If you have the points coordinates, you can try minimizing the error by defining an appropriate functional of error, that depends on angle and offset.
This problem becomes solvable by linear least squares method if you also have a scale in your transform. In that case, the solution in Matlab is easy:
Let x,y be your original points, and xt,yt the result points.
tform = cp2tform([x,y],[xt,yt],'linear conformal');
This transform can be applied on the image using
In case you model does not have scale, and it is rotate and shift only, you can find an approximate solution by the following least squares equations:
( x1 y1 1 0) (x1t)
(-y1 x1 0 1) (y1t)
( x2 y2 1 0) (x2t)
(-y2 x2 0 1) * ( cos(theta) ) (y1t)
... ( sin(theta) ) =
... ( xc )
... ( yc )
(xn yn 1 0)
(-yn xn 0 1) (ynt)
Obviously, you can't force cos(theta) and sin(theta) to have the same theta, so the solution is approximate. It can serve as an initial solution and refined by gradient descent method.