let a, b be Real; :: thesis: for n being Nat holds (a,b) Subnomial (n + 2) = (<*(a |^ (n + 2))*> ^ ((a * b) * ((a,b) Subnomial n))) ^ <*(b |^ (n + 2))*>
let n be Nat; :: thesis: (a,b) Subnomial (n + 2) = (<*(a |^ (n + 2))*> ^ ((a * b) * ((a,b) Subnomial n))) ^ <*(b |^ (n + 2))*>
reconsider f = (b,a) Subnomial n as complex-valued FinSequence ;
A0: Rev ((b,a) Subnomial (n + 1)) = Rev (<*(b |^ (n + 1))*> ^ (a * ((b,a) Subnomial n))) by SAN
.= (Rev (a * ((b,a) Subnomial n))) ^ (Rev <*(b |^ (n + 1))*>) by FINSEQ_5:64
.= (a * (Rev ((b,a) Subnomial n))) ^ (Rev <*(b |^ (n + 1))*>) by CREV
.= (a * ((a,b) Subnomial n)) ^ <*(b |^ (n + 1))*> by SAB ;
(a,b) Subnomial ((n + 1) + 1) = <*(a |^ (n + 2))*> ^ (b * ((a,b) Subnomial (n + 1))) by SAN
.= <*(a |^ (n + 2))*> ^ (b * (Rev ((b,a) Subnomial (n + 1)))) by SAB
.= <*(a |^ (n + 2))*> ^ ((b * (a * ((a,b) Subnomial n))) ^ (b * <*(b |^ (n + 1))*>)) by A0, ADP
.= (<*(a |^ (n + 2))*> ^ (b * (a * ((a,b) Subnomial n)))) ^ (b * <*(b |^ (n + 1))*>) by FINSEQ_1:32
.= (<*(a |^ (n + 2))*> ^ (b * (a * ((a,b) Subnomial n)))) ^ <*(b * (b |^ (n + 1)))*> by AMP
.= (<*(a |^ (n + 2))*> ^ (b * (a * ((a,b) Subnomial n)))) ^ <*(b |^ ((n + 1) + 1))*> by NEWTON:6
.= (<*(a |^ (n + 2))*> ^ ((b * a) * ((a,b) Subnomial n))) ^ <*(b |^ ((n + 1) + 1))*> by VALUED_2:16 ;
hence (a,b) Subnomial (n + 2) = (<*(a |^ (n + 2))*> ^ ((a * b) * ((a,b) Subnomial n))) ^ <*(b |^ (n + 2))*> ; :: thesis: verum