A problem you have that is out of your control, something you just have to ride out until the solution comes to you. Much like a horse inside of an elevator.
by whyen October 23, 2022
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Get the frobbin problem mug.Ken's a nice guy most of the time, but he's really disrespectful towards women. My conscience won't let me be friends with him. But he gives me rides to work. But he steals our coworkers' food. What a lasagna problem.
I'm so hungry right now. I'd do anything for a warm slice of hearty, meaty, cheesy, Italian heaven.
I'm so hungry right now. I'd do anything for a warm slice of hearty, meaty, cheesy, Italian heaven.
by Not sick... yet February 23, 2017
Get the Lasagna Problem mug.Problems that your typical Brenden would have. Like breaking a chair out of frustration then deciding that you actually needed the chair to sit in and kept the chair.
"I threw my controller on the ground and now it's broken but I really still want to finish this game."
"Sounds like a Brenden Problem"
"Sounds like a Brenden Problem"
by Iaea August 10, 2019
Get the Brenden Problem mug.The counting problem is also known as "Tarski's revenge."
It stands alongside two major problems in mathematics called the "compositional-unit problem" and the "unit-of-measurement problem." It is trying to determine how many points there are in an object.
It stands alongside two major problems in mathematics called the "compositional-unit problem" and the "unit-of-measurement problem." It is trying to determine how many points there are in an object.
Tarski's nihilism indicates that infinity plus an uncountable number of exterior points equate to an infinite number of points.
This is the solution to the counting problem.
A NON-Tarski object has the uncountable points on the INTERIOR surface with the infinite points; indicating that Godel's incompleteness theorem is stating that mathematics is unable to count the uncountable set of Tarski-points if they lie to the interior of the surface.
This is the solution to the counting problem.
A NON-Tarski object has the uncountable points on the INTERIOR surface with the infinite points; indicating that Godel's incompleteness theorem is stating that mathematics is unable to count the uncountable set of Tarski-points if they lie to the interior of the surface.
by flightfacilities February 21, 2022
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