CE-828 Advanced Geotechnical Design Part 2: Bearing capacity I Spring 2021 Dr. Badee Alshameri, PhD Head of Geotechnical Engineering Department NUST Institute of Civil Engineering (NICE) School of Civil & Environmental Engineering (SCEE) National University of Sciences and Technology (NUST) H-12, Islamabad, Pakistan Soil bearing capacity and Shallow Foundation What & Why Why is the function of foundation? transfer the load of the structure to the soil on which it is resting What using the foundation! To prevent the overstressing the soil. Thus prevent excessive settlement or shear failure of the soil, consequently preservation the structure form damage Soil bearing capacity and Shallow Foundation Types of foundations Common types of foundations are spread footing, mat foundation, pile foundation, and drilled shaft foundation Difference between shallow and deep foundation If the ratio of depth to embedment to the width of foundation is less than 4, it will call shallow foundation however, on the deep foundation the ratio will be greater than 4. (Das & Sobhan 2014) Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations According to Vesic (1973), there are three common types of failure; general shear failure, local shear failure, and punching shear failure Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Modes of foundation failure in sand (After Vesic, 1973) Where Dr is the relative density of sand and Df is the depth of foundation measured from the ground surface 2π΅πΏ π΅ ∗ = π΅+πΏ Vesic, A. S. (1973). “Analysis of Ultimate Loads of Shallow Foundations,” Journal of Soil Mechanics and Foundations Division, American Society of Civil Engineers, Vol. 99, No. SM1, pp. 45–73. Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Modes of foundation failure in sand (After Vesic, 1973) Where Dr is the relative density of sand and Df is the depth of foundation measured from the ground surface 2π΅πΏ π΅ ∗ = π΅+πΏ Vesic, A. S. (1973). “Analysis of Ultimate Loads of Shallow Foundations,” Journal of Soil Mechanics and Foundations Division, American Society of Civil Engineers, Vol. 99, No. SM1, pp. 45–73. Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi assume the following 1. General shear failure 2. Homogeneous soil 3. 2-D analysis 4. Vertical and concentric load 5. Horizontal surface 6. Depth of the foundation Df ≤ width of the foundation B 7. Neglecting the shear resistance above the foundation 8. The soil above the foundation level will be considered as surcharge 9. For sandy soil (c = 0), if ∅ ≥ 36 so it’s purely general shear failure while if ∅ ≤ 29 so it’s purely local shear failure 10. For ∅ - c soil, if the soil specimen shows failure below 5% it will be considered as general shear failure while if it shows failure between 10 to 20% it will be considered as local shear failure 11. For local shear failure, mobilized cohesion (cm) and mobilized friction angle (∅m)will be used, where cm = 2ΰ΅3 c & ∅m = tan−1 2ΰ΅3 tan ∅ Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi’s Bearing Capacity Theory According to Terzaghi (1943) has the following conditions: • The shallow foundation should have depth (Df) equal or less than the width of its width (B) • The general shear failure is used. • The failure surface plane will not extend to the surface • The effect of soil above the bottom of the foundation may also be assumed to be replaced by an equivalent surcharge: q = γ Df Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi’s Bearing Capacity Theory The failure zone under the foundation can be separated into three parts: 1. The elastic zone I 2. The radial shear zones II, 3. The Rankine passive zones III Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi’s Bearing Capacity Theory In the equilibrium state: ππ’ 2π 1 + π = 2πΆ sin ∅′ + 2ππ where b is the half of the foundation width, W is the weight of soil wedge = 2 1 ′ ππ tan ∅ 2 = πΎπ2 tan ∅′ C is the cohesive force acting along each face, AJ and BJ, that is equal to the unit cohesion times the length of π ′π each face cos ∅′ Thus 2πππ’ = 2π ′ π tan ∅′ + 2ππ − πΎπ2 tan ∅′ By dividing all on 2b: ππ’ = π ′ tan ∅′ + ππ π − πΎπ tan ∅′ 2 Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi’s Bearing Capacity Theory The passive pressure will be the sum of the contribution of the weight of soil, cohesion, and surcharge; ππ = 12πΎ π tan ∅′ 2 πΎπΎ + π ′ πΎπ π tan ∅′ + ππΎπ π tan ∅′ where πΎπΎ , πΎπ , ππππΎπ are earth-pressure coefficients that are functions of the