deffunc H₁( Nat) -> Element of INT = SDSub2INTDigit (x,$1,k);
consider z being FinSequence of INT such that
A1: len z = n and
A2: for j being Nat st j in dom z holds
z . j = H₁(j) from FINSEQ_2:sch 1();
A3: dom z = Seg n by A1, FINSEQ_1:def 3;
z is Element of n -tuples_on INT by A1, FINSEQ_2:92;
then reconsider z = z as Tuple of n, INT ;
take z ; :: thesis: for i being Nat st i in Seg n holds
z /. i = SDSub2INTDigit (x,i,k)
let i be Nat; :: thesis: ( i in Seg n implies z /. i = SDSub2INTDigit (x,i,k) )
assume A4: i in Seg n ; :: thesis: z /. i = SDSub2INTDigit (x,i,k)
then i in dom z by A1, FINSEQ_1:def 3;
hence z /. i = z . i by PARTFUN1:def 6
.= SDSub2INTDigit (x,i,k) by A2, A3, A4 ;
:: thesis: verum