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Discrete Math for Computer Science - Counting & Probability

Ce cours n'est pas disponible en Français (France)

Nous sommes actuellement en train de le traduire dans plus de langues.

The Hong Kong University of Science and Technology

Discrete Math for Computer Science - Counting & Probability

Ce cours fait partie de Spécialisation "Discrete Mathematical Tools for Computer Science"

Instructeur : Kenneth Wai-Ting Leung

Inclus avec

8 modules

Obtenez un aperçu d'un sujet et apprenez les principes fondamentaux.

niveau Débutant

Expérience recommandée

1 semaine à compléter

à 10 heures par semaine

Planning flexible

Apprenez à votre propre rythme

8 modules

Obtenez un aperçu d'un sujet et apprenez les principes fondamentaux.

niveau Débutant

Expérience recommandée

1 semaine à compléter

à 10 heures par semaine

Planning flexible

Apprenez à votre propre rythme

Ce que vous apprendrez

Use propositional and predicate logic to model and reason about computer science problems.
Use permutations, combinations, and inclusion–exclusion to solve combinatorial problems.
Analyse uncertainty using probability, conditional probability, and random variables.

Compétences que vous acquerrez

Catégorie : Bayesian Statistics

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février 2026

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7 devoirs

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Il y a 8 modules dans ce cours

This course develops the mathematical tools needed to count, measure uncertainty, and reason about random processes, which are central to computer science, data analysis, and algorithm design. Building on the logical foundations from the first course, it introduces combinatorial counting techniques and probability theory through a discrete, computation-oriented lens.

The course begins with the fundamentals of counting, including the product rule, sum rule, permutations, combinations, and binomial coefficients. You will learn how to count complex structures efficiently using techniques such as the principle of inclusion and exclusion, with applications ranging from algorithm analysis to data organization. The second half of the course focuses on probability, emphasizing its deep connection to counting. Topics include sample spaces, events, conditional probability, independence, and Bayes’ Theorem. You will also study random variables, probability distributions, expectation, and variance, gaining tools to model and analyze randomized algorithms and real-world uncertainty. Throughout the course, abstract concepts are reinforced with concrete examples drawn from computing, games of chance, and classic probability puzzles. By the end, learners will be able to systematically count possibilities, compute probabilities, and reason rigorously about randomness—skills essential for advanced study in algorithms, data science, machine learning, and beyond.

Détails du module

This module teaches how to count arrangements, selections, and possibilities using permutations, combinations, binomial coefficients, and inclusion-exclusion. It covers probability fundamentals, conditional probability, random variables, and iconic problems like the Monty Hall dilemma to handle uncertainty. These tools are crucial for analyzing algorithm efficiency, game design, randomized systems, machine learning, and risk assessment.

Inclus

1 lecture

Counting techniques provide systematic methods for determining the number of possible outcomes in discrete structures. This topic introduces basic counting principles such as the sum rule and product rule.

Inclus

15 vidéos1 lecture1 devoir

15 vidéosTotal 41 minutes

Basics of Counting Overview3 minutes
Basics of Counting_intro8 minutes
Product Rule_Intro, Example1 & 21 minute
(Optional) Product Rule_Example3 & 42 minutes
(Optional) Product Rule_Example5 & 62 minutes
Sum Rule_Example1 minute
(Optional) Using Both Product and Sum Rules_Example12 minutes
(Optional) Using Both Product and Sum Rules_Example23 minutes
(Optional) InclassEx2 minutes
Tree Diagrams_Intro, Example1 & 23 minutes
The Pigeonhole Principle_Intro & Example12 minutes
(Optional) The Pigeonhole Principle_Example22 minutes
(Optional) The Pigeonhole Principle_Example33 minutes
The Pigeonhole Principle_Generalized Pigeonhole Principle_Intro & Example13 minutes
(Optional) The Pigeonhole Principle_Generalized Pigeonhole Principle_Example2 & 35 minutes

1 lectureTotal 30 minutes

Basics of Counting30 minutes

1 devoirTotal 20 minutes

Quiz 120 minutes

This topic studies methods for counting arrangements and selections of objects. It distinguishes between ordered and unordered selections and introduces formulas for permutations and combinations.

