A paraboloid of revolution is an axially symmetric surface generated by rotating a parabola around its axis. This shape has several applications in engineering, such as for designing submarines that have reduced drag, self-supporting domes that do not need extra support, and dish antennas that focus electromagnetic waves toward the receiver at its focal point. For calculating an object's weight-bearing capacity and stress absorption, knowing the centroid is crucial and helps engineers design more robust support systems. Consider an appropriate coordinate system for locating the centroid of the paraboloid of revolution. A differential element in the shape of a thin disk is chosen that intersects the generating curve at an arbitrary point and defines its radius in terms of the given coordinate. The volume and moment arm are calculated for the differential element. These values are then substituted into the centroid equation. Finally, the limits are set up from two extreme locations, and the integration is solved to obtain the location of the centroid.