M Naveen
National Institute of Technology (NIT), Warangal
M Naveen has created this Calculator and 100+ more calculators!
Himanshi Sharma
Bhilai Institute of Technology (BIT), Raipur
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11 Other formulas that you can solve using the same Inputs

Ultimate Strength for Symmetrical Reinforcement
Axial Load Capacity=0.85*28 Day Compressive Strength of Concrete*Width of compression face*Distance from Compression to Tensile Reinforcement*Capacity reduction factor*((-Area ratio of tensile reinforcement)+1-(Eccentricity by method of frame analysis/Distance from Compression to Tensile Reinforcement)+sqrt(((1-(Eccentricity by method of frame analysis/Distance from Compression to Tensile Reinforcement))^2)+2*Area ratio of tensile reinforcement*((Force ratio of strengths of reinforcements-1)*(1-(Distance from Compression to Centroid Reinforcment/Distance from Compression to Tensile Reinforcement))+(Eccentricity by method of frame analysis/Distance from Compression to Tensile Reinforcement)))) GO
Ultimate Strength for No Compression Reinforcement
Axial Load Capacity=0.85*28 Day Compressive Strength of Concrete*Width of compression face*Distance from Compression to Tensile Reinforcement*Capacity reduction factor*((-Area ratio of tensile reinforcement*Force ratio of strengths of reinforcements)+1-(Eccentricity by method of frame analysis/Distance from Compression to Tensile Reinforcement)+sqrt(((1-(Eccentricity by method of frame analysis/Distance from Compression to Tensile Reinforcement))^2)+2*(Area ratio of tensile reinforcement*Eccentricity by method of frame analysis*Force ratio of strengths of reinforcements/Distance from Compression to Tensile Reinforcement))) GO
Balanced Moment when Φ is Given
Balanced Moment=Resistance Factor*((.85*28 Day Compressive Strength of Concrete*Width of compression face*Depth Rectangular Compressive Stress*(Distance from Compression to Tensile Reinforcement-Distance from Plastic to Tensile Reinforcement-Depth Rectangular Compressive Stress/2))+(Area of Compressive Reinforcement*Yeild Strength of Base Plate*(Distance from Compression to Tensile Reinforcement-Distance from Compression to Centroid Reinforcment-Distance from Plastic to Tensile Reinforcement))+(area of tension reinforcement*Tensile Stress in Steel*Distance from Plastic to Tensile Reinforcement)) GO
Ultimate Strength for Symmetrical Reinforcement in Single Layers
Axial Load Capacity=Capacity reduction factor*((Area of Compressive Reinforcement*Yield strength of reinforcing steel/((Eccentricity/Distance from Compression to Tensile Reinforcement)-Distance from Compression to Centroid Reinforcment+0.5))+(Width of compression face*Depth of column*28 Day Compressive Strength of Concrete/((3*Depth of column*Eccentricity/(Distance from Compression to Tensile Reinforcement^2))+1.18))) GO
Compressive Reinforcement Area when Axial-Load Capacity of Short Rectangular Members is Given
Area of Compressive Reinforcement=((Axial Load Capacity/Resistance Factor)-(.85*28 Day Compressive Strength of Concrete*Width of compression face*Depth Rectangular Compressive Stress)+(area of tension reinforcement*Tensile Stress in Steel))/Yeild Strength of Base Plate GO
Tension Reinforcement Area when Axial-Load Capacity of Short Rectangular Members is Given
area of tension reinforcement=((.85*28 Day Compressive Strength of Concrete*Width of compression face*Depth Rectangular Compressive Stress)+(Area of Compressive Reinforcement*Yeild Strength of Base Plate)-(Axial Load Capacity/Resistance Factor))/Tensile Stress in Steel GO
Tensile Stress in Steel when Axial-Load Capacity of Short Rectangular Members is Given
Tensile Stress in Steel=((.85*28 Day Compressive Strength of Concrete*Width of compression face*Depth Rectangular Compressive Stress)+(Area of Compressive Reinforcement*Yeild Strength of Base Plate)-(Axial Load Capacity/Resistance Factor))/area of tension reinforcement GO
Axial-Load Capacity of Short Rectangular Members
Axial Load Capacity=Resistance Factor*((.85*28 Day Compressive Strength of Concrete*Width of compression face*Depth Rectangular Compressive Stress)+(Area of Compressive Reinforcement*Yeild Strength of Base Plate)-(area of tension reinforcement*Tensile Stress in Steel)) GO
Yield Strength of Reinforcing Steel when Column Ultimate Strength is Given
Yield Strength=(Ultimate strength-0.85*28 Day Compressive Strength of Concrete*(Gross area-Area of Reinforcement))/Area of Reinforcement GO
Column Ultimate Strength with Zero Eccentricity of Load
Ultimate strength=0.85*28 Day Compressive Strength of Concrete*(Gross area-Area of Reinforcement)+Yield Strength*Area of Reinforcement GO
Allowable Bearing Pressure when Full Area of Support is Occupied by Base Plate
Allowable Bearing Pressure=0.35*28 Day Compressive Strength of Concrete GO

