Galileo's paradox (Q2915190)
Jump to navigation
Jump to search
not all numbers are squares, so all the numbers, including both squares and non-squares, must be more numerous than just the squares; yet, for every number there is exactly one square, so there cannot be more of one than of the other
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Galileo's paradox |
not all numbers are squares, so all the numbers, including both squares and non-squares, must be more numerous than just the squares; yet, for every number there is exactly one square, so there cannot be more of one than of the other |
Statements
Identifiers
Sitelinks
Wikipedia(14 entries)
- afwiki Galileo se paradoks
- bgwiki Парадокс на Галилей
- cawiki Paradoxa de Galileu
- dewiki Galileis Paradoxon
- enwiki Galileo's paradox
- eswiki Paradoja de Galileo
- fiwiki Galilein paradoksi
- hewiki הפרדוקס של גלילאו
- hywiki Գալիլեյի պարադոքս
- nlwiki Paradox van Galilei
- pmswiki Paradòss ëd Galilei
- ptwiki Paradoxo de Galileu
- ruwiki Парадокс Галилея
- ukwiki Парадокс Галілея