theorem
  for S being IC-Ins-separated halting non empty with_non-empty_values
     AMI-Struct over N
 for P being Instruction-Sequence of S
 for s being State of S st ex k st P halts_at IC Comput(P,s,k)
   for i holds Result(P,s) = Result(P,Comput(P,s,i))
by Th8;
