a constant 30cm height above the dam floor by a float-weight arrangement as illustrated in Figure 1. float Pressure Sensitive Transducer cable ties rope weight Figure 1 The PST water depth sensor suspension mechanism (schematic.

The PST type used in the original NRW study was a vented Druck (PMP 4030 350mbar sensor with a stated accuracy of ±0.04% (±1.4mm over a 3.5m range. The unit measures depth pressure according to the electrical resistivity of a deforming micro-machined silicon crystal, isolated from the water with a corrosion resistant diaphragm. Water pressure is measured relative to atmospheric pressure which is provided by a crushproof air tube inside the transducer cable. An Intech Nomad GP-HR 12 bit datalogger recorded PST outputs including time and date, instantaneous, minimum, maximum and average water depth over 15 minute time intervals. Evaporation estimation using AWS instrumentation Environdata WeatherMaster 2000 automatic weather stations were set up to read every second and record 15 minute averages of solar radiation, temperature, windspeed, humidity and rainfall. These meteorological parameters were logged every 15 minutes and then inserted into a standard Penman-Monteith (P-M equation. For convenience, the industry standard P-M described in Allen 1998 (strictly for crop evapotranspiration or ETo was used. The P-M method is known as a combination method, so called because they properly combine both radiation and aerodynamic energies into one equation. They were first introduced by Penman in 1948. The Penman (1948 equation is as follows ' ( $ ' $ * E = % " ( R n! G + % " f ( u ( e s! e a & ( + # & ( + # RADIATION AERODYNAMIC 2 The original Penman 1948 equation was modified by Monteith in 1965 to incorporate a surface resistance in addition to an aerodynamic resistance term, and this is the form of the equation used in EvapCalc software. The equations are taken directly from Allen et al (1998 and are as follows :- ET 0 0.408! ( R = n 900 " G + # u2 ( e T + 273! + # (1 + 0.34u 2 s " e a 3 - = &, 17.27T # 4098$ 0.6108exp* ' 237.3! % + T + (" 2 ( T + 237.3 4 c p P # = = 0.067 5!" 5.26 & 293 ' 0.0065z # P = 101.3$! 6 % 293 " & 17.27T # e s = 0.6108exp $ % T + 237.3! 7 "

l o p e o f t h e s a t u r a t e d v a p o u r p r e s s u r e t e m p e r a t u r e c u r v e w h e r e T i s a i r t e m p e r a t u r e ( C n e t r a d i a t i o n ( M J / m s o i l h e a t f l u x ( M J / m p s y c h r o m e t r i c c o n s t a n t 0. 0 6 7 ( k P a C w i n d s p e e d a t 2 m h e i g h t ( m / s a t m o s p h e r i c p r e s s u r e 1 0 1. 3 ( k P a w h e r e z i s e l e v a t i o n a b o v e s e a l e v e l ( m r a t i o o f t h e m o l e c u l a r w e i g h t o f w a t e r v a p o u r / d r y a i r 0. 6 2 2 l a t e n t h e a t o f v a p o u r i s a t i o n, 2. 4 5 ( M J k g s a t u r a t e d v a p o u r p r e s s u r e ( k P a a c t u a l v a p o u r p r e s s u r e ( k P a w h e r e R H i s t h e r e l a t i v e h u m i d i t y ( f r o m A W S s u r f a c e a l b e d o ( a s s u m e d 0. 2 3 l o n g w a v e r a d i a t i o n ( M J / m RH. e e s a = 8 100 R = ( 1! " R! R 9 n s l R " T 4 (0.34! 0.14 e (1.35R / R! 0.35 10 l = a s so so ( 0.25 + 0. R a R = 5 11 Gu! c eet P R "# % $ as 2p ns l 0 s reference evapo transpiration (mm/day 2 /day 2 /day -1 specific heat at constant pressure 1.013 x 10-3 (MJ kg -1 C -1-1 (1/2.45 = 0.408 total radiation from AWS, or calculated from eqn 19, wher e a= 0.25, b= 0.5, n is actual duration of sunshine hours, N is maximum possible duration of sunshine hours (for clear skies n=n and R s = R so and R a is the average daily extraterrestrial solar radiation (from tables 2 /day where & is Stefan -Boltzmann constant = 4.903 MJ/m 2 /K 4 /day Dam factor based on Morton Dry to Wet transition algorithm A rough estimate for the seepage loss at a particular dam site is then simply the difference between the δd and E (or ETo terms of equation (1 derived using FAO56 methodology. However, to increase the accuracy of this analysis, particularly for small dams, it needs to be assumed that E dam = k dam x ETo 12 where K dam is a dam factor which relates evaporation of the dam to the FAO56 Penman- Monteith estimate. It was pointed out by Brutsaert (1982 and Morton (1983, that due to the advective flow of warm dry air, there is increased evaporation at the upwind dry to wet transition. This effect can be ignored for large dams and lakes, but is significant and cannot be ignored for ponds or other small bodies of water. The nature of the transition is shown in Figure 2 which show the evaporation from small Petri dishes at the edge of recently irrigated cotton field in the Sudan Gezira.

