{} in ((union N) \/ the carrier of (Trivial-AMI N)) * by FINSEQ_1:49;
then A1: {{}} c= ((union N) \/ the carrier of (Trivial-AMI N)) * by ZFMISC_1:31;
take X = (union N) \/ the carrier of (Trivial-AMI N); :: according to COMPOS_1:def 4 :: thesis: the Instructions of (Trivial-AMI N) c= [:NAT,(NAT *),(X *):]
{} in NAT * by FINSEQ_1:49;
then A2: {{}} c= NAT * by ZFMISC_1:31;
the Instructions of (Trivial-AMI N) = {[0,{},{}]} by Def1
.= [:{0},{{}},{{}}:] by MCART_1:35 ;
hence the Instructions of (Trivial-AMI N) c= [:NAT,(NAT *),(X *):] by A1, A2, MCART_1:73; :: thesis: verum