theorem
for
X being
set for
x,
y,
z being
Subset of
X for
q being
FinSequence of
BOOLEAN holds
( (
q . 1
= TRUE implies
(MergeSequence (<*x,y,z*>,q)) . 1
= x ) & (
q . 1
= FALSE implies
(MergeSequence (<*x,y,z*>,q)) . 1
= X \ x ) & (
q . 2
= TRUE implies
(MergeSequence (<*x,y,z*>,q)) . 2
= y ) & (
q . 2
= FALSE implies
(MergeSequence (<*x,y,z*>,q)) . 2
= X \ y ) & (
q . 3
= TRUE implies
(MergeSequence (<*x,y,z*>,q)) . 3
= z ) & (
q . 3
= FALSE implies
(MergeSequence (<*x,y,z*>,q)) . 3
= X \ z ) )