There are several non-exclusive "extensions" of the concept. For non-isotropic elastic materials, Young's modulus measured according to the previous procedure does not give constant values. However, it can be proven that there are three elastic constants E, E and E such that Young's modulus in any direction is given by:.

and where are the direction cosines of the direction in which we measure the Young's modulus with respect to three given orthogonal directions.

The dimensions of Young's modulus are.

In the International System of Units its most generalized unit is the Pascal "Pascal (unit)").

In some practical cases, kPa (soft tissues of the body), MPa (wood, bone) or even GPa (metals) are also used.

To see the value of the elastic modulus for various materials, consult the Annex: Elastoplastic constants of different materials.

Linear materials

For a linear elastic material "Elasticity (solid mechanics)") the longitudinal elastic modulus is a constant (for stress values ​​within the range of complete reversibility of deformations). In this case, its value is defined as the ratio between the tension and the deformation that appear in a stretched or compressed straight bar made of the material for which the modulus of elasticity is to be estimated:

The previous equation is valid if the stress is uniform throughout the section, and the area is chosen appropriately, in addition to other limitations; In the contexts in which the previous formula is valid, it is also expressed as:.

Therefore, given two geometrically identical mechanical bars or prisms but made of different elastic materials, by subjecting both bars to identical deformations, greater stresses will be induced the greater the modulus of elasticity. Analogously, we have to submit the previous equation to the same force, rewritten as:.

It indicates that the deformations are smaller for the bar with a higher elastic modulus. In this case, the material is said to be more rigid.

Nonlinear materials

When certain materials are considered, such as copper, where the stress-strain curve does not have any linear section, a difficulty appears since the previous expression cannot be used. For this type of nonlinear materials, magnitudes comparable to the Young's modulus of linear materials can be defined, since the stretching stress and the deformation obtained are not directly proportional.

For these nonlinear elastic materials some type of apparent Young's modulus is defined. The most common possibility to do this is to define the average secant modulus of elasticity, as the increase in stress applied to a material and the corresponding change in the unit strain it experiences in the direction of application of the stress:.

The other possibility is to define the tangent modulus of elasticity:

There are several non-exclusive "extensions" of the concept. For non-isotropic elastic materials, Young's modulus measured according to the previous procedure does not give constant values. However, it can be proven that there are three elastic constants E, E and E such that Young's modulus in any direction is given by:.

and where are the direction cosines of the direction in which we measure the Young's modulus with respect to three given orthogonal directions.

The dimensions of Young's modulus are.

In the International System of Units its most generalized unit is the Pascal "Pascal (unit)").

In some practical cases, kPa (soft tissues of the body), MPa (wood, bone) or even GPa (metals) are also used.

To see the value of the elastic modulus for various materials, consult the Annex: Elastoplastic constants of different materials.