Chapter 3: Energy State of Water in Soil

1. Chapter 3:Energy State of Water in Soil 100 cm3 soil Sand 20 Vol.-% H2O ? 100 cm3 soil Clay 20 Vol.-% H2O Petzold & Schwärzel : HSE

2. Ch. 3 Learning Objectives • Why can soils store water? • What are the driving forces for water movement in soils? • How can we measure these driving forces? Petzold & Schwärzel : HSE

3. Forces acting on Soil Water Petzold & Schwärzel : HSE

4. Electrostatic forces Water Soil • Water is bonded to • other water molecules by • cohesive (water-water) • forces • the soil surface by • adhesive (soil-water) forces Petzold & Schwärzel : HSE

5. Bond Strength of adsorped waterdependends on water film thickness From: Hartge & Horn Petzold & Schwärzel : HSE

6. Capillary Rise - Capillarity Source: Flühler et al. 2005 Petzold & Schwärzel : HSE

7. Surface Tension Petzold & Schwärzel : HSE Source: Jury & Horton 2004

8. Contact Angle γ Liquid moistened the surface = hydrophilic the surface is water repellent = hydrophobic Petzold & Schwärzel : HSE Source: Jury & Horton 2004

9. Why does water rise? Petzold & Schwärzel : HSE Source: Brady & Weil 1996

10. Calculate the height of rise of water in glass tube of radius R at equilibrium. 2 H in [m] r in [m] Petzold & Schwärzel : HSE

11. Capillary rise in a soil Source: Brady & Weil 1996 Petzold & Schwärzel : HSE

12. Take home messages • Every pore diameter is related to a suction. • The water filled pores and the corres-ponding diameter can be calculated at given suction. Petzold & Schwärzel : HSE

13. Soil Water & Energy • Kinetic energy: associated with motion • of minor importance (can be neglected in soils) • Potential energy: associated with position • of primary importance in determining the state and movement of water in soil Petzold & Schwärzel : HSE

14. The bow is able to store energy by virtue of its position . Potential Energy No energy is stored. Petzold & Schwärzel : HSE

15. Potential Energy m F s1 s0 Petzold & Schwärzel : HSE

16. Total Soil Water Potential • = the work that is required for moving a quantity of water from a reference state into the desired state within the soil. • The performance is reversible and isotherm. • = describes the energy density of soil water. Petzold & Schwärzel : HSE

17. Reference or Standard State • = pure water, • at atmosphere pressure, • at the same temperature as that of soil and, • constant elevation. • Soil water potential at the reference state is 0 (per definition). Petzold & Schwärzel : HSE

18. Units of Total Soil Water Potential Petzold & Schwärzel : HSE

19. Components of Soil Water PotentialΨ Petzold & Schwärzel : HSE

20. Osmotic potential Petzold & Schwärzel : HSE

21. Hydraulic Potential - Hydraulic Head Often, a simpler notation is used: H = z + h Petzold & Schwärzel : HSE

22. Soil Water Potential versus Soil Water Content Petzold & Schwärzel : HSE

23. Driving force for water movementwithin the soil Water moves from High to Low energy Flow path A = Area Distance = x Petzold & Schwärzel : HSE

24. Capillary tube with an internal solute membrane Petzold & Schwärzel : HSE

25. Direct Measurements of Components of Water Potential • Gravitational potential • Measure the vertical distance between the reference elevation and the point of interest. • Osmotic potential • Extract soil solution, measure its concentration. • Pneumatic potential • Measure the soil air pressure with a barometer. • Hydrostatic potential • Measure the vertical height of saturated water above the point of interest. Petzold & Schwärzel : HSE

26. Gravimetric Potential & Reference Elevation Petzold & Schwärzel : HSE

27. Measurement of the Matric Potential Petzold & Schwärzel : HSE

28. Tensiometer Petzold & Schwärzel : HSE

29. VariousTensiometers are available Petzold & Schwärzel : HSE

30. What is the matric potential at the cup? The pressure in the cup is: Related to the weight: a = porous cup b = vacuum gauge c = connecting tube d = rubber stopper Petzold & Schwärzel : HSE

31. Calculate the height of rise of water in glass capillary of Radius R placed in an open vessel of pure water. Assume the contact angle of the water on glass is zero. Assume that the evaporation of water is negligible. Analysis of Systems at Equilibrium Petzold & Schwärzel : HSE

32. The equilibrium principle to estimate components of the water potential 1. Verify that the system is at equilibrium. 2. Define a reference elevation and a reference air pressure. 3. Find a location in the sytem where YW may be estimated. Call this YWo value . 4. Set YW = YWo at the point of interest. 5. Divide YW into appropriate components. 6. Evaluate directly those components for which appropriate information at the point of interest is available. 7. Determine the remaining component or sum of components using the equation in step 4. Petzold & Schwärzel : HSE From Jury & Horton, 2004

33. From Jury & Horton, 2004 Height of rise of water in a clean glass capillary 1. The system will reach equilibrium as soon as the water in the capillary stops rising. 2. Define z = 0 at point A and po = Patm 3. At point A all components of YW may be evaluated. Yg = 0 (since z=0) Yo = 0 (pure water) Ya = 0 (P=po=patm) Ym = 0 (no soil) Yp = 0 (no overlying hydrostatic pressure) Thus, relative to the reference state, YW = 0 at A. 4. At point B, YW = 0 since B is at equilibrium with point A where YT = 0. 5. At point B, we have YW = Yg + Yo + Ya + Ym + Yp 6. By definition, at point B the components are Yg = rwgH Yo = 0 (pure water) Ya = 0 (P=po=patm) Ym = DP = -2s/R Yp = 0 (no overlying hydrostatic pressure) 7. YW = 0 = rwgH -2s/R  H = 2s/R rwg. Petzold & Schwärzel : HSE

34. No equilibrium  Hydraulic gradient Petzold & Schwärzel : HSE

35. Take home messages • Water is stored in soil because of electrostatic forces. • Soil water potential characterizes these forces and the energy density of soil water. • Water in soil moves spontaneously because of differences in the energy density of soil water. Petzold & Schwärzel : HSE