The design of columns under centric load is a fundamental aspect of structural engineering and is critical for ensuring the stability and integrity of structures. Euler's and Secant's formulas are central to understanding and calculating the critical load and deformation behaviors of columns, providing a basis for safe and effective structural design.

Euler's formula is applicable under the assumption that the column is a perfect, straight, homogenous prism, and it is operating within the elastic limit of the material. The critical load, according to Euler's formula, is directly dependent on the column's modulus of elasticity and its geometric properties. However, it is essential to note that Euler's formula is most accurate for long, slender columns where buckling is the predominant mode of failure. In practical applications, the materials used for columns exhibit imperfections, and their behavior under load does not always align with ideal, elastic assumptions. Real-life columns might have initial slight bends, variations in cross-sectional area, or material inconsistencies, all of which can significantly influence their load-bearing capacity and failure modes. Therefore, empirical formulas derived from extensive laboratory experiments are used to design columns that can withstand real-world conditions. These empirical formulas take into account the material properties, such as yield strength and modulus of elasticity, as well as the column's length, cross-sectional dimensions, and boundary conditions.

For columns that are long enough for Euler's formula to predict failure accurately, the critical stress depends primarily on the material's modulus of elasticity. These columns fail by buckling before the yield strength of the material is exceeded. Failure in short columns is predominantly due to the material reaching its yield strength, leading to a crushing failure rather than buckling. In these cases, the design focuses on the material's yield strength rather than its elasticity. Columns of intermediate length present a complex scenario where both the yield strength and modulus of elasticity influence failure. The empirical formulas for these columns are adjusted to consider the intricate interaction between material yielding and elastic buckling.

These considerations ensure that the design of columns, regardless of their length and the material used, is robust, reliable, and capable of supporting the intended loads without failure.