let p be FinSequence; for n being Nat st n in dom p & n + 1 <= len p holds
mid (p,n,(n + 1)) = <*(p . n),(p . (n + 1))*>
let n be Nat; ( n in dom p & n + 1 <= len p implies mid (p,n,(n + 1)) = <*(p . n),(p . (n + 1))*> )
assume A1:
( n in dom p & n + 1 <= len p )
; mid (p,n,(n + 1)) = <*(p . n),(p . (n + 1))*>
then
n + 1 in dom p
by FINSEQ_3:25, XREAL_1:31;
then A2:
mid (p,(n + 1),(n + 1)) = <*(p . (n + 1))*>
by Th7;
thus mid (p,n,(n + 1)) =
<*(p . n)*> ^ (mid (p,(n + 1),(n + 1)))
by A1, Th8, XREAL_1:29
.=
<*(p . n),(p . (n + 1))*>
by A2, FINSEQ_1:def 9
; verum