Abstract
Abstract The thermal stresses for the plane-stress problem of a circular hot spot in an infinitely long straight strip of rectangular cross section are derived by a Fourier integral approach. The hot spot is located on the longitudinal center line of the strip, and its radius is such that the boundary of the hot spot is tangent to both edges of the strip. The temperature may be any function of the radius within the hot spot and is assumed to have a constant value (zero) throughout the rest of the strip. Numerical values are given for the stresses on the edges and both center lines of the strip for a particular case.
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