Deflection for Channel or Z Bar when Load is Distributed Calculator

✖Greatest Safe Distributed Load is that load which acts over a considerable length or over a length which is measurable. Distributed load is measured as per unit length.ⓘ Greatest Safe Distributed Load [W_d]			+10% -10%
✖Length of Beam is the center to center distance between the supports or the effective length of the beam.ⓘ Length of Beam [L]			+10% -10%
✖Cross Sectional Area of Beam the area of a two-dimensional shape that is obtained when a three-dimensional shape is sliced perpendicular to some specified axis at a point.ⓘ Cross Sectional Area of Beam [A_cs]			+10% -10%
✖Depth of Beam is the overall depth of the cross-section of the beam perpendicular to the axis of the beam.ⓘ Depth of Beam [d_b]			+10% -10%

✖Deflection of Beam is the degree to which a structural element is displaced under a load (due to its deformation). It may refer to an angle or a distance.ⓘ Deflection for Channel or Z Bar when Load is Distributed [δ]

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Deflection for Channel or Z Bar when Load is Distributed Solution

STEP 0: Pre-Calculation Summary

Formula Used

Deflection of Beam = (Greatest Safe Distributed Load*(Length of Beam^3))/(85*Cross Sectional Area of Beam*(Depth of Beam^2))
δ = (W_d*(L^3))/(85*A_cs*(d_b^2))
This formula uses 5 Variables

Variables Used

Deflection of Beam - (Measured in Meter) - Deflection of Beam is the degree to which a structural element is displaced under a load (due to its deformation). It may refer to an angle or a distance.
Greatest Safe Distributed Load - (Measured in Newton) - Greatest Safe Distributed Load is that load which acts over a considerable length or over a length which is measurable. Distributed load is measured as per unit length.
Length of Beam - (Measured in Meter) - Length of Beam is the center to center distance between the supports or the effective length of the beam.
Cross Sectional Area of Beam - (Measured in Square Meter) - Cross Sectional Area of Beam the area of a two-dimensional shape that is obtained when a three-dimensional shape is sliced perpendicular to some specified axis at a point.
Depth of Beam - (Measured in Meter) - Depth of Beam is the overall depth of the cross-section of the beam perpendicular to the axis of the beam.

STEP 1: Convert Input(s) to Base Unit

Greatest Safe Distributed Load: 1.00001 Kilonewton --> 1000.01 Newton (Check conversion here)
Length of Beam: 10.02 Foot --> 3.05409600001222 Meter (Check conversion here)
Cross Sectional Area of Beam: 13 Square Meter --> 13 Square Meter No Conversion Required
Depth of Beam: 10.01 Inch --> 0.254254000001017 Meter (Check conversion here)

STEP 2: Evaluate Formula

Substituting Input Values in Formula

δ = (W_d*(L^3))/(85*A_cs*(d_b^2)) --> (1000.01*(3.05409600001222^3))/(85*13*(0.254254000001017^2))

Evaluating ... ...

δ = 398.799430362007

STEP 3: Convert Result to Output's Unit

398.799430362007 Meter -->15700.7649748194 Inch (Check conversion here)

FINAL ANSWER

15700.7649748194 ≈ 15700.76 Inch <-- Deflection of Beam

(Calculation completed in 00.004 seconds)

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Home » Engineering » Civil » Structural Engineering » Structural Analysis » Moving Loads and Influence Lines for Beams » Calculation of Deflection » Deflection for Channel or Z Bar when Load is Distributed

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< Calculation of Deflection Calculators

Deflection for Hollow Rectangle when Load is Distributed

LaTeX Go Deflection of Beam = Greatest Safe Distributed Load*(Length of Beam^3)/(52*(Cross Sectional Area of Beam*Depth of Beam^-Interior Cross-Sectional Area of Beam*Interior Depth of Beam^2))

Deflection for Hollow Rectangle given Load in Middle

LaTeX Go Deflection of Beam = (Greatest Safe Point Load*Length of Beam^3)/(32*((Cross Sectional Area of Beam*Depth of Beam^2)-(Interior Cross-Sectional Area of Beam*Interior Depth of Beam^2)))

Deflection for Solid Rectangle when Load is Distributed

LaTeX Go Deflection of Beam = (Greatest Safe Distributed Load*Length of Beam^3)/(52*Cross Sectional Area of Beam*Depth of Beam^2)

Deflection for Solid Rectangle when Load in Middle

LaTeX Go Deflection of Beam = (Greatest Safe Point Load*Length of Beam^3)/(32*Cross Sectional Area of Beam*Depth of Beam^2)

Deflection for Channel or Z Bar when Load is Distributed Formula

LaTeX Go

Deflection of Beam = (Greatest Safe Distributed Load*(Length of Beam^3))/(85*Cross Sectional Area of Beam*(Depth of Beam^2))
δ = (W_d*(L^3))/(85*A_cs*(d_b^2))

What is Deflection?

