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Limitation Of Euler’s Theory of Buckling - Columns and Struts, Strength of Materials | Strength of Material Notes - Agricultural Engg - Agricultural Engineering PDF Download

Limitation Of Euler’s Theory of Buckling

Euler’s formula for buckling load is,

\[{P_E} = {{{\pi ^2}EI} \over {l_{eff}^2}}\]                           (23.1)

If the cross-section of the column is such that it has different I with respect to different axis, the buckling load is given by,

\[{P_E} = {{{\pi ^2}E{I_{\min }}} \over {l_{eff}^2}}\]                                                   (23.2)

\[\Rightarrow {P_E} = {{{\pi ^2}AE} \over {l_{eff}^2}}{{{I_{\min }}} \over A} = {{{\pi ^2}AE} \over {l_{eff}^2}}k_{\min }^2\]  [ \[{k_{\min }} = \sqrt {{{{I_{\min }}} \over A}} \] is minimum the radius of gyration ]

\[\Rightarrow {{{P_E}} \over A} = {\pi ^2}E{\left( {{{{k_{\min }}} \over {{l_{eff}}}}} \right)^2}\]                              (23.3)

Now \[{{P_E}} /{E \le {\sigma _c}}\] , where, σc is the crushing stress of a short column. Therefore,

\[{\pi ^2}E{\left( {{{{k_{\min }}} \over {{l_{eff}}}}} \right)^2} \le {\sigma _c}\]

\[\Rightarrow {{{l_{eff}}} \over {{k_{\min }}}} \ge \sqrt {{{{\pi ^2}E} \over {{\sigma _c}}}}\]

Therefore the Euler buckling theory is applicable only when the slenderness ratio \[{{{l_{eff}}} /{{k_{\min }}} \]  has a minimum value. For instance, mild steel has the following properties,

E = 208GPa

σc = 320MPa

\[{{{l_{eff}}} \over {{k_{\min }}}}=\ge \sqrt {{{{\pi ^2}208 \times {{10}^9}} \over {320 \times {{10}^6}}}}=80\]

Therefore, for mild steel column if the slenderness is greater than 80, then only the Euler theory can be applied in order to predict the buckling load.

Moreover, in Euler’s theory it was assumed that the member is perfectly straight and homogeneous. Moreover the line of action of the applied load is assumed to be coincident with the centroidal axis of the column and therefore does not produce any moment. However in practical situations, column which satisfies all these idealization does not exist. This imposes further limitation on the direct application of Euler model in practical columns. In this lesson we will study the behavior of imperfect column and compare it with the Euler model derived in the last lesson.

The document Limitation Of Euler’s Theory of Buckling - Columns and Struts, Strength of Materials | Strength of Material Notes - Agricultural Engg - Agricultural Engineering is a part of the Agricultural Engineering Course Strength of Material Notes - Agricultural Engg.
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FAQs on Limitation Of Euler’s Theory of Buckling - Columns and Struts, Strength of Materials - Strength of Material Notes - Agricultural Engg - Agricultural Engineering

1. What is Euler's theory of buckling?
Ans. Euler's theory of buckling, also known as Euler's column theory or Euler's strut theory, is a mathematical model used to predict the buckling strength of slender columns or struts under axial compression. It is based on the assumption that the column is perfectly straight, uniform, and made of a homogeneous material.
2. What are the limitations of Euler's theory of buckling?
Ans. Euler's theory of buckling has several limitations. Firstly, it assumes that the column is perfectly straight, which may not be accurate in real-world scenarios. Secondly, it assumes that the material is homogeneous, neglecting any variations in material properties. Thirdly, it does not consider the effects of lateral deflections or imperfections in the column. Lastly, Euler's theory only applies to long and slender columns, failing to provide accurate predictions for short and stubby columns.
3. How does Euler's theory of buckling apply to agricultural engineering?
Ans. Euler's theory of buckling is applicable to agricultural engineering in the design and analysis of various structural elements such as silos, storage tanks, and support columns for agricultural buildings. By using Euler's theory, engineers can determine the critical buckling load of these elements and ensure their stability under compression loads, thus preventing structural failures and ensuring the safety of agricultural structures.
4. Are there any alternatives to Euler's theory of buckling?
Ans. Yes, there are alternative theories to Euler's theory of buckling that address some of its limitations. One such theory is the Rankine-Gordon formula, which incorporates the effect of lateral deflections and imperfections in the column. Another alternative is the Perry-Robertson formula, which considers the influence of material imperfections and column slenderness. These alternative theories provide more accurate predictions for the strength of columns and struts.
5. How can engineers overcome the limitations of Euler's theory of buckling in agricultural engineering?
Ans. Engineers can overcome the limitations of Euler's theory of buckling by considering the actual conditions and characteristics of the agricultural structures. This can be achieved by conducting experimental tests on column samples to determine their actual buckling behavior. Additionally, engineers can use advanced computer modeling techniques, such as finite element analysis, to simulate the behavior of columns under different loading conditions, accounting for imperfections, material heterogeneity, and other factors that Euler's theory neglects. These approaches can provide more accurate predictions and ensure the structural integrity of agricultural engineering designs.
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