- #1
greatscott
- 14
- 0
I have just discovered how to stop worrying! Here it goes (Unicode):
Definition.
Definition.
Let H be the set of all humans, A the set of all actions, and W ⊂A be the set of all worries. A person p ∈ H is said to be worrying if and only if p's set of choices C = {f(p)} (where f(p) ∈ A) either has more than one elements or has precisely one element c ∈ W.
Theorem.The only way to stop worrying is to decide to do so.
Proof.If a person p ∈ H makes a decision not to worry, which we denote as n ∉ W, rather than to worry, which we denote as w, then C = {f(p)} = {n} which has only one element. If p decides to worry, p is certainly worrying since C = {w} where w ∈ W. Now, if p does not decide whether to worry or not, p's set of choices has at least two elements, namely C = {n, w, ...}. Therefore, the only way to stop worrying is to decide not to worry. ∎
Last edited: