How Do You Prove Basic Probability Theory?

AI Thread Summary
To prove basic probability theory, one should start with introductory texts that cover foundational concepts and theorems. Key topics include understanding how previous situations influence probabilities and calculating outcomes over multiple iterations. The Central Limit Theorem is a crucial aspect, emphasizing the significance of the normal distribution in probability. A thorough study of these principles typically requires a substantial investment of time and effort. Engaging with comprehensive resources will provide the necessary logic and understanding of probability theory.
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Hello There,
this is my first post. I would like an information: Which is the basic way to prove probability theory?.. I mean prove the probability that a situation in influenzed from the situation before and/or calculate the probability that in n it will have a determinate situation...??
How you see i want the logic.

Bye
P.s This is a problem that derivate from Mathematica of Wolfram and i have to understand how it will be my atom after n (integral number) passes..
Thanks cellular
 
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?? Then pick up an introductory probability text. I'm not going to go through all of that here since "proving that the various probability distributions really do answer the questions they are designed to answer", which is what your question really is,typically takes from 1/4 to 1/3 of an introdutory probability text. Culminating with the "Central Limit Theorem" which basically says "all you really need is the normal distribution"! And I wouldn't pretend to be qualified to give an off hand proof of that.
 

Thread 'Deductive proof in logic formal systems'

I was reading documentation about the soundness and completeness of logic formal systems. Consider the following $$\vdash_S \phi$$ where ##S## is the proof-system making part the formal system and ##\phi## is a wff (well formed formula) of the formal language. Note the blank on left of the turnstile symbol ##\vdash_S##, as far as I can tell it actually represents the empty set. So what does it mean ? I guess it actually means ##\phi## is a theorem of the formal system, i.e. there is a...
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