3 Other formulas that calculate the same Output

Development Length for Simple Support
Development Length=(Computed Flexural Strength /Applied Shear at Section)+(Additional Embedment Length ) GO
Basic Development Length for No 14 Bars
Development Length= (0.085*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete) GO
Basic Development Length for No 18 Bars
Development Length= (0.125*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete) GO

Basic Development Length for Bars and Wire in Tension Formula

Development Length=(0.04*Area of Bar*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete)
Ld=(0.04*A<sub>b</sub>*F<sub>y</sub>)/sqrt(f<sub>c)
More formulas
Area of Bar when Basic Development Length is Given GO
Bar Steel Yield Strength when Basic Development Length is Given GO
Bar Steel Yield Strength when Basic Development Length for No 14 Bars is Given GO
Basic Development Length for No 14 Bars GO
Basic Development Length for No 18 Bars GO
Bar Steel Yield Strength when Basic Development Length for No 18 Bars is Given GO

What is development length for bars and wires in a tension stress?

The basic development length of bars is defined as that length of embedment necessary to develop the full tensile strength of the bar, controlled by either pulling or splitting.

How to Calculate Basic Development Length for Bars and Wire in Tension?

Basic Development Length for Bars and Wire in Tension calculator uses Development Length=(0.04*Area of Bar*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete) to calculate the Development Length, Basic Development Length for Bars and Wire in Tension can be defined as the amount of reinforcement (bar) length needed to be embedded or projected into the column to establish the desired bond strength between the concrete and steel (or any other two types of material). Development Length and is denoted by Ld symbol.

How to calculate Basic Development Length for Bars and Wire in Tension using this online calculator? To use this online calculator for Basic Development Length for Bars and Wire in Tension, enter Area of Bar (Ab), Yield Strength of Bar (Fy) and 28 Day Compressive Strength of Concrete (fc) and hit the calculate button. Here is how the Basic Development Length for Bars and Wire in Tension calculation can be explained with given input values -> 4000 = (0.04*0.001*1000000000)/sqrt(100000000).

FAQ

What is Basic Development Length for Bars and Wire in Tension?
Basic Development Length for Bars and Wire in Tension can be defined as the amount of reinforcement (bar) length needed to be embedded or projected into the column to establish the desired bond strength between the concrete and steel (or any other two types of material) and is represented as Ld=(0.04*Ab*Fy)/sqrt(fc) or Development Length=(0.04*Area of Bar*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete). Area of Bar can be defined as the space occupied by a bar, The yield Strength of Bar can be described as the load per area in the bar and 28 Day Compressive Strength of Concrete is defined as the strength of the concrete after 28 days of using it.
How to calculate Basic Development Length for Bars and Wire in Tension?
Basic Development Length for Bars and Wire in Tension can be defined as the amount of reinforcement (bar) length needed to be embedded or projected into the column to establish the desired bond strength between the concrete and steel (or any other two types of material) is calculated using Development Length=(0.04*Area of Bar*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete). To calculate Basic Development Length for Bars and Wire in Tension, you need Area of Bar (Ab), Yield Strength of Bar (Fy) and 28 Day Compressive Strength of Concrete (fc). With our tool, you need to enter the respective value for Area of Bar, Yield Strength of Bar and 28 Day Compressive Strength of Concrete and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Development Length?
In this formula, Development Length uses Area of Bar, Yield Strength of Bar and 28 Day Compressive Strength of Concrete. We can use 3 other way(s) to calculate the same, which is/are as follows -
  • Development Length= (0.085*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete)
  • Development Length= (0.125*Yield Strength of Bar)/sqrt(28 Day Compressive Strength of Concrete)
  • Development Length=(Computed Flexural Strength /Applied Shear at Section)+(Additional Embedment Length )
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