Before I say anything, I will preface this by stating that I am new to the forum. While I have engaged in countless philosophical discussions before, I am not familiar with how OPs and replies are created/phrased on this forum particularly.

Anyway, to the point of the post:
I have been thinking a lot recently about the idea of "perceived probability" (I just made up that term, but it probably has been used before, possibly even to reference this idea). It is the idea that in real-world situations where chance is agreed on to be the decider of events due to lack of knowledge (like the order of a card deck after shuffling, ignoring the fact that it isn't actually random at all), while the chance to get a particular result may be a certain (likely lower) chance, the probability of getting any result that would result in the same reaction might be higher.

I have noticed that in some scenarios, this is accounted for, like how instead of just saying that the chance to get any particular 5-card poker hand is 0.0000384769292% (or 1 in 2,598,956), we group them in categories of hands. This represents this principle better.

However, in some other cases, it is ignored, especially with really rare occurrences (I had an example in my mind but I forgot about it before I got to making this post, so I'll just be general here). People tend to comment on how rare something is, often ignoring either other things that could have (but didn't happen) that would have had a similar effect or the number of instances where the thing could have happened but didn't. These things could be put in categories as well.

Following this train of thought, a way to work with all these other disregarded possible occurrences (and still provide an accurate representation of the probability according to this) could be to simply ignore the statistical chance of something happening that you weren't considering and only regard something as its statistical chance if you were thinking of it specifically. You would simply modify your perceived probability based on these factors.

It doesn't seem right that you just completely ignore the other occurrences, though. After all, the only difference is what the observer thought of them. This begs the question: why does it matter what we think about probabilities? Maybe it could help us understand the bias related to them regarding these conditions? There could also be other things that make a specific outcome significant, such as its actual effect (not the reaction of the observer). I would argue that there is little difference between outcomes if the effect on the observer and the reaction by the observer are the same.

This eventually leads to many philosophical questions relating to probability, which is a larger topic that I don't have the time or energy to share my complete thoughts on. I think I had more thoughts on this, but while writing this post forgot some of them.

I would like to see other people's thoughts on this (especially about what makes an outcome significant, and see if I can expand this idea to a more complete set of principles regarding my consideration of probability.