Figure 2 Davenport and Hudson (1967 comparison of evaporation rates (measured using 113mm x 36mm dishes across irrigated cotton fields on December 27th, 1963 The evaporation in dishes at the upwind edge of the field is analogous to the potential evaporation in the land environment, E P, whereas the evaporation at the downwind edge of the field approaches a low constant value that is analogous to open water or lake evaporation, E L. The transition can be approximated by E = E + ( E! E /(1 X / C 13 PX L P L + in which E PX is the potential evaporation at distance X downwind of the upwind shoreline, E P is the potential evaporation upwind of the lake, and E L is the deep lake evaporation (ie. the potential evaporation downwind of the transition and C is a constant. In Figure 3, the value of C is 8m for the wet field, 10m for the moist field and 30m for the dry field. A simplified representation of the situation for a wet field, assumed broadly similar to that of a lake, is presented in Figure 4. Potential evaporation, E P Actual evaporation, E L DRY WET X Figure 3 Morton s dry to wet transition The average evaporation for a lake that is Xm long in the downwind direction and also Xm wide in the crosswind direction, (E LX, can be estimated from integration of equation 1 as follows :-

E LX ln(1 + X / C = EL + ( EP! EL 14 X / C 2 1.9 1.8 Morton's Average Evaporation for lake with a downwind dimension of Xm Morton's Potential Evaporation at Xm downwind of the transition boundary Dam Factor (Kdam. 1.7 1.6 1.5 1.4 1.3 1.2 1.1 1 0 100 200 300 400 500 600 700 800 900 1000 Length of Dam (m Figure 4 Results of equations 13 and 14 plotted out with a value of 8m assumed for the constant C. The true value of this constant needs to be verified using the Eddy Covariance Technique. RESULTS Comparison of the P-M with Morton estimates The appropriateness of using the ETo values derived via the FAO56 formulation of the Penman-Monteith equation (Allen et al, 1998 as indicative of open water evaporation is often regarded as open to question. However, Figure 3 shows a comparison of daily data from the SILO database (patched point datasets available at www.nrw.qld.gov.au/silo/ for the St George region, South Queensland, from the 1st January 2005 to the 26th November 2006, in which four alternative evaporation equations offered by Morton (1983 are plotted against daily FAO56 ETo. These are i Morton Potential Evaporation (point source evaporation in a dry environment, ii Morton Lake Evaporation (open water, iii Morton Wet Environment (representing a recently irrigated field and iv Morton Actual Evaporation (limited according to water availability.

FAO 56 v Morton for 1 Jan 05 to 26 Nov 06 - St George 10 9 8 7 6 Morton (mm 5 4 3 2 1 0 0 1 2 3 4 5 6 7 8 9 10 FAO 56 (mm Lake Potential Actual Wet Figure 5 Comparison of point potential evaporation (square, Morton s Lake evaporation (diamond, Morton s Wet Environment evaporation (triangle and Morton s Actual evaporation (circle all plotted against the FAO56 Penman-Monteith ETo estimates. Figure 5 shows that both ii and iii above are in close agreement with the estimates derived via FAO56 such that the FAO56 ETo equation suggesting that its use is acceptable for the estimation of open water evaporation. (Further analyses are provided in Morrison and Craig, 2007. Typical PST/AWS dataset A typical result set is presented in Figure 6 where eighteen days of water depth data obtained from a Pressure Sensitive Transducer (PST unit is compared to the AWS dam evaporation estimate predicted using EvapCalc version 3.0 software. Both PST and AWS instruments were continuously logged over the period, with depth and meteorological variables recorded every 15 minutes.

1480 1470 PST data (Coolibah P-M (7.5mm/day seepage 1460 Depth (mm. 1450 1440 1430 1420 3/2 4/2 5/2 6/2 7/2 8/2 9/2 10/2 11/2 12/2 13/2 14/2 15/2 16/2 17/2 18/2 19/2 20/2 21/2 22/2 Date Figure 6 Graph of PST derived water depth data (thick pink line with two instances where there was inflow of water to the dam from rainfall. Superimposed on the PST trace is a prediction of evaporation produced by EvapCalc software (thin black line based upon Penman-Monteith (P-M theory with a Morton based advection correction for the dry to wet transition. Resulting software design EvapCalc 3.0 flow diagram governing software design 8 May 2007 Dam morphometry ie. length or typical dimension Kdam (Morton SILO FAO56 ETo Dam Evap Radiation Windspeed Temperature Humidity AWS Seepage PST Water depth Figure 7 Software design process

