The conundrum of the observer seeing that which he does not remember and remembering that which he does not see.
Memory-appearance conundrum.
Memory-appearance conundrum.
The Vikaasian problem asks why human beings remember the past and not the future. The future can be seen.
by sandraxine December 13, 2018
Get the Vikaasian problemmug. by P-Jones October 28, 2013
Get the frobbin problemmug. We say that a study's design is not biased if which of the following is true?
Answer: no outcomes are systematically favored
Answer: no outcomes are systematically favored
by user_1223332323 November 5, 2020
Get the Statistics Problemsmug. 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
Get the Horse Problemmug. (from the show)
Gavin: I’ve seen your cock... I’m gonna make it so big and thick, it’s gonna be a problem.
Tyler: I don’t think he wants a problem cock?
Gavin: I’ve seen your cock... I’m gonna make it so big and thick, it’s gonna be a problem.
Tyler: I don’t think he wants a problem cock?
by nibbamarijuana December 17, 2020
Get the problem cockmug. by Namestypicalmeaning January 2, 2021
Get the You're the 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
Get the counting problemmug.