Mow

where c are constants and term in r4 is the particular solution.

Let us assume a circular pad acting at its contour. The determination of the flexure must be dissociated into inner and outer zones with respect to radius r = b of the supporting pad. It is useful to introduce dimensionless current radius p and flexure function Z(p) as qa4 ¡Z1(p), 0 < p < b/a, p = r/a, z(r) = — x^ ^ / (8J1)

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