soil friction angle ∅′ . Combining the previous equations will result: πΎπ ′ tan ∅ 2 tan ∅′ ππ’ = π ′ tan ∅′ + 12πΎπ tan ∅′ 2 πΎπΎ + π ′ πΎπ tan ∅′ + ππΎπ tan ∅′ − ππ’ = π ′ tan ∅′ 1 + πΎπ + 12πΎπ tan ∅′ tan ∅′ πΎπΎ − 1 + ππΎπ Replacing Nc, Ny, and Nq ππ’ = π ′ ππ + πππ + 12πΎπ΅ππΎ ** Terzaghi’s bearing-capacity equation Where ππ = tan ∅′ 1 + πΎπ ππΎ = 12 tan ∅′ tan ∅′ πΎπΎ − 1 ππ = πΎπ tan ∅′ Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi’s Bearing Capacity Theory For square and circular footings, Terzaghi suggested the following equations for ultimate soil-bearing capacity: For square footing ππ’ = 1.3π ′ ππ + πππ + 0.4πΎπ΅ππΎ For circular footing ππ’ = 1.3π ′ ππ + πππ + 0.3πΎπ΅ππΎ where B is the diameter of the footing For an undrained condition with ∅ = 0 and ππ = ππ’ , the bearing-capacity factors are Nγ= 0 and Nq = 1. Also, Nc = 5.7. ππ’ = 5.7π ′ ππ + π strip footing ππ’ = 1.3 5.7ππ’ + π = 7.41ππ’ + π square and circular footing Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi’s Bearing Capacity Theory - Using the table solution By referring to Terzaghi’s bearing capacity Factors ππ = tan ∅′ 1 + πΎπ ππΎ = 12 tan ∅′ tan ∅′ πΎπΎ − 1 ππ = πΎπ tan ∅′ It obviously that the factors depend totally on the friction angle, the table solution will depend on the variation of the friction angle Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Terzaghi’s Bearing Capacity Theory -Example Determine the gross allowable load per unit area (qall) that the footing can carry by continuous footing (using Terzaghi’s bearing-capacity factors). Assume general shear failure. Given: πΎ =17.5 kN/m3, c’ = 21 kN/m2, ∅′ = 32°, Df = 1 m, B = 1.5 m, and factor of safety =3. Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Effect of Groundwater Table ππ’ = π ′ ππ + πππ + 12πΎπ΅ππΎ Three different conditions can arise regarding the location of the groundwater table with respect to the bottom of the foundation Case I: If the groundwater table is located at a distance D above the bottom of the foundation, the magnitude of surcharge q at second term will be: π = πΎ π·π − π· + πΎ ′ π· and the unit weight of soil πΎ at third term will be πΎ ′ Case II: If the groundwater table coincides with the bottom of the foundation: π = πΎπ·π and the unit weight of soil πΎ at third term will be πΎ ′ Case III: When the groundwater table is at a depth D below the bottom of the foundation: π = πΎπ·π and the unit weight of soil πΎ at third term will be: 1 πΎππ£ = π΅ πΎπ· + πΎ ′ π΅ − π· πΎππ£ = πΎ For D > π΅ For D ≤ π΅ Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Effect of Groundwater Table- Example Determine the gross allowable load per unit area (Qall) that the footing can carry by square footing (using Terzaghi’s bearing-capacity factors). Assume general shear failure. Given: πΎ =16 kN/m3, : πΎπ ππ‘ =18.9 kN/m3, c’ = 17 kN/m2, ∅′ = 32°, Df = 1.2 m, h = 0.9 m, B = 1.75 m, and factor of safety = 3.5. Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Factor of Safety Generally, a factor of safety, Fs, of about 3 or more is applied to the ultimate soil-bearing capacity to arrive at the value of the allowable bearing capacity. An Fs of 3 or more is not considered too conservative The gross allowable bearing capacity is is the allowable load per unit area to which the soil under the foundation should be subjected to avoid any chance of bearing capacity failure ππππ = ππ’ πΉπ = π π·+πΏ +ππ +ππΉ π΄ The net allowable bearing capacity is the allowable load per unit area of the foundation in excess of the existing vertical effective stress at the level of the foundation The vertical effective stress at the foundation level is equal to π = πΎπ·π = ππ’(πππ‘) = ππ’ − π ππππ(πππ‘) = ππ’ − π π π·+πΏ = πΉπ π΄ ππ +ππΉ π΄ Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations General Bearing Capacity Equation Hansen (1970) proposed a general expression for bearing capacity considering the effects of shape, depth of foundation and inclination of applied load 1 ππ’ = π ′ πΉππ πΉππ πΉππ ππ + ππΉππ πΉππ πΉππ ππ + 2 π΅πΎπΉπΎπ πΉπΎπ πΉπΎπ ππΎ Where πΉππ , πΉππ , πππ πΉπΎπ is the shape factors, developed by De Beer (1970) πΉππ , πΉππ, πππ πΉπΎπ is the depth factors, developed by Hansen (1970) πΉππ , πΉππ, πππ πΉγπ is the inclination factors, developed by Meyerhof (1963) In Terzaghi’s bearing capacity the following factors are not considered: 1-Length of the footing 2- The ratio footing depth to width 3- inclination of the load on the foundation with