let X be RealUnitarySpace; for seq being sequence of X holds 1 * seq = seq
let seq be sequence of X; 1 * seq = seq
let n be Element of NAT ; FUNCT_2:def 8 (1 * seq) . n = seq . n
thus (1 * seq) . n =
1 * (seq . n)
by NORMSP_1:def 5
.=
seq . n
by RLVECT_1:def 8
; verum