let G be non empty join-commutative join-associative Robbins ComplLLattStr ; for x being Element of G holds \delta (((x _1) + (x _2)),x) = x _0
let x be Element of G; \delta (((x _1) + (x _2)),x) = x _0
thus x _0 =
Expand ((x _3),(x _0))
by Th36
.=
\delta (((x _1) + (x _2)),(\delta ((x _3),(x _0))))
by Th43
.=
\delta (((x _1) + (x _2)),x)
by Th45
; verum