Another shower of thoughts can be that lucky or unlucky simple never existed and things like lottery live on the fools who believe in fortune like something relevant.
Showerthoughts
A "Showerthought" is a simple term used to describe the thoughts that pop into your head while you're doing everyday things like taking a shower, driving, or just daydreaming. A showerthought should offer a unique perspective on an ordinary part of life.
Rules
- All posts must be showerthoughts
- The entire showerthought must be in the title
- Avoid politics
- NEW RULE as of 5 Nov 2024, trying it out
- Political posts often end up being circle jerks (not offering unique perspective) or enflaming (too much work for mods).
- Try c/politicaldiscussion, volunteer as a mod here, or start your own community.
- Posts must be original/unique
- Adhere to Lemmy's Code of Conduct-----
People who believe in luck are the ones to buy lottery tickets or think they have a system for winning at a casino.
People who understand statistics know that the lottery is a tax on people who believe in luck.
When playing poker, there are always more optimists at the table than statisticians. Be the statistician...
Probability theory to the rescue:
Assume you have two binary variables X and Y. X is equal to 1 if you're sick, 0 otherwise. Y is equal to 1 if you win the lottery, 0 otherwise.
Your question implicitly asks what the probability of winning would be given that you're not sick. By definition that would be:
p = P("X=0" and "Y=1") / P("X=0")
And you're stuck with the "X=0" and "Y=1"
event as you need some knowledge about how X and Y are related to each other.
In other words, does your health have any effect on how the lottery machine works? Or vice versa, does the lottery machine impact your health? As the answer to both is obviously no (as there's no physically possible way that could be true, unless you believe in the paranormal and there being some god who plays around with the probabilities), it's reasonable to assume that X and Y are independent, in which case P("X=0" and "Y=1") = P("X=0") * P("Y=1")
, but then this simply means that p = P("Y=1")
, ie your health doesn't matter: whether you're healthy or sick, that doesn't change the probability of you winning the lottery.
1 or 0. Odds are 50/50. Got it.
I guess this goes into how you imagine luck.
Is it one stat that gets balanced all around? How do you know you didn't spend all your luck surviving something you didn't even know about. Does it take into account how the world affects you or just your actions? Maybe it's a general stat that affects everything by the same amount, which is the framework that goes with the "wow I nearly died, I should buy a lottery ticket".
Easiest is to determine it after the fact, as a relative value for all the stuff that happens to us outside our direct control.