Some S is in M.
Some S is not in P.
m (muta, or move) indicates that the premisses have to be transposed. Thus, in CAmEstrEs, you have to transpose the premisses, as well as simply convert the Minor Premiss before reaching the figure of CElArEnt.
| All P is in M | = | No M is in S |
| No S is in M | All P is in M. |
From this it follows in CElArEnt that No P is in S, and this simply converted yields No S is in P.
A simple transposition of the premisses in DImArIs of the Fourth
Some P is in M
All M is in S
yields the premisses of DArII
All M is in S