If there is injection from A to B, and an injection from B to A then there must exist a bijection from A to B.
This isn't homework.
This isn't homework.
YAMT: Set Theory Proof
- Thread starter DVK916
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Another way to look at this is.
Cardinality of A is less than or equal to the Cardinality B, and the Cardinality of B is less than or equal to the Cardinality of A. Then the Cardinality of A equals the Cardinality of B.
Prove this.
Cardinality of A is less than or equal to the Cardinality B, and the Cardinality of B is less than or equal to the Cardinality of A. Then the Cardinality of A equals the Cardinality of B.
Prove this.
jesus christ man, let someone get a word in before you you hit the reply button. 4 replys in like 5minutes isn't necessary. there is an EDIT button for a reason.
assume the contrary, that A != B. then there exists an element c which exists only in B but not A. since cardinality of A <= cardinality of B. with c, cardinality of A < cardinality of B, which violates the other problem statement.
This isn't a valid proof. I don't remember why. But my professor explained this proof doesn't work.
No he just asked us to look at this problem. Try to prove it on our own. But it isn't homework persay.
Yea.
Also saying assume cardinality of A is greater than the cardinality of B, but that violates the assumption that the cardinality of B is greater than or equal to the cardinality of A. Next assume cardinality of A is lesser than the cardinality of B, but that violates the assumption that the cardinality of A is greater than or equal to the cardinality of B. Therefore the cardinality of A equals the cardinality of B. <---- Many would think this proof is valid, but it isn't.
Originally posted by: blustori
which is the same thing as not knowing the answer.
Assuming that both A and B are sets for the function f
by definition if there exists an injection both ways, every Value in set A inputed into function F has a unique and corressponding value in Set B and every valin in set B has a unique and corressponding value in set A.
Therefore, there are no values that disprove an injection and by definition, that is the definition of a bijection
but I can't say that
Originally posted by: Goosemaster
Originally posted by: blustori
which is the same thing as not knowing the answer.
Assuming that both A and B are sets for the function f
by definition if there exists an injection both ways, every Value in set A inputed into function F has a unique and corressponding value in Set B and every valin in set B has a unique and corressponding value in set A.
Therefore, there are no values that disprove an injection and by definition, that is the definition of a bijection
but I can't say that
You seem to be making a leap. I don't think you can go from that to that.
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