Diagonalization: Difference between revisions
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(Created page with ": ''The real numbers are uncountable and the halting problem is undecidable.'' The nice thing about squares is that they have a diagonal. By extension, if you have a square of letters — usually by having obtained ''n'' words that are all ''n'' letters each — it’s often worth looking at the diagonal of that. :'''A'''LIENS<br>E'''N'''OUGH<br>BU'''S'''TER<br>BLO'''W'''UP<br>HARV'''E'''Y<br>BENHU'''R''' == Example Puzzles == ''(add puzzles that use this element her...") |
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The nice thing about squares is that they have a diagonal. By extension, if you have a square of letters — usually by having obtained ''n'' words that are all ''n'' letters each — it’s often worth looking at the diagonal of that. |
The nice thing about squares is that they have a diagonal. By extension, if you have a square of letters — usually by having obtained ''n'' words that are all ''n'' letters each — it’s often worth looking at the diagonal of that. |
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:'''A'''LIENS<br>E'''N'''OUGH<br>BU'''S'''TER<br>BLO'''W'''UP<br>HARV'''E'''Y<br>BENHU'''R''' |
:<span style='font-family: monospace'>'''A'''LIENS<br>E'''N'''OUGH<br>BU'''S'''TER<br>BLO'''W'''UP<br>HARV'''E'''Y<br>BENHU'''R'''</span> |
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== Example Puzzles == |
== Example Puzzles == |
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Revision as of 19:48, 15 March 2022
- The real numbers are uncountable and the halting problem is undecidable.
The nice thing about squares is that they have a diagonal. By extension, if you have a square of letters — usually by having obtained n words that are all n letters each — it’s often worth looking at the diagonal of that.
- ALIENS
ENOUGH
BUSTER
BLOWUP
HARVEY
BENHUR
Example Puzzles
(add puzzles that use this element here)
