let K be Field; for p, q being FinSequence of K
for i being Nat st i in dom p & i in dom q & p . i = 1. K & ( for k being Nat st k in dom p & k <> i holds
p . k = 0. K ) holds
Sum (mlt (p,q)) = q . i
let p, q be FinSequence of K; for i being Nat st i in dom p & i in dom q & p . i = 1. K & ( for k being Nat st k in dom p & k <> i holds
p . k = 0. K ) holds
Sum (mlt (p,q)) = q . i
let i be Nat; ( i in dom p & i in dom q & p . i = 1. K & ( for k being Nat st k in dom p & k <> i holds
p . k = 0. K ) implies Sum (mlt (p,q)) = q . i )
assume that
A1:
( i in dom p & i in dom q )
and
A2:
( p . i = 1. K & ( for k being Nat st k in dom p & k <> i holds
p . k = 0. K ) )
; Sum (mlt (p,q)) = q . i
reconsider r = mlt (p,q) as FinSequence of K ;
A3:
for k being Nat st k in dom r & k <> i holds
r . k = 0. K
by A2, Th16;
A4:
( dom p = Seg (len p) & dom q = Seg (len q) )
by FINSEQ_1:def 3;
( dom (mlt (p,q)) = Seg (len (mlt (p,q))) & len (mlt (p,q)) = min ((len p),(len q)) )
by Th15, FINSEQ_1:def 3;
then
(dom p) /\ (dom q) = dom (mlt (p,q))
by A4, FINSEQ_2:2;
then A5:
i in dom r
by A1, XBOOLE_0:def 4;
then
r . i = q . i
by A2, Th16;
hence
Sum (mlt (p,q)) = q . i
by A5, A3, Th14; verum