We motivated the original definition of $A\rfloor B$ in (3.6) in terms of geometrical subspaces as “A taken out of B”. This is clearly asymmetrical in A and B, and we could also have used the same geometrical intuition to define an operation $ B \lfloor A$, interpreted as “take B and remove A from it.” The two are so closely related that we really only need one to set up our algebra, but occasionally formulas get simpler when we switch over to this other contraction. Let us briefly study their relationship
PG-79 , Leo Dorst Geometric Algebra book
I don't quite get what is the difference is between "A taken out of B" and "take B and remove A from it".. in English isn't "a ball taken out of the bag " and "take a bag and then take the ball out" the same procedure..?
Definition of right contraction:
$$ B \star (A \wedge X) = (B \lfloor A) \star X$$
Left contraction is defined axiomatically in the book on page 74. Also wiki link.