let V be Z_Module; :: thesis: for v being VECTOR of V
for l being Z_Linear_Combination of {v} holds Sum l = (l . v) * v
let v be VECTOR of V; :: thesis: for l being Z_Linear_Combination of {v} holds Sum l = (l . v) * v
let l be Z_Linear_Combination of {v}; :: thesis: Sum l = (l . v) * v
A1: Carrier l c= {v} by Def21;
now :: thesis: Sum l = (l . v) * v
per cases ( Carrier l = {} or Carrier l = {v} ) by A1, ZFMISC_1:33;
suppose Carrier l = {} ; :: thesis: Sum l = (l . v) * v
then A2: l = Z_ZeroLC V by Def20;
hence Sum l = 0. V by Lm1
.= (l . v) * v by A2, Th9, ZMODUL01:1 ;
:: thesis: verum
end;
suppose Carrier l = {v} ; :: thesis: Sum l = (l . v) * v
then consider F being FinSequence of V such that
A3: ( F is one-to-one & rng F = {v} ) and
A4: Sum l = Sum (l (#) F) by Def23;
F = <*v*> by A3, FINSEQ_3:97;
then l (#) F = <*((l . v) * v)*> by Th15;
hence Sum l = (l . v) * v by A4, RLVECT_1:44; :: thesis: verum
end;
end;
end;
hence Sum l = (l . v) * v ; :: thesis: verum