A singly reinforced concrete beam 200 mm width and having effective depth 350 mm is reinforced with 3 bars of 12 mm diameter. Using M15 concrete of Fe415 steel, calculate moment of resistance of the section.
To calculate the moment of resistance of a singly reinforced concrete beam, we use the following steps:
Given Data:
- Width of the beam (b) = 200 mm
- Effective depth (d) = 350 mm
- Reinforcement = 3 bars of 12 mm diameter
- Concrete grade = M15 (i.e., πππ=15 N/mmΒ²)
- Steel grade = Fe415 (i.e., ππ¦=415 N/mmΒ²)
Step 1: Calculate the Area of Steel (Aπ π‘)
For 3 bars of 12 mm diameter:
π΄π π‘=3Γπ4Γ(12)2=3Γπ4Γ144=3Γ113.097=339.292βmm2
Step 2: Calculate the Neutral Axis (xπ’)
Using the formula for the neutral axis for singly reinforced sections:
π₯π’=0.87ππ¦π΄π π‘0.36ππππ
Substitute the values:
π₯π’=0.87Γ415Γ339.2920.36Γ15Γ200π₯π’=122,804.0161080=113.705βmm
Step 3: Calculate Limiting Depth of Neutral Axis (xπ’πππ₯)
For Fe415 steel, the limiting depth of the neutral axis is:
π₯π’πππ₯=0.48Γπ=0.48Γ350=168βmm
Since π₯π’<π₯π’πππ₯, the section is under-reinforced.
Step 4: Calculate Moment of Resistance (Mπ )
The moment of resistance is given by:
ππ =0.87ππ¦π΄π π‘(πβ0.42π₯π’1000)
Substitute the values:
ππ =0.87Γ415Γ339.292Γ(350β0.42Γ113.705)/1000ππ =122,804.016Γ(350β47.757)/1000ππ =122,804.016Γ302.243/1000ππ =37,100,384.54/1000=37.1βkNm
Final Answer:
The moment of resistance of the section is 37.1 kNm.
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