Calculate ultimate moment of resistance of R.C. Slab 130 mm thick, reinforced with 10 mm Ο bars @ 100 mm c/c. Cover to center of bars is 20 mm. M20 concrete and Fe415 steel.
To calculate the ultimate moment of resistance (Mu) of a reinforced concrete slab, follow these steps:
Given Data:
- Slab Thickness (d): 130 mm
- Reinforcement Bars: 10 mm diameter @ 100 mm c/c
- Cover to Center of Bars: 20 mm
- Concrete Grade: M20 (f_ck = 20 MPa)
- Steel Grade: Fe415 (f_y = 415 MPa)
Step-by-Step Calculation:
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Effective Depth (d): Effective depth (d) is the distance from the top fiber of the slab to the centroid of the tensile reinforcement.
π=Total ThicknessβCoverβDiameter of Reinforcement2π=130 mmβ20 mmβ10 mm2=130 mmβ20 mmβ5 mm=105 mm
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Area of Reinforcement (A_s): The area of one bar (A_b) is:
π΄π=πβ (Diameter)24=πβ (10 mm)24=78.54 mm2
The number of bars per meter (n):
Number of Bars per Meter=1000 mm100 mm=10
Total area of reinforcement (A_s):
π΄π =Number of BarsΓπ΄π=10Γ78.54 mm2=785.4 mm2
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Moment of Resistance (Mu):
For a singly reinforced rectangular section, the formula for the ultimate moment of resistance is:
ππ’=0.87β ππ¦β π΄π β (πβπ2)
Where π is the depth of the neutral axis, which can be approximated as:
π=π΄π β ππ¦0.36β πππβ π
Assuming the width π is 1000 mm (for a unit width slab), compute π:
π=785.4 mm2β 415 MPa0.36β 20 MPaβ 1000 mm=325,5817,200β45.4 mm
Now, calculate πβπ2:
πβπ2=105 mmβ45.4 mm2β105 mmβ22.7 mmβ82.3 mm
Finally, the ultimate moment of resistance (Mu):
ππ’=0.87β 415 MPaβ 785.4 mm2β 82.3 mmππ’β0.87β 415β 785.4β 82.3=23,541,222 Nmm
Converting to kNm:
ππ’β23,541.2 Nm=23.54 kNm
Ultimate Moment of Resistance ππ’ is approximately 23.54 kNm.
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