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### Probability Theory Probability is a way of expressing knowledge or belief that an event will occur or has occurred. The concept has an exact mathematical meaning in probability theory, which is used extensively in such areas of study as mathematics, statistics, finance, gambling, science, Artificial intelligence/Machine learning and philosophy to draw conclusions about the likelihood of potential events and the underlying mechanics of complex systems. • ### Probability using combinatorics : Probability and Combinations (pa...

##### By: Sal Khan

Making at least 3 out of 5 free throws.

Basics of probability and combinatorics. This tutorial will apply the permutation and combination tools you learned in the last tutorial to problems of probability. You'll finally learn that there may be better investments than poring all your money int

• ### Probability using combinatorics : Probability using Combinations

##### By: Sal Khan

Probability of getting exactly 3 heads in 8 flips of a fair coin.

Basics of probability and combinatorics. This tutorial will apply the permutation and combination tools you learned in the last tutorial to problems of probability. You'll finally learn that there may be better investments than poring all your money int

• ### Probability using combinatorics : Conditional Probability and Comb...

##### By: Sal Khan

Probability that I picked a fair coin given that I flipped 4 out of 6 heads.

Basics of probability and combinatorics. This tutorial will apply the permutation and combination tools you learned in the last tutorial to problems of probability. You'll finally learn that there may be better investments than poring all your money int

• ### Probability using combinatorics : Example: Lottery probability

##### By: Sal Khan, Monterey Institute for Technology and Education

What is the probability of winning a 4-number lottery?

Basics of probability and combinatorics. This tutorial will apply the permutation and combination tools you learned in the last tutorial to problems of probability. You'll finally learn that there may be better investments than poring all your money int

• ### Probability using combinatorics : Example: Probability through cou...

##### By: Sal Khan, Monterey Institute for Technology and Education

The probability of getting exactly 2 heads when flipping three coins. Thinking about this by visualy depicting all of the outcomes.

Basics of probability and combinatorics. This tutorial will apply the permutation and combination tools you learned in the last tutorial to problems of probability. You'll finally learn that there may be better investments than poring all your money int

• ### Stochastic processes : lectures given at Aarhus University

##### By: Itō, Kiyosi, 1915-2008; Sato, Ken-iti, 1934-; Itō, Kiyosi, 1915-2008. Stochastic processes, 1968/69; Barndorff-Nielsen, O. E. (Ole E. )

; Rev. ed. of: Stochastic processes, 1968/69. 1969; Includes bibliographical references and index

• ### Stochastic Processes : Lectures Given at Aarhus University

##### By: Ito, Kiyosi, 1915 2008; Barndorff Nielsen, O. E. (Ole E.); Sato, Ken Iti, 1934; Ito, Kiyosi, 1915 2008. Stochastic Processes, 1968/69
• ### Quantum Mechanics I

##### By: Peter S. Riseborough

Description: This book explains the following topics related to Quantum Mechanics: Principles of Classical Mechanics, Failure of Classical Mechanics, Principles of Quantum Mechanics, Applications of Quantum Mechanics, The Rotating Planar Oscillator, Dirac Formulation.

• ### Old school probability (very optional) : Introduction to Random Va...

##### By: Sal Khan

Introduction to random variables and probability distribution functions.

Introduction to probability. Independent and dependent events. Compound events. Mutual exclusive events. Addition rule for probability.

• ### Quantum Mechanics Lecture Notes

##### By: J. W. Van Orden
• ### Statistical mechanics with applications to physics and chemistry

##### By: Tolman, Richard Chace, 1881-1948

Supplemental catalog subcollection information: American Libraries Collection; American University Library Collection; Historical Literature

• ### Mathematical Methods in Quantum Mechanics

##### By: Gerald Teschl

Description: This note covers the following topics related to Quantum Mechanics: Mathematical foundations of Quantum mechanics, Hilbert Spaces, The Spectral Theorem, Quantum dynamics and Schrodinger Operators.

• ### Quantum Mechanics for Engineers

##### By: Leon Van Dommelen

Description: This note covers the following topics: Special Relativity, Basic Quantum Mechanics, Single-Particle Systems, Multiple-Particle Systems, Time Evolution, Basic and Quantum Thermodynamics, Angular momentum and Electromagnetism.

• ### On the Eigenfunctions of Many-Particle Systems in Quantum Mechanics

##### By: Kato, Tosio
• ### Statistical Mechanics with Applications to Physics and Chemistry

##### By: Tolman, Richard Chace, 1881-1948
• ### Quantum Mechanics by Michel Van Veenendaal

##### By: Michel Van Veenendaal

Description: This note covers the following topics:Wave mechanics, Harmonic oscillator, The Hydrogen atom, Relativistic quantum mechanics, Perturbation theory and absorption and emission of photons and Many electron atom.

• ### Thermodynamics and statistical mechanics of systems of reactive co...

##### By: Perry, Randal Lewis, 1955

Supplemental catalog subcollection information: American Libraries Collection; American University Library Collection; Historical Literature; Rare book preservation notes: Due to the deteriorated condition of this book, there were limitations with the dig

• ### Random variables and probability distributions : Expected Value: E(X)

##### By: Sal Khan

Expected value of a random variable

Random variables. Expected value. Probability distributions (both discrete and continuous). Binomial distribution. Poisson processes.

• ### Random variables and probability distributions : Law of Large Numbers

##### By: Sal Khan

Introduction to the law of large numbers

Random variables. Expected value. Probability distributions (both discrete and continuous). Binomial distribution. Poisson processes.

• ### Advanced Quantum Mechanics

##### By: Peter S. Riseborough 