the boundary conditions at a clamped end of a beam is given by
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It is a general mathematical principle that the number of boundary conditions necessary to determine a solution to a differential equation matches the order of the differential equation. The static beam equation is fourth-order (it has a fourth derivative), so each mechanism for supporting the beam should give rise to four boundary conditions.
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It is a general mathematical principal that the number of boundary conditions necessary to determine a solution to a differential equation.
the static beam equation is fourth order (it has a fourth derivative )so each mechanism for supporting the beam should give rise to four boundary conditions
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