let X be non empty set ; for A being set
for f being Function of X,(Fin A)
for i being Element of X
for B being Element of Fin X holds FinUnion (B \/ {.i.}),f = (FinUnion B,f) \/ (f . i)
let A be set ; for f being Function of X,(Fin A)
for i being Element of X
for B being Element of Fin X holds FinUnion (B \/ {.i.}),f = (FinUnion B,f) \/ (f . i)
let f be Function of X,(Fin A); for i being Element of X
for B being Element of Fin X holds FinUnion (B \/ {.i.}),f = (FinUnion B,f) \/ (f . i)
let i be Element of X; for B being Element of Fin X holds FinUnion (B \/ {.i.}),f = (FinUnion B,f) \/ (f . i)
let B be Element of Fin X; FinUnion (B \/ {.i.}),f = (FinUnion B,f) \/ (f . i)
A1:
FinUnion A is associative
by Th51;
( FinUnion A is idempotent & FinUnion A is commutative )
by Th49, Th50;
hence FinUnion (B \/ {.i.}),f =
(FinUnion A) . (FinUnion B,f),(f . i)
by A1, Th41, Th53
.=
(FinUnion B,f) \/ (f . i)
by Def4
;
verum