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Stochastic Processes (Exams 1, 2.a, 2.b)
Questions and answers for exams on the stochastic process. The course is designed to introduce undergraduates to the fundamental ideas of stochastic (or random) processes. Topics to be covered are Markov chains (discrete and continuous time), renewal theory, queueing theory, Brownian motion, and stationary processes.
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Stochastic Processes (Exams 1, 2.a, 2.b)
Last document update: agoQuestions and answers for exams on the stochastic process. The course is designed to introduce undergraduates to the fundamental ideas of stochastic (or random) processes. Topics to be covered are Markov chains (discrete and continuous time), renewal theory, queueing theory, Brownian motion, and stationary processes.
Probability Exams (1 3)
Probability exams testing basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions.
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Probability Exams (1 3)
Last document update: agoProbability exams testing basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions.
Exam 2.a
This course is designed to introduce the undergraduate to the fundamental ideas of stochastic (or random) processes. Such processes are used in the study of mathematical models where there are elements of uncertainty and hence probabilistic quantities are introduced into the model. These models are found in fields such as the analysis of algorithms, the theory of queues, the pricing of stock options, financial mathematics, econometrics, linear programming, and biomathematics. The course will cov...
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Exam 2.a
Last document update: agoThis course is designed to introduce the undergraduate to the fundamental ideas of stochastic (or random) processes. Such processes are used in the study of mathematical models where there are elements of uncertainty and hence probabilistic quantities are introduced into the model. These models are found in fields such as the analysis of algorithms, the theory of queues, the pricing of stock options, financial mathematics, econometrics, linear programming, and biomathematics. The course will cov...
Exam 2.b
This course is designed to introduce the undergraduate to the fundamental ideas of stochastic (or random) processes. Such processes are used in the study of mathematical models where there are elements of uncertainty and hence probabilistic quantities are introduced into the model. These models are found in fields such as the analysis of algorithms, the theory of queues, the pricing of stock options, financial mathematics, econometrics, linear programming, and biomathematics. The course will cov...
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Exam 2.b
Last document update: agoThis course is designed to introduce the undergraduate to the fundamental ideas of stochastic (or random) processes. Such processes are used in the study of mathematical models where there are elements of uncertainty and hence probabilistic quantities are introduced into the model. These models are found in fields such as the analysis of algorithms, the theory of queues, the pricing of stock options, financial mathematics, econometrics, linear programming, and biomathematics. The course will cov...
Exam 1
This course is designed to introduce the undergraduate to the fundamental ideas of stochastic (or random) processes. Such processes are used in the study of mathematical models where there are elements of uncertainty and hence probabilistic quantities are introduced into the model. These models are found in fields such as the analysis of algorithms, the theory of queues, the pricing of stock options, financial mathematics, econometrics, linear programming, and biomathematics. The course will cov...
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Exam 1
Last document update: agoThis course is designed to introduce the undergraduate to the fundamental ideas of stochastic (or random) processes. Such processes are used in the study of mathematical models where there are elements of uncertainty and hence probabilistic quantities are introduced into the model. These models are found in fields such as the analysis of algorithms, the theory of queues, the pricing of stock options, financial mathematics, econometrics, linear programming, and biomathematics. The course will cov...
Final Exam
This course is an introduction to the theory of probability. Topics to be included are basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions.
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Final Exam
Last document update: agoThis course is an introduction to the theory of probability. Topics to be included are basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions.
Exam 2
This course is an introduction to the theory of probability. Topics to be included are basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions.
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Exam 2
Last document update: agoThis course is an introduction to the theory of probability. Topics to be included are basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions.
Exam 1
This course is an introduction to the theory of probability. Topics to be included are basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions
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Exam
Exam 1
Last document update: agoThis course is an introduction to the theory of probability. Topics to be included are basic theorems of probability, permutations and combinations, binomial and multinomial theorems, random variables with densities, sequences of independent identically distributed random variables, method of moments, the momentgenerating function, central limit theorem, and standardtype probability distributions
Linear Algebra 1
Topics to be included are GaussJordan reduction, linear independence, linear vector spaces, linear transformations, the similarity of matrices, diagonalizable matrices, characteristic values and vectors, and symmetric matrices and quadratic forms.
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Linear Algebra 1
Last document update: agoTopics to be included are GaussJordan reduction, linear independence, linear vector spaces, linear transformations, the similarity of matrices, diagonalizable matrices, characteristic values and vectors, and symmetric matrices and quadratic forms.