CS 70 at UC Berkeley

Discrete Mathematics and Probability Theory

Lectures: M/T/W/Th 2-3:30 p.m., 155 Dwinelle

Instructor Hongling Lu

hongling_lu (at) berkeley (dot) edu

Office Hours: T/Th 12-1 p.m., 611 Soda

Instructor Vrettos Moulos

vrettos (at) berkeley (dot) edu

Office Hours: W 4-5 p.m., F 2:30-3:30 p.m., 212 Cory

Instructor Allen Tang

chen.tang (at) berkeley (dot) edu

Office Hours: M/W 12-1 p.m., 212 Cory

Week 1 Overview

Propositional Logic, Proofs, Induction

Monday, June 19 - Friday, June 23

Week 2 Overview

Stable Marriage, Graph Theory, Countability, Computability

Monday, June 26 - Friday, June 30

Week 3 Overview

Counting, Probability

Monday, July 3 - Friday, July 7

Week 4 Overview

Conditional Probability, Discrete Random Variables, Expectation

Week 5 Overview

Variance, Continuous Probability

Week 6 Overview

Probability Inequalities, Markov Chains

Note 18 : Chebyshev's Inequality
Note 24 : Markov Chains
Discussion 06a
Discussion 06b
Homework 05 (TeX)
Homework 06

Notes

There is no textbook for this class. Instead, there is a set of fairly comprehensive lecture notes. Make sure you revisit the notes after lecture. Each note may be covered in one or more lectures. See Syllabus for more information.

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Discussions

The discussion sections will not cover new material, but rather will give you additional practice solving problems. You can attend any discussion section you like. However, if there are fewer desks than students, then students who are officially enrolled in that section will get seating priority. See Syllabus for more information.

Discussion 01a: Propositional Logic (solution)
Discussion 01b: Proofs (solution)
Discussion 01c: Induction (solution)
Discussion 01d: Induction (solution)
Discussion 02a: Stable Marriage (solution)
Discussion 02b: Graph Theory (solution)
Discussion 02c: Graph Theory (solution)
Discussion 02d: Countability, Computability (solution)
Discussion 03a: Counting (solution)
Discussion 03b: Counting (solution)
Discussion 03c: Introduction to Probability (solution)
Discussion 04a: Conditional Probability (solution)
Discussion 04b: Bayes Rule, Independence (solution)
Discussion 04c: Random Variables, Distributions (solution)
Discussion 04d: Expectation, Joint Distributions (solution)
Discussion 05a: Variance, Covariance (solution)
Discussion 05b: Indicators, Conditional Distributions, Memoryless Property (solution)
Discussion 05c: Uniform Distribution, Exponential Distribution (solution)
Discussion 05d: Continuous Conditioning, Normal Distribution (solution)
Discussion 06a: Uncountability, Uncomputability
Discussion 06b: Counting
Discussion 07a: Basic Probability
Discussion 07b: Conditional Probability
Discussion 08a: Random Variables, Binomial Distribution
Discussion 08b: Union Bound, Geometric Distribution, Poisson Distribution

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Homeworks

All homeworks are graded for accuracy and it is highly-recommended that you do them. Your lowest homework score will be dropped, but this drop should be reserved for emergencies. See Syllabus for more information.

Homework 00: Course Logistics (TeX)
Homework 01: Propositional Logic, Proofs, Induction (TeX) (solution)
Homework 02: Stable Marriage, Graph Theory, Countability, Computability (TeX) (solution)
Homework 03: Counting, Introduction to Probability (TeX) (solution)
Homework 04: Random Variables, Distributions, Expectation (TeX) (solution)
Homework 05: Variance, Coupon Collector, Continuous Probability (TeX)
Homework 06: Polynomials, Secret Sharing, Error Correcting Codes, Uncountability
Homework 07: Uncountability, Uncomputability, Counting
Homework 08: Combinatorial Proofs, Probability Spaces, Conditional Probability, Independence

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