This note shows that a complete solution can be found straightforwardly for any gravitational problem in 2-D or 3-D, giving a great deal more information than the standard model. Trace, scalar and vector antisymmetry laws are rigorously conserved. The acceleration due to gravity is split into the usual material contribution plus a contribution from the vacuum. The scalar and vector potentials are defined by Eqs. (7) and (11). They are related by Eq. (14), and this gives the scalar spin connection knowing the vector spin connection. For precessing orbits the vector spin connections are found as in Note 389(4) for forward and retrograde precessions. The vacuum contribution to g is found from Eq. (4). The vacuum contribution to omega, the gravitomagnetic field, is found from Eq. (10). The law of conservation of vector antisymmetry in 2-D is shown to be a balance or equilibrium between matter and vacuum. There is energy from the vacuum or spacetime or aether. The Lindstrom law of conservation of trace antisymmetry gives the time derivative of phi. The law (23) from the ECCE wave equation gives the second time derivative of phi. The gravitational vector potential is found from Eq. (24). Vacuum maps of many different kinds can be constructed from the spin connection terms and it is clear that the vacuum contributes in many different ways. This method can be switched in its entirety to electrodynamics and fluid dynamics, using the ECE2 triple unification of the UFT papers. There is very intense international interest in this work at present. Energy from spacetime is now well understood and thee is very intense international interest in the circuit papers UFT282 and UFT283.