Inclus

16 vidéos1 lecture1 devoir

16 vidéosTotal 65 minutes

Permutations and Combinations Overview2 minutes
Permutations and Combinations_intro1 minute
(Optional) Permutations_Example14 minutes
Permutations_Number of k-Permutations3 minutes
(Optional) Permutations_Example2 & 31 minute
Permutations_Permutation & k-Permutation Definition2 minutes
(Optional) Permutations_Example4 & 5 & 63 minutes
(Optional) Permutations_Example76 minutes
Combinations_Intro & k-Combinations, Proof7 minutes
(Optional) Combinations_Example1 & 29 minutes
Combinations_Combinatorial Proof and Bijection Principle_Intro & Examples5 minutes
Generalized Permutations and Combinations_Permutations with Indistinguishable Objects_Intro & Example4 minutes
Generalized Permutations and Combinations_Distributing Objects into Boxes_Intro & Example2 minutes
Generalized Permutations and Combinations_Indistinguishable objects Distinguishable boxes_Theorem & Example8 minutes
Generalized Permutations and Combinations_Combinations with Repetition_Intro & Examples3 minutes
(Optional) InclassEx5 minutes

1 lectureTotal 30 minutes

Permutations and Combinations30 minutes

1 devoirTotal 20 minutes

Quiz 220 minutes

Binomial coefficients arise in counting combinations and in the expansion of binomial expressions. This topic covers the binomial theorem, Pascal’s identity, and important combinatorial identities.

Inclus

13 vidéos1 lecture1 devoir

13 vidéosTotal 59 minutes

Binomial Coefficients Overview3 minutes
Binomial Coefficients_Intro1 minute
Binomial Theorem_Example1, Definition & Proof6 minutes
(Optional) Binomial Theorem_Example2 & 31 minute
Binomial Theorem_Corollary1 & Combinatorial Proof7 minutes
Binomial Theorem_Corollary2 & Pascal’s Triangle4 minutes
Binomial Theorem_Corollary31 minute
Pascal’s Identity and Triangle_Pascal's Identity & Combinatorial proof of Pascal’s identity11 minutes
Pascal’s Identity and Triangle_Pascal’s Triangle1 minute
Some Other Identities_Vandermonde's Identity6 minutes
Some Other Identities_Vandermonde's Identity_Corollary3 minutes
Some Other Identities_Counting bit strings & Proof9 minutes
(Optional) InclassEx5 minutes

1 lectureTotal 30 minutes

Binomial Coefficients30 minutes

1 devoirTotal 30 minutes

Quiz 330 minutes

The inclusion–exclusion principle provides a systematic way to count elements in overlapping sets. It is widely used in counting problems involving unions of multiple sets.

Inclus

13 vidéos1 lecture1 devoir

13 vidéosTotal 78 minutes

The Inclusion-Exclusion Principle Overview3 minutes
The Inclusion-Exclusion Principle_Intro1 minute
Two Finite Sets_Intro & Examples3 minutes
Three Finite Sets_Intro3 minutes
(Optional) Three Finite Sets_Example2 minutes
Inclusion-Exclusion Principle_Theorem6 minutes
Inclusion-Exclusion Principle_Proof8 minutes
Number of Onto Functions_Intro & Example114 minutes
(Optional) Number of Onto Functions_Example22 minutes
Derangement_Example1 & Proof15 minutes
(Optional) Derangement_Example22 minutes
Probability of a derangement3 minutes
(Optional) InclassEx18 minutes

1 lectureTotal 30 minutes

The Inclusion-Exclusion Principle30 minutes

1 devoirTotal 20 minutes

Quiz 420 minutes

This topic introduces probability as a measure of uncertainty based on counting outcomes. It defines experiments, sample spaces, events, and basic probability rules.

