Abstract
The unsteady MHD flow of an incompressible micropolar fluid have been considered. The fluid is filling the semi-infinite space z>0 which is in contact with an infinite porous rotating disk at z=0. The common angular velocity of the disk and fluid at infinity is Omega. The fluid is electrically conducting in presence of an applied constant magnetic field B-0. Initially the disk and the fluid are rotating about the z'-axis and at time t=0, suddenly the disk starts rotating about the z-axis and moving with uniform acceleration, while the fluid at infinity continue to rotate about z'-axis with same angular velocity Omega. The axes of rotation of both the disk and that of the fluid at infinity are assumed to be in the plane x=0, and distance between axes is l. The governing problem is solved numerically using Newton's method. Numerical results explaining the effects of various parameters associated with the flow are discussed graphically.