respect to the vertical Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations General Bearing Capacity Equation 1 ππ’ = π ′ πΉππ πΉππ πΉππ ππ + ππΉππ πΉππ πΉππ ππ + 2 π΅πΎπΉπΎπ πΉπΎπ πΉπΎπ ππΎ Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations General Bearing Capacity Equation There are several solution for the bearing capacity factors which can be refer from many texts and references Group assignment 1 from 8-3-2021 to 22-3-2021 Review the empirical correlation to predict the friction angle using geotechnical field tests Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations 3.3 Notes in bearing capacity and settlement effective zone • The effective zone for considering the bearing capacity can be roughly calculated until depth below the foundation equal to B (B is the width of the foundation). • The effective zone for considering the settlement can be roughly calculated until depth below the foundation equal to 2B. • The soil below the level where the stress reach 10% of the actual applied stress, has no effect on the distribution of the bearing capacity Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Calculate the suitable dimension of foundation-Example Example 1 A sandy soil with dry and saturated unit weight of 16.5 kN/m3 and 18.5 kN/m3 respectively, has friction angle 340. A gross allowable load equal to 668 kN need to applied on square foundation placed on depth of 1.2 m where the depth of the water is 0.6 m and using factor of safety of FS. Determine the size of the foundation? Example 2 A square column foundation is to be constructed on a sand deposit (unit weight of 18 kN/m3 ) at depth 0.7 m and width of 1.25 m. The allowable load Q will be inclined at an angle β = 20° with the vertical and the friction angle of the soil is 30°. Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Meyerhof’s Method The bearing capacity equation was modified by Meyerhof (1963) to extend the surface of failure to the ground surface Meyerhof bearing capacity equation for strip footing is similar in the form of Terzaghi but the values of Nc, Nq, and Ny are different. The method generally overestimates the bearing capacity for the sandy soil because footings may fail from the settlement consideration much before the failure reaches the ground surface The method gives a good results for the clay soil Induvial assignment (Self-study) Compare Terzaghi and Meyerhof bearing capacity (advantage, limitation, recommendations) Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Vesic’s Method The failure surface at Vesic (1963) is similar to Terzaghi with the exception that zone I below the footing will be in ∅ active Rankine state with the inclined faces of 45 + 2 to the horizontal Group assignment 2 (8-3-2021 to 22-3-2021) Compare the reliability of Vesic (1963) to Terzaghi’s bearing capacity? Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Effect of Soil Compressibility The mode of bearing-capacity failure such as general shear failure, local shear failure and punching shear failure. The change of failure mode is due to soil compressibility, to account for which Vesic (1973) proposed the following modification of Eq. 1 ππ’ = π ′ πΉππ πΉππ πΉππ ππ + ππΉππ πΉππ πΉππ ππ + 2 π΅πΎπΉπΎπ πΉπΎπ πΉπΎπ ππΎ Where Fcc, Fqc, and Fγc are soil compressibility factors According to that theory, in order to calculate the soil compressibility factors, the following steps should be taken: Step 1: Calculate the rigidity index, Ir, of the soil at a depth approximately B/2 below the bottom of the foundation: πΌπ = πΊπ π ′ +π′ tan ∅′ Where Gs is the shear modulus of the soil and q’ is the effective overburden pressure at a depth of (Df + B/2) Step 2: The critical rigidity index, Ir(cr), can be calculated from the offered table in the next table Step 3: if πΌπ ≥ πΌπ ππ However if πΌπ < πΌπ , than Fcc= Fqc, = Fγc =1 ππ , use the offered tables in the next slide Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Effect of Soil Compressibility Step 2: The critical rigidity index, Ir(cr), can be calculated from the offered table in the next table Variation of Ir(cr) with ø’ and B/L (Das 2016) Soil bearing capacity and Shallow Foundation Ultimate Soil-Bearing Capacity for Shallow Foundations Effect of Soil Compressibility Step 3: if πΌπ ≥ πΌπ ππ Then, Fcc= Fqc, = Fγc =1 However if πΌπ < πΌπ ππ , use the graphical solutions for Fqc, and Fγc For ∅′ = 0, π΅ πΉππ = 0.32 + 0.12 πΏ + 0.6 log πΌπ For ∅′ > 0 1−πΉππ πΉππ = πΉππ − π π tan ∅′
