Given P(she smiles at you | she likes you) is approximately 1
Assuming P(she likes you) > 0
Then we can sub into
P(she likes you | she smiles at u) = (P(she smiles at you | she likes you) * P(she likes you))/P(she smiles in general)
To get P(she likes you | she smiles at u) = x/P(she smiles in general)
Where x is some number between 0 and 1
Therefore we can conclude the more she smiles the less likely its cos she likes you. Therefore find the oens who dont smile and get em to smile. Therefore bigtiddygothgf.
unfortunately, P(she likes you) ≈ 0
So you’re saying there’s a chance?
I’d be a lot less confused by a Venn diagram.
Damn you priors
Nice, we can also assume that P(she smiles at you | she likes you) is approximately 1, simplifying to only 2 variables, and also substitute P(you are likable) for P(she likes you) to remove all unknowns.
and also substitute P(you are likable) for P(she likes you)
That seems like a pretty wild leap of logic. Being likeable in general isn’t a substitute for a specific person liking you. Though there’s probably a correlation related to your overall “likeability score”.
So you’re saying further research is needed to constrain P(she likes you|you are likeable)?
So lowest denominator possible (rarely smiles)?
P(she only has a facial paralysis)
Alternatively
P(she smiles at you| she likes you) but…
Smash! Next question.
Why?
