I recently had a disagreement with a friend about what it means for an event to have a probability of happening every X times.
Take for example a coin that if flipped has a 50% probability of landing heads and a 50% probability of landing tails.
My understanding is that while the probability of landing tails 3 consecutive times is smaller than that of landing it 2 consecutive times, if in the last two flips you got tails it has no effect on the probability of you getting tails in the following coin flip.it stays 50-50.
But he seems to believe that the probability of you getting tails gets smaller and smaller the more you land multiple consecutive tails.which sounds very counter intuitive to me.
For a more concrete example, he seems to think that if an event has a probability of occuring every 10 years, and it’s been more than 10 years since the last time it occured, we are living on borrowed time and the probability of it happening now is extremely high while I think it had the same probability of occuring today than it had of occuring 9 years ago.
Which one of us is wrong, please give examples.
In: 5
A few questions for your friend that might help, roughly in order you should ask them:
If you flip a coin, and it lands on tails, according to them, the odds of getting heads next time is larger. But what if you flipped it in secret, and all those flips landed on tails?
What if you flip coins, but don’t keep track? Does that have an influence?
Does the coin being flipped have a memory of all the outcomes of its previous flips? It would need one in order to keep track of how many tails it got in the span of its entire life.
If you drop a coin, does that count as a flip, or does there have to be intent?
What if you flip it, but catch it before it lands?
Latest Answers