Abstract
The plane problem of pure bending of a uniformly inhomogeneous curved beam bounded by two arcs of concentric circles and two radii, is considered. It is assumed that the material of the beam is isotropic, has a constant Poisson's ratio and a coordinate-dependent Young's modulus. It is shown that when the Young's modulus is defined in a specified manner, men the problem has an exact, elementary solution, and the solution is given.
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