Cartesian Poduct of sets:
The Cartesian product X x Y between two sets X and Y is the set of all possible ordered pairs with fist element from X and second from Y.
Example:
Let X = { a, b, c, d } and Y= { y, z}
Then, X x Y = { ( a, y) , ( a, z) ,(b, y ) , (b , z) , (c, y) , (c, z) , (d, y) , (d, z) }
For Associative Property of the Sets Click hereor for Distributive Property of the Sets Click here