Physics:Huber's equation

Huber's equation, first derived by a Polish engineer Tytus Maksymilian Huber, is a basic formula in elastic material tension calculations, an equivalent of the equation of state, but applying to solids. In most simple expression and commonly in use it looks like this:^[1] ${\displaystyle {\sigma }_{red}=\sqrt{({\sigma }^2)+3({\tau }^2)}}$

where ${\displaystyle \sigma }$ is the tensile stress, and ${\displaystyle \tau }$ is the shear stress, measured in newtons per square meter (N/m², also called pascals, Pa), while ${\displaystyle {\sigma }_{red}}$—called a reduced tension—is the resultant tension of the material.

Finds application in calculating the span width of the bridges, their beam cross-sections, etc.^{[citation needed]}

• Yield surface
• Stress–energy tensor
• Tensile stress
• von Mises yield criterion

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