Introduction to Probability and Uncertainty

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Course Outline

  1. Probability as a measure and function
  2. Knightian and radical uncertainty
  3. Random variables
  4. Probability distributions and CDFs
  5. Expected value, variance, and standard deviation
  6. Uniform distribution

1. Probability as a measure and function

Key Concepts & Definitions

  • Sample space S : The sample space is the set of all possible outcomes of a random experiment.
  • Power set 2^S : The power set is the collection of all subsets of S, including the empty set and S itself.
  • Probability function : A probability function assigns a number between 0 and 1 to each event (subset of the sample space).
  • Event : An event is a subset of the sample space that collects outcomes sharing a common property.

Essential Points

  • Probability is unsatisfactory when described only as chance or likelihood because it is vague and lacks a solid mathematical foundation.
  • Probability is “like a measure” because it assigns numerical sizes to events similarly to how physical measurement assigns sizes to objects.
  • The probability function must take events as inputs rather than a formula for one specific case.
  • The probability function’s domain is 2^S and its output is a real number in the interval [0,1].
  • Including both ∅ and S ensures probabilities can be assigned to the two extreme events.
  • Probabilities larger than 1 would not have a sensible interpretation as degrees of certainty.

Memory Hook

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Anteprima del quiz

1. What does a probability function do in the measure-based view of probability?

2. What is the primary role of a probability function in the context of a sample space?

3. Why must the domain of a probability function include the empty set and the full sample space?

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Anteprima delle flashcard

Probability — measure?

Assigns numerical size to events.

Sample space S

All possible outcomes of experiment.

Radical uncertainty — difference?

Outcomes are not fully known.

Probability function

Assigns a number between 0 and 1.

Knightian uncertainty

Unknown probabilities for outcomes.

Radical uncertainty

Unknown set of outcomes.

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