Inclus

21 vidéos1 lecture1 devoir

21 vidéosTotal 68 minutes

Introduction to Probability Overview2 minutes
The Hatcheck Problem Revisited1 minute
Probability_Definitions2 minutes
(Optional) Probability_Example2 minutes
Poker_Intro3 minutes
(Optional) Poker_Ex14 minutes
(Optional) Poker_Ex26 minutes
(Optional) Poker_Ex35 minutes
(Optional) Poker_Ex44 minutes
Mark Six4 minutes
Sampling with/without replacement1 minute
Complement of Event_Theorem2 minutes
(Optional) Complement of Event_Example2 minutes
Union of Events & Inclusion-Exclusion Principle for Probability, Complement and Union Events4 minutes
Probability Distribution2 minutes
Uniform Distribution & Non-Uniform Distribution2 minutes
Probability of an Event2 minutes
Independence_Definition2 minutes
(Optional) Independence_Examples6 minutes
Pairwise and Mutual Independence6 minutes
(Optional) InclassEx6 minutes

1 lectureTotal 10 minutes

Introduction to Probability10 minutes

1 devoirTotal 20 minutes

Quiz 520 minutes

Conditional probability measures the likelihood of events given prior information. This topic introduces independence and Bayes’ theorem, enabling probabilistic reasoning in real-world decision making.

Inclus

15 vidéos1 lecture1 devoir

15 vidéosTotal 69 minutes

Conditional Probability and Bayes' Theorem Overview5 minutes
Conditional Probability and Bayes' Theorem_Intro1 minute
Conditional Probability6 minutes
(Optional) Conditional Probability_Example13 minutes
(Optional) Conditional Probability_Example24 minutes
Conditional Probability_The Birthday Problem4 minutes
Independence Revisited3 minutes
Independence Example Revisited2 minutes
Bayes’ Theorem_Theorem & Example1, Explanation10 minutes
(Optional) Bayes’ Theorem_Example21 minute
(Optional) Bayes’ Theorem_Example35 minutes
Bayesian Spam Filter_Intro & Example4 minutes
Generalized Bayes’ Theorem_Theorem & Example2 minutes
Monty Hall Problem12 minutes
(Optional) InclassEx6 minutes

1 lectureTotal 30 minutes

Conditional Probability and Bayes' Theorem30 minutes

1 devoirTotal 20 minutes

Quiz 620 minutes

Random variables assign numerical values to outcomes of random experiments. This topic covers discrete and continuous distributions, expectation, and variance, forming the foundation of probability modeling.

Inclus

28 vidéos1 lecture1 devoir

28 vidéosTotal 132 minutes

Random Variables Overview3 minutes
Random Variables2 minutes
Distribution of a Random Variable1 minute
Bernoulli Trials4 minutes
Binomial Distribution_Theorem & Example3 minutes
Continuous Probability Distribution3 minutes
Infinite Sample Space3 minutes
Geometric Distribution2 minutes
Expected Value_Definition, Theorem & Example8 minutes
Expected Value_Example_Binomial Distribution2 minutes
Linearity of Expectations_Theorem & Proof4 minutes
Indicator Random Variables_Intro3 minutes
(Optional) Indicator Random Variables_Example_the Hatcheck Problem4 minutes
(Optional) Indicator Random Variables_Example_Hiring Problem15 minutes
(Optional) Indicator Random Variables_Example_Balls and Bins4 minutes
Average-case Analysis of Algorithms_Definition & Example_Linear Search8 minutes
(Optional) Average-case Analysis of Algorithms_Example_Insertion Sort8 minutes
Geometric Distribution_Definition & Theorem2 minutes
(Optional) Geometric Distribution_Example_Coupon Collector7 minutes
Independent Random Variables_Definition, Theorem & Proof9 minutes
(Optional) Independent Random Variables_Example6 minutes
Variance and Standard Deviation_Definition8 minutes
Variance_Theorem2 minutes
(Optional) Variance_Example3 minutes
Bienaymé’s Formula_Theorem & Proof3 minutes
(Optional) Bienaymé’s Formula_Example13 minutes
(Optional) Bienaymé’s Formula_Example26 minutes
(Optional) InclassEx6 minutes

1 lectureTotal 30 minutes

Random Variables30 minutes

1 devoirTotal 20 minutes

Quiz 720 minutes

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