let Z be set ; :: thesis: for n, i being Element of NAT
for r being Real
for f being PartFunc of Z,(REAL n) holds (proj (i,n)) * (r (#) f) = r (#) ((proj (i,n)) * f)
let n, i be Element of NAT ; :: thesis: for r being Real
for f being PartFunc of Z,(REAL n) holds (proj (i,n)) * (r (#) f) = r (#) ((proj (i,n)) * f)
let r be Real; :: thesis: for f being PartFunc of Z,(REAL n) holds (proj (i,n)) * (r (#) f) = r (#) ((proj (i,n)) * f)
let f be PartFunc of Z,(REAL n); :: thesis: (proj (i,n)) * (r (#) f) = r (#) ((proj (i,n)) * f)
A1: dom (r (#) f) = dom f by VALUED_2:def 39;
A2: dom (proj (i,n)) = REAL n by FUNCT_2:def 1;
then A3: rng (r (#) f) c= dom (proj (i,n)) ;
rng f c= dom (proj (i,n)) by A2;
then A4: dom ((proj (i,n)) * f) = dom f by RELAT_1:27;
then dom (r (#) ((proj (i,n)) * f)) = dom f by VALUED_1:def 5;
then A5: dom ((proj (i,n)) * (r (#) f)) = dom (r (#) ((proj (i,n)) * f)) by A1, A3, RELAT_1:27;
for z being Element of Z st z in dom (r (#) ((proj (i,n)) * f)) holds
((proj (i,n)) * (r (#) f)) . z = (r (#) ((proj (i,n)) * f)) . z hence (proj (i,n)) * (r (#) f) = r (#) ((proj (i,n)) * f) by A5, PARTFUN1:5; :: thesis: verum