Where can I find puzzles on countable and uncountable sets? [closed]
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I read some puzzles by Raymond Smullyan on countable and uncountable sets, are there other puzzles on that topic?
reference-request set-theory puzzle
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closed as too broad by Lord Shark the Unknown, Asaf Karagila♦ Feb 2 at 9:00
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
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$begingroup$
I read some puzzles by Raymond Smullyan on countable and uncountable sets, are there other puzzles on that topic?
reference-request set-theory puzzle
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closed as too broad by Lord Shark the Unknown, Asaf Karagila♦ Feb 2 at 9:00
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
1
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Find a set bigger than $mathbb{N}$ but smaller than $mathbb{R}$.
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– badjohn
Feb 2 at 7:26
1
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I know a few puzzles but nothing close to a collection. It may help if you give some examples so we know what you mean by puzzle in this context.
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– Andrés E. Caicedo
Feb 2 at 13:47
add a comment |
$begingroup$
I read some puzzles by Raymond Smullyan on countable and uncountable sets, are there other puzzles on that topic?
reference-request set-theory puzzle
$endgroup$
I read some puzzles by Raymond Smullyan on countable and uncountable sets, are there other puzzles on that topic?
reference-request set-theory puzzle
reference-request set-theory puzzle
edited Feb 2 at 13:46
Andrés E. Caicedo
65.9k8160252
65.9k8160252
asked Feb 2 at 4:13
Dreamer123Dreamer123
33229
33229
closed as too broad by Lord Shark the Unknown, Asaf Karagila♦ Feb 2 at 9:00
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
closed as too broad by Lord Shark the Unknown, Asaf Karagila♦ Feb 2 at 9:00
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
1
$begingroup$
Find a set bigger than $mathbb{N}$ but smaller than $mathbb{R}$.
$endgroup$
– badjohn
Feb 2 at 7:26
1
$begingroup$
I know a few puzzles but nothing close to a collection. It may help if you give some examples so we know what you mean by puzzle in this context.
$endgroup$
– Andrés E. Caicedo
Feb 2 at 13:47
add a comment |
1
$begingroup$
Find a set bigger than $mathbb{N}$ but smaller than $mathbb{R}$.
$endgroup$
– badjohn
Feb 2 at 7:26
1
$begingroup$
I know a few puzzles but nothing close to a collection. It may help if you give some examples so we know what you mean by puzzle in this context.
$endgroup$
– Andrés E. Caicedo
Feb 2 at 13:47
1
1
$begingroup$
Find a set bigger than $mathbb{N}$ but smaller than $mathbb{R}$.
$endgroup$
– badjohn
Feb 2 at 7:26
$begingroup$
Find a set bigger than $mathbb{N}$ but smaller than $mathbb{R}$.
$endgroup$
– badjohn
Feb 2 at 7:26
1
1
$begingroup$
I know a few puzzles but nothing close to a collection. It may help if you give some examples so we know what you mean by puzzle in this context.
$endgroup$
– Andrés E. Caicedo
Feb 2 at 13:47
$begingroup$
I know a few puzzles but nothing close to a collection. It may help if you give some examples so we know what you mean by puzzle in this context.
$endgroup$
– Andrés E. Caicedo
Feb 2 at 13:47
add a comment |
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$begingroup$
Find a set bigger than $mathbb{N}$ but smaller than $mathbb{R}$.
$endgroup$
– badjohn
Feb 2 at 7:26
1
$begingroup$
I know a few puzzles but nothing close to a collection. It may help if you give some examples so we know what you mean by puzzle in this context.
$endgroup$
– Andrés E. Caicedo
Feb 2 at 13:47