Is a Random Variable a Way to Quantify Probability Events?

AI Thread Summary
A random variable (RV) is defined as a function that maps events from a probability space to real numbers, effectively quantifying these events. It can be either discrete or continuous, representing a range of values with associated probabilities. The concept of a random variable involves a measurable function that connects a probability space to a measurable state space. This understanding highlights the role of random variables in probability theory. Overall, random variables serve as essential tools for quantifying and analyzing probabilistic events.
sauravrt
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A random variable (RV) is a function that maps events in our probability space to real space. So it seems to me a random variable is a way to quantify(into real space) the physical events in our probability space? Is my understanding correct?

Saurav
 
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Not really..first of all a RV can be either discrete of continuous (real).

Secondly, you can just think of it as a variable that is in a simultaneous superposition of values with associated probabilities.
 

Thread 'Deductive proof in logic formal systems'

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