Imagine you were the great Mathematician Georg Cantor. Would you prove that the Rational numbers (a/b with a,b being Natural numbers (0,1,2...) and b different from 0) are countables (i.e. the size of the sets of Rational and Natural numbers is the same) ?
Explanation: https://www.youtube.com/watch?v=WQWkG9cQ8NQ
Explanation: https://www.youtube.com/watch?v=WQWkG9cQ8NQ
YouTube
Integers & Rationals are both infinite but is it the SAME infinity?
What does it mean for two infinite sets to have the same size? For instance, are the Integers and the Rationals (numbers like 2/3) the same size? They are certainly both infinite, but the question is whether infinite really only represents one concept or…
TROLLEY PROBLEMS
Did you really count if there were 100 guys tied to the track ? What a nerd !!! We appreciate it anyways. We promise to tie 400 more innocent people once we reach 500 members. Help us for more fun. It will be worth for sure !!
REMINDER:
We are close.
Let's make it possible for more surprises.
Help us by sharing our Trolley Problems Channel (@trolleyproblems) with your friends.
Thanks 😊💪
We are close.
Let's make it possible for more surprises.
Help us by sharing our Trolley Problems Channel (@trolleyproblems) with your friends.
Thanks 😊💪