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3.3: Card Shuffling
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/03%3A_Combinatorics/3.03%3A_Card_Shuffling
Given a deck of n cards, how many times must we shuffle it to make it “random"? Of course, the answer depends upon the method of shuffling which is used and what we mean by “random."
1.2: Discrete Probability Distribution
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/01%3A_Discrete_Probability_Distributions/1.02%3A_Discrete_Probability_Distribution
In this book we shall study many different experiments from a probabilistic point of view.
12: Random Walks
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/12%3A_Random_Walks
Thumbnail: Random walk in two dimensions. (Public Domain; László Németh via Wikipedia).
11: Markov Chains
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/11%3A_Markov_Chains
Modern probability theory studies chance processes for which the knowledge of previous outcomes influences predictions for future experiments. In principle, when we observe a sequence of chance experi...Modern probability theory studies chance processes for which the knowledge of previous outcomes influences predictions for future experiments. In principle, when we observe a sequence of chance experiments, all of the past outcomes could influence our predictions for the next experiment. In a Markov process, the outcome of a given experiment can affect the outcome of the next experiment. This type of process is called a Markov chain.
11.5: Mean First Passage Time for Ergodic Chains
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/11%3A_Markov_Chains/11.05%3A_Mean_First_Passage_Time_for_Ergodic_Chains
In this section we consider two closely related descriptive quantities of interest for ergodic chains: the mean time to return to a state and the mean time to go from one state to another state.
9.3: Central Limit Theorem for Continuous Independent Trials
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/09%3A_Central_Limit_Theorem/9.03%3A_Central_Limit_Theorem_for_Continuous_Independent_Trials
We have seen in Section 1.2 that the distribution function for the sum of a large number $n$ of independent discrete random variables with mean $\mu$ and variance $\sigma^2$ tends to look like a...We have seen in Section 1.2 that the distribution function for the sum of a large number $n$ of independent discrete random variables with mean $\mu$ and variance $\sigma^2$ tends to look like a normal density with mean $n\mu$ and variance $n\sigma^2$ . Let us begin by looking at some examples to see whether such a result is even plausible.
9.2: Central Limit Theorem for Discrete Independent Trials
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/09%3A_Central_Limit_Theorem/9.02%3A_Central_Limit_Theorem_for_Discrete_Independent_Trials
We have illustrated the Central Limit Theorem in the case of Bernoulli trials, but this theorem applies to a much more general class of chance processes.
1: Discrete Probability Distributions
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/01%3A_Discrete_Probability_Distributions
6.1: Expected Value of Discrete Random Variables
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/06%3A_Expected_Value_and_Variance/6.01%3A_Expected_Value_of_Discrete_Random_Variables
When a large collection of numbers is assembled, as in a census, we are usually interested not in the individual numbers, but rather in certain descriptive quantities such as the average or the median...When a large collection of numbers is assembled, as in a census, we are usually interested not in the individual numbers, but rather in certain descriptive quantities such as the average or the median.
1.R: References
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/01%3A_Discrete_Probability_Distributions/1.R%3A_References
Pearson, “Science and Monte Carlo," , vol. McCracken, “The Monte Carlo Method," vol. 1, 3rd ed. (New York: John Wiley & Sons, 1968), p. Trask (New York: Harcourt-Brace, 1968), p. Quoted in the ed. Put...Pearson, “Science and Monte Carlo," , vol. McCracken, “The Monte Carlo Method," vol. 1, 3rd ed. (New York: John Wiley & Sons, 1968), p. Trask (New York: Harcourt-Brace, 1968), p. Quoted in the ed. Putnam (New York: Viking, 1946), p. in (Cambridge: Cambridge University Press, 1982).↩ Hacking, (Cambridge: Cambridge University Press, 1975). Ore, (Princeton: Princeton University Press, 1953). Ore, “Pascal and the Invention of Probability Theory,” , vol. See Knot X, in Lewis Carroll, vol.
1.1: Simulation of Discrete Probabilities
https://stats.libretexts.org/Bookshelves/Probability_Theory/Introductory_Probability_(Grinstead_and_Snell)/01%3A_Discrete_Probability_Distributions/1.01%3A__Simulation_of_Discrete_Probabilities
In this chapter, we shall first consider chance experiments with a finite number of possible outcomes $\omega_1$ , $\omega_2$ , …, $\omega_n$ .

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