EvapCalc v 3.0 Lake Typical Dimension (m 200 K dam 1.13 Ra Rs u T RH e s R l! G ETo cum MJ/m?/d Wm-2 m/s C % mm/hr 40 950 3 40 30 7.38 20.7 0.39 100 0.69 0.69 1 enter a value for Ra according to the month / latitude 1 if Rs data is in MW m -2 d -1 then convert to W m -2 (x 10 6 /3600/24 2 watch out that Rs sensor is giving sensible data (< 1000 Wm -2 3 if u data is in km/hr then convert to m/s (x1000/3600 4 if met data is every 15min then divide hourly by 4 SE Qld Jan 43.1 499 Feb 39.6 458 Mar 34.3 50 397 Apr 27.2 315 40 May 21.4 248 Jun 18.5 30 214 Jul 19.6 20 227 Aug 24.3 281 Sep 31.1 10 360 Oct 37.5 434 0 Nov 42.0 486 Dec 43.9 508 Jan Feb Average daily extra-terrestrial radiation (MJm-2day-1 (latitude -30 degrees Mar Apr May Jun Jul Aug Sep Oct Nov Dec Figure 8 Layout of EvapCalc version 3.0 data input table CONCLUSION The PST/AWS analysis method is described where logged water depth data obtained from Pressure Sensitive Transducer (PST units is compared to 15-minute Penman-Monteith-based estimates of evaporation derived from an adjacent automatic weather station (AWS The PST/AWS method has confirmed that evaporation losses in small farm dams is typically 4-7mm/day in summer, rising to 10mm/day when air temperatures exceeded 40 C. The method has enabled dam evaporation to be separated from seepage losses (Craig, 2006. Seepage values for Australian farm dams were found to be very variable, from almost nothing to several millimetres per hour. The analysis also revealed that Australian summer night-time evaporation due to heat advection effects (Brutsaert, 1982 ranged from 10 to 30% of the total daily evaporation. This paper has implied that that a correction algorithm suggested by Morton 1983 is reasonable to describe the advection effects arising from passage of hot dry air across the dry to wet upwind boundary of a dam Clearly, the value of k dam introduced in equation (2 is likely to be a complex function of general dam morphometry, and this may be expected to modify the

surface air flow and in turn heat exchange, water vapour exchange and in-dam water circulation. With the eventual objective of fully understanding and evaluating the nature of k dam, an analysis of the mass and energy flows over a typical small day has been commenced using computational fluid dynamics (CFD and dubbed DamCFD. Preliminary results have been described in Craig et al. (2006. Data eventually generated by DamCFD for a variety of weather conditions and dam morphometries will hopefully provide the basis for a simple dam factor-based algorithm to relate farm dam evaporation to simple indices such as the P-M formula. It is hoped that in time the model will be fully validated using remote sensing, laser or eddy correlation techniques. These will be used to obtain real time nonequilibrium measurements of evaporative flux within the dry to wet boundary transition region and across the dam as a whole, and may be useful for validating the transition algorithm for small ponds suggested by Morton (1983. In the shorter term, experimental trials with petri dishes would almost certainly lead to increased confidence and refinement of the value assumed for constant C in Morton s algorithm for the dry to wet transition at a dam boundary. REFERENCES Allen, R.G., Pereira, L.S., Raes, D., and Smith, M. 1998 Crop evapotranspiration guidelines for computing crop water requirements FAO Technical Paper 56, Food and Agriculture Organisation of the United Nations, Rome. Brutsaert, W.H. 1982 Evaporation into the atmosphere. Dordrecht, Holland. D. Reidel Publishing Co. Craig I, Green A, Scobie M and Schmidt, E. 2005 Controlling Evaporation Loss from Water Storages. National Centre for Engineering in Agriculture Publication 1000580/1, USQ, Toowoomba. http://www.ncea.org.au/ Craig, IP 2006 Comparison of precise water depth measurements on agricultural storages with open-water evaporation estimates. Agricultural Water Management 85 193-200. Craig, I., Mossad, R. and Hancock, N. 2006 Development of a CFD based dam evaporation model. International Symposium on Environmental Health, Climate Change and Sustainability, QUT Brisbane, 20-22 Nov, 2006 Jensen, M.E., Dotan, A. Sanford, R. 2005. Penman-Monteith estimates of reservoir evaporation. ASCE Library. Fort Collins, CO. Morrison, P. and Craig, I. (2007 Some evaporation comparisons for data obtained from the SILO database. Draft internal report under NCEA project number 1002040, USQ Morton, F.I. 1983 Operational estimates of lake evaporation. J. Hydrol. 66 77-100 Sartori, E. 2000 A critical review on equations employed for the calculation of the evaporation rate from free water surfaces. Solar Energy 68 77-89