Deflection is the degree to which a structural element is displaced under a load. The deflection of beam elements is usually calculated on the basis of the Euler–Bernoulli beam equation while that of a plate or shell element is calculated using plate or shell theory.

How to Calculate Deflection for Channel or Z Bar when Load is Distributed?

Deflection for Channel or Z Bar when Load is Distributed calculator uses Deflection of Beam = (Greatest Safe Distributed Load*(Length of Beam^3))/(85*Cross Sectional Area of Beam*(Depth of Beam^2)) to calculate the Deflection of Beam, The Deflection for Channel or Z Bar when Load is Distributed formula is defined as the degree of bending or deformation under distributed load, quantifying structural flexibility. Deflection of Beam is denoted by δ symbol.

How to calculate Deflection for Channel or Z Bar when Load is Distributed using this online calculator? To use this online calculator for Deflection for Channel or Z Bar when Load is Distributed, enter Greatest Safe Distributed Load (W_d), Length of Beam (L), Cross Sectional Area of Beam (A_cs) & Depth of Beam (d_b) and hit the calculate button. Here is how the Deflection for Channel or Z Bar when Load is Distributed calculation can be explained with given input values -> 618140.4 = (1000.01*(3.05409600001222^3))/(85*13*(0.254254000001017^2)).

FAQ

What is Deflection for Channel or Z Bar when Load is Distributed?

The Deflection for Channel or Z Bar when Load is Distributed formula is defined as the degree of bending or deformation under distributed load, quantifying structural flexibility and is represented as δ = (W_d*(L^3))/(85*A_cs*(d_b^2)) or Deflection of Beam = (Greatest Safe Distributed Load*(Length of Beam^3))/(85*Cross Sectional Area of Beam*(Depth of Beam^2)). Greatest Safe Distributed Load is that load which acts over a considerable length or over a length which is measurable. Distributed load is measured as per unit length, Length of Beam is the center to center distance between the supports or the effective length of the beam, Cross Sectional Area of Beam the area of a two-dimensional shape that is obtained when a three-dimensional shape is sliced perpendicular to some specified axis at a point & Depth of Beam is the overall depth of the cross-section of the beam perpendicular to the axis of the beam.

How to calculate Deflection for Channel or Z Bar when Load is Distributed?

The Deflection for Channel or Z Bar when Load is Distributed formula is defined as the degree of bending or deformation under distributed load, quantifying structural flexibility is calculated using Deflection of Beam = (Greatest Safe Distributed Load*(Length of Beam^3))/(85*Cross Sectional Area of Beam*(Depth of Beam^2)). To calculate Deflection for Channel or Z Bar when Load is Distributed, you need Greatest Safe Distributed Load (W_d), Length of Beam (L), Cross Sectional Area of Beam (A_cs) & Depth of Beam (d_b). With our tool, you need to enter the respective value for Greatest Safe Distributed Load, Length of Beam, Cross Sectional Area of Beam & Depth of Beam 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 Deflection of Beam?

In this formula, Deflection of Beam uses Greatest Safe Distributed Load, Length of Beam, Cross Sectional Area of Beam & Depth of Beam. We can use 3 other way(s) to calculate the same, which is/are as follows -

Deflection of Beam = (Greatest Safe Point Load*Length of Beam^3)/(32*Cross Sectional Area of Beam*Depth of Beam^2)
Deflection of Beam = (Greatest Safe Distributed Load*Length of Beam^3)/(52*Cross Sectional Area of Beam*Depth of Beam^2)
Deflection of Beam = (Greatest Safe Point Load*Length of Beam^3)/(32*((Cross Sectional Area of Beam*Depth of Beam^2)-(Interior Cross-Sectional Area of Beam*Interior Depth of Beam^2)))

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