- Probability Theory 1
- Lecture:
- Tuesday 10-12, K350
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- Practical course:
- Thursday 10-12, H507
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- Requirements
- Schedule
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Tutors:
- Ábel Komálovics
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Notes:
- William Feller: An introduction to Probability and its Applications, Vol. I Third Edition, John Wiley and Sons, 1968.
- Sheldon Ross: A First Course in Probability Eighth Edition, Pearson and Prentice Hall, 1976-2006.
- András Vetier's online text-book
- Dániel Prokaj's handwritten notes
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- Sample exam
- Sample 1st midterm '21, solution, Sample 1st midterm '22, solutions, Sample 1st midterm '23, solutions
- Sample 2nd midterm, solution
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- The homeworks shall be submitted via Moodle. We request you to upload the homeworks in one PDF file in standing A4 format (scanned or typed), and the solutions of each exercises must be on a separate page in this file.
- Table of standard normal distribution
- The theoretical part of the exam contains all the definitions and theorems, which were stated during the semester, and simple proofs as well but exclude difficult proofs (the proofs of the Stirling formula, the DeMoivre-Laplace local and global form, moment generating function characterize the distribution, joint moment generating function characterizes independece).
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Time and place of midterm tests:
- 1st midterm: 8th October (Tuesday) 16:15-17:00, F29
- 2nd midterm: 19th November (Tuesday) 16:15-17:00, F29
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Time and place of retaken midterm tests:
- Retake of 1st midterm: 22th October (Tuesday) 16:15-17:00, F29
- Retake of 2nd midterm: 3rd December (Tuesday) 16:15-17:00, F29
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Consultations before the exams
- 9th December 14:00-16:00, H406
- 16th December 17:00-18:00, online Teams link
- 6th January 15:00-17:00, T606
- 13th January 11:00-12:00, online Teams link
- 22nd January 11:00-13:00, H406