Difference between revisions of "Talk:2403: Wrapping Paper"
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The method of inverse geometry: We place a spherical cage in the desert and enter it. We then perform an inverse operation with respect to the cage. The lion is then inside the cage and we are outside. | The method of inverse geometry: We place a spherical cage in the desert and enter it. We then perform an inverse operation with respect to the cage. The lion is then inside the cage and we are outside. | ||
[[User:Bmwiedemann|Bmwiedemann]] ([[User talk:Bmwiedemann|talk]]) 02:41, 26 December 2020 (UTC) | [[User:Bmwiedemann|Bmwiedemann]] ([[User talk:Bmwiedemann|talk]]) 02:41, 26 December 2020 (UTC) | ||
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| + | == My hobby == | ||
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| + | Prank Randall by selling him wrapping paper that is printed on both sides so he can't turn it inside out | ||
| + | [[Special:Contributions/172.69.33.220|172.69.33.220]] 02:46, 26 December 2020 (UTC) | ||
Revision as of 02:46, 26 December 2020
Merry Christmas -- bubblegum (talk) (please sign your comments with ~~~~)
I was reminded of the old http://bjornsmaths.blogspot.com/2005/11/how-to-catch-lion-in-sahara-desert.html
The method of inverse geometry: We place a spherical cage in the desert and enter it. We then perform an inverse operation with respect to the cage. The lion is then inside the cage and we are outside.
Bmwiedemann (talk) 02:41, 26 December 2020 (UTC)
My hobby
Prank Randall by selling him wrapping paper that is printed on both sides so he can't turn it inside out 172.69.33.220 02:46, 26 December 2020 (UTC)
