Thickness given Maximum Bending Stress at Proof Load of Leaf Spring Solution

STEP 0: Pre-Calculation Summary
Formula Used
Thickness of Section = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Young's Modulus*Deflection of Spring)
t = (fproof load*L^2)/(4*E*δ)
This formula uses 5 Variables
Variables Used
Thickness of Section - (Measured in Meter) - Thickness of Section is the dimension through an object, as opposed to length or width.
Maximum Bending Stress at Proof Load - (Measured in Pascal) - Maximum Bending Stress at Proof Load is the maximum normal stress that is induced at a point in a body subjected to loads that cause it to bend.
Length in Spring - (Measured in Meter) - Length in Spring is the measurement or extent of something from end to end.
Young's Modulus - (Measured in Pascal) - Young's Modulus is a mechanical property of linear elastic solid substances. It describes the relationship between longitudinal stress and longitudinal strain.
Deflection of Spring - (Measured in Meter) - Deflection of Spring is how a spring responds when force is applied or released.
STEP 1: Convert Input(s) to Base Unit
Maximum Bending Stress at Proof Load: 7.2 Megapascal --> 7200000 Pascal (Check conversion ​here)
Length in Spring: 4170 Millimeter --> 4.17 Meter (Check conversion ​here)
Young's Modulus: 20000 Megapascal --> 20000000000 Pascal (Check conversion ​here)
Deflection of Spring: 3.4 Millimeter --> 0.0034 Meter (Check conversion ​here)
STEP 2: Evaluate Formula
Substituting Input Values in Formula
t = (fproof load*L^2)/(4*E*δ) --> (7200000*4.17^2)/(4*20000000000*0.0034)
Evaluating ... ...
t = 0.460294411764706
STEP 3: Convert Result to Output's Unit
0.460294411764706 Meter -->460.294411764706 Millimeter (Check conversion ​here)
FINAL ANSWER
460.294411764706 460.2944 Millimeter <-- Thickness of Section
(Calculation completed in 00.004 seconds)

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At Proof Load Calculators

Modulus of Elasticity given Maximum Bending Stress at Proof Load of Leaf Spring
​ LaTeX ​ Go Young's Modulus = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Thickness of Section*Deflection of Spring)
Deflection given Maximum Bending Stress at Proof Load of Leaf Spring
​ LaTeX ​ Go Deflection of Spring = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Thickness of Section*Young's Modulus)
Thickness given Maximum Bending Stress at Proof Load of Leaf Spring
​ LaTeX ​ Go Thickness of Section = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Young's Modulus*Deflection of Spring)
Maximum Bending Stress at Proof Load of Leaf Spring
​ LaTeX ​ Go Maximum Bending Stress at Proof Load = (4*Thickness of Section*Young's Modulus*Deflection of Spring)/Length in Spring^2

Thickness given Maximum Bending Stress at Proof Load of Leaf Spring Formula

​LaTeX ​Go
Thickness of Section = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Young's Modulus*Deflection of Spring)
t = (fproof load*L^2)/(4*E*δ)

What is Leaf Spring?

A leaf spring takes the form of a slender arc-shaped length of spring steel of rectangular cross-section. In the most common configuration, the center of the arc provides location for the axle, while loops formed at either end provide for attaching to the vehicle chassis. For very heavy vehicles, a leaf spring can be made from several leaves stacked on top of each other in several layers, often with progressively shorter leaves.

How to Calculate Thickness given Maximum Bending Stress at Proof Load of Leaf Spring?

Thickness given Maximum Bending Stress at Proof Load of Leaf Spring calculator uses Thickness of Section = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Young's Modulus*Deflection of Spring) to calculate the Thickness of Section, The Thickness given Maximum Bending Stress at Proof Load of Leaf Spring formula is defined as thickness of the cross-section of one plate of the spring assembly. Thickness of Section is denoted by t symbol.

How to calculate Thickness given Maximum Bending Stress at Proof Load of Leaf Spring using this online calculator? To use this online calculator for Thickness given Maximum Bending Stress at Proof Load of Leaf Spring, enter Maximum Bending Stress at Proof Load (fproof load), Length in Spring (L), Young's Modulus (E) & Deflection of Spring (δ) and hit the calculate button. Here is how the Thickness given Maximum Bending Stress at Proof Load of Leaf Spring calculation can be explained with given input values -> 458996.6 = (7200000*4.17^2)/(4*20000000000*0.0034).

FAQ

What is Thickness given Maximum Bending Stress at Proof Load of Leaf Spring?
The Thickness given Maximum Bending Stress at Proof Load of Leaf Spring formula is defined as thickness of the cross-section of one plate of the spring assembly and is represented as t = (fproof load*L^2)/(4*E*δ) or Thickness of Section = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Young's Modulus*Deflection of Spring). Maximum Bending Stress at Proof Load is the maximum normal stress that is induced at a point in a body subjected to loads that cause it to bend, Length in Spring is the measurement or extent of something from end to end, Young's Modulus is a mechanical property of linear elastic solid substances. It describes the relationship between longitudinal stress and longitudinal strain & Deflection of Spring is how a spring responds when force is applied or released.
How to calculate Thickness given Maximum Bending Stress at Proof Load of Leaf Spring?
The Thickness given Maximum Bending Stress at Proof Load of Leaf Spring formula is defined as thickness of the cross-section of one plate of the spring assembly is calculated using Thickness of Section = (Maximum Bending Stress at Proof Load*Length in Spring^2)/(4*Young's Modulus*Deflection of Spring). To calculate Thickness given Maximum Bending Stress at Proof Load of Leaf Spring, you need Maximum Bending Stress at Proof Load (fproof load), Length in Spring (L), Young's Modulus (E) & Deflection of Spring (δ). With our tool, you need to enter the respective value for Maximum Bending Stress at Proof Load, Length in Spring, Young's Modulus & Deflection of Spring and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
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