This study deals with the geometrically nonlinear axisymmetric static and transient analysis of cylindrically orthotropic thin circular plate with elastically restrained edge for rotation and inplane displacements, under a concentrated load at the center. Analogue of Von-Karman differential equations in terms of normal displacement w and stress function ψ have been employed. The displacement w and stress function ψ are expanded in finite power series. Orthogonal point collocation method in space do main and Newmark-β scheme in time domain have been used. New results are presented for orthotropic plate for edge conditions spanning the range of elastic edge restraints from the movable simply supported edge to the immovable clamped edge. The influence of orthotropic parameter and the elastic rotation and inplane edge restraint parameters on the response has been investigated.