let N be Element of NAT ; for r, q being Real
for seq being Real_Sequence of N holds (r * q) * seq = r * (q * seq)
let r, q be Real; for seq being Real_Sequence of N holds (r * q) * seq = r * (q * seq)
let seq be Real_Sequence of N; (r * q) * seq = r * (q * seq)
let n be Element of NAT ; FUNCT_2:def 8 ((r * q) * seq) . n = (r * (q * seq)) . n
thus ((r * q) * seq) . n =
(r * q) * (seq . n)
by LmDef3
.=
r * (q * (seq . n))
by EUCLID:30
.=
r * ((q * seq) . n)
by LmDef3
.=
(r * (q * seq)) . n
by LmDef3
; verum