let A be non degenerated commutative Ring; for S being non empty multiplicatively-closed without_zero Subset of A
for a, b being Element of A holds (canHom S) . (a - b) = ((canHom S) . a) - ((canHom S) . b)
let S be non empty multiplicatively-closed without_zero Subset of A; for a, b being Element of A holds (canHom S) . (a - b) = ((canHom S) . a) - ((canHom S) . b)
let a, b be Element of A; (canHom S) . (a - b) = ((canHom S) . a) - ((canHom S) . b)
thus (canHom S) . (a - b) =
((canHom S) . a) + ((canHom S) . (- b))
by VECTSP_1:def 20
.=
((canHom S) . a) - ((canHom S) . b)
by RING_2:7
; verum