Introduction to Probability and Uncertainty

Revision sheet excerpt

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

Read the full sheet →

Quiz preview

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?

Take the quiz (10 questions) →

Flashcards preview

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.

See all 9 flashcards →

Frequently asked questions

What does the revision sheet on Introduction to Probability and Uncertainty cover?

The revision sheet covers the essential concepts of Introduction to Probability and Uncertainty. It is organized by topic to facilitate learning and memorization, with key definitions, explanations and summaries.

Read the full sheet →

How many questions are in the Introduction to Probability and Uncertainty quiz?

The quiz contains 10 multiple-choice questions with detailed corrections and explanations for each answer. Ideal for testing your knowledge and identifying gaps.

Take the quiz (10 questions) →

How to study Introduction to Probability and Uncertainty with flashcards?

Revizly offers 9 interactive flashcards on Introduction to Probability and Uncertainty. Each card presents a question on the front and the answer on the back, enabling active and effective revision based on spaced repetition.

See all 9 flashcards →

Similar courses

Create your own sheets from your courses

Import your PDF or paste your course, AI generates sheets, quizzes and flashcards in 30 seconds.