Finding the intersection of A times B and B times A

katdoringlo

katdoringlo

Answered question

2022-09-04

Finding the intersection of A × B and B × A
Let A = { x , 3 } and B = { y , 3 , z } . List all of the elements in the set ( A × B ) ( B × A ).
Is the Cartesian product of the two sets listed above a set of 2-ordered tuples? And the intersection is just the elements that A × B has in common with B × A? That is,
A × B = { x , 3 } × { y , 3 , z } = { ( x , y ) , ( x , 3 ) , ( x , z ) , ( 3 , y ) , ( 3 , 3 ) , ( 3 , z ) } B × A = { y , 3 , z } × { x , 3 } = { ( y , x ) , ( y , 3 ) , ( 3 , x ) , ( 3 , 3 ) , ( z , x ) , ( z , 3 ) }
giving ( A × B ) ( B × A ) = { ( 3 , 3 ) }
Is there some higher order of precedence? And I assume order matters, right?

Answer & Explanation

ko1la2h1qc

ko1la2h1qc

Beginner2022-09-05Added 18 answers

Step 1
Throughout, I assume x,y,z are distinct items.
Is the cartesian product of the two sets listed above a set of 2-ordered tuple?
Indeed.
And the intersection is just the elements that A × B has in common with B × A?
Correct.
A × B = { x , 3 } × { y , 3 , z } = { ( x , y ) , ( x , 3 ) , ( x , z ) , ( 3 , y ) , ( 3 , 3 ) , ( 3 , z ) } B × A = { y , 3 , z } × { x , 3 } = { ( y , x ) , ( y , 3 ) , ( 3 , x ) , ( 3 , 3 ) , ( z , x ) , ( z , 3 ) }
These, too, are correct.
( A × B ) ( B × A ) = { ( 3 , 3 ) }
This is correct as well.
And I assume order matters, right?
Step 2
In an ordered pair, order does matter. So (x,y) and (y,x) are different things, on the presumption x y.
On the other hand, within a set, order does not matter. So {x,y} and {y,x} are the same sets.
As you have seen, too, the Cartesian product of sets is not necessarily commutative as well. So you might have that A × B and B × A give you different sets, as you have seen above.
Is there some higher order of precedence?
This, however, I'm not sure what you mean by, and so I can't answer it.

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