Stability of Structures: Euler’s and Rankine’s Formula

Definition

Structural stability refers to the ability of a structural member, specifically a column or strut, to maintain its original equilibrium configuration under an applied compressive load. A column is considered unstable when it reaches its "buckling load," where a small lateral displacement occurs, leading to collapse even if the material stress remains below the yield strength.

Main Content

1. Euler’s Column Theory

Euler’s theory is primarily applicable to "long columns" where the slenderness ratio is high.
It assumes that the column is perfectly straight, homogeneous, and that the load is applied perfectly axially.
The formula is: $P_e = \frac{\pi^2 EI}{L_e^2}$

2. Limitations of Euler’s Formula

It does not account for initial imperfections in the column.
It assumes the material remains perfectly elastic, ignoring the transition to plastic behavior in intermediate columns.
It is only accurate for very slender members where buckling occurs before yielding.

3. Rankine-Gordon Formula

This formula is an empirical approach designed to bridge the gap between Euler’s theory (long columns) and crushing strength (short columns).
It accounts for both buckling and direct crushing of the material.
The formula is: $\frac{1}{P_R} = \frac{1}{P_e} + \frac{1}{P_c}$, where $P_c$ is the crushing load.

Working / Process

1. Determining Effective Length

The effective length ($L_e$) depends on the end conditions of the column.
If both ends are pinned, $L_e = L$.
If both ends are fixed, $L_e = 0.5L$.

    Pinned-Pinned         Fixed-Fixed
    |     |               |-----|
    |     |               |     |
    |     |               |     |
    |     |               |     |
    |-----|               |-----|
    (L_e = L)            (L_e = 0.5L)

2. Calculating Euler Buckling Load

Identify the Young's Modulus ($E$) and the Moment of Inertia ($I$) of the cross-section.
Square the effective length and use the formula $P_e = \frac{\pi^2 EI}{L_e^2}$.
This value is critical for students during exam preparation and common interview questions.

3. Applying Rankine’s Correction

Calculate the crushing load $P_c = \sigma_c \times A$ (where $\sigma_c$ is the yield stress).
Use the Rankine formula $P_R = \frac{\sigma_c A}{1 + a(L_e/k)^2}$ where $a$ is the Rankine constant.
This allows for accurate prediction of the failing load for medium-length columns in your university syllabus.

Advantages / Applications

These important concepts are essential for the structural design of bridges, building frames, and industrial pylons.
Euler's formula provides a conservative safety limit for slender aerospace components.
Rankine’s formula is widely used in practical engineering for standard steel and concrete columns where material properties are well-defined.

Summary

Stability of structures defines the resistance of members against sudden lateral deflection (buckling). Euler’s formula is best suited for slender long columns, while the Rankine-Gordon formula provides a versatile empirical solution for columns of all lengths. Mastering these formulas is vital for structural engineering academic success. Key terms: Slenderness ratio, Buckling load, Moment of Inertia, Effective length, and Crushing strength.