Tower Crane Foundation Design - Calculation Example

Maximum moment at crane column face (assume column base plate 2 m × 2 m):

7.0 m × 7.0 m × 1.5 m thick. 5. Stability Checks 5.1 Overturning (ULS) [ M_overturning,ULS = M_d = 6300 , \textkNm ] Restoring moment (about edge): [ M_restoring = N_total,ULS \times \fracL2 = (1148 + 1837.5) \times 3.5 = 2985.5 \times 3.5 = 10449 , \textkNm ] Factor of safety: [ FOS = \frac104496300 = 1.66 > 1.5 \quad \text✓ OK ] 5.2 Sliding (ULS) Sliding force (H_d = 97.5 , \textkN) Friction resistance: (\mu = 0.45) (concrete on stiff clay) [ R_friction = N_total,ULS \times \mu = 2985.5 \times 0.45 = 1343.5 , \textkN ] [ FOS_sliding = 1343.5 / 97.5 = 13.8 \gg 1.5 \quad \text✓ OK ] 6. Structural Design of Pad (ULS) 6.1 Bending moment at column base interface Ultimate bearing pressure distribution (simplified for ULS) – Use factored loads and effective area. Tower Crane Foundation Design Calculation Example

Moment about column edge = pressure resultant × lever arm. Use trapezoidal distribution? For simplicity, take average pressure = (204.5 + 0)/2? No, partial uplift. Actually, use effective width method: Maximum moment at crane column face (assume column

This exceeds (q_allow = 150 , \textkPa) → or must be deepened or widened. 4.5 Revised foundation size Try (L = B = 7.0 , \textm, t = 1.5 , \textm): Structural Design of Pad (ULS) 6

For a 6 m square foundation, (L/6 = 1.0 , \textm). Since (e > L/6) (2.176 > 1.0), the resultant lies outside the middle third → partial uplift. Effective width (L' = 3 \times (L/2 - e) = 3 \times (3.0 - 2.176) = 2.472 , \textm). [ q_max = \frac2 \times N_totalB \times L' = \frac2 \times 19306.0 \times 2.472 = \frac386014.832 \approx 260.3 , \textkPa ]