MTH 828 (Course) - Grade Details
(with breakdown by instructor)
Course Title: Real Analysis I
Course Description: Lebesgue measure on real line, general measure theory. Convergence theorems, Lusin's theorem, Egorov's theorem, Lp-spaces, Fubini's theorem. Functions of bounded variation, absolutely continuous functions, Lebesgue differentiation theorem.
MTH 828 - All Instructors
Average Grade - 3.285
Median Grade - 3.5
Latest grades from Fall 2023
MTH 828 - Overview
| Instructor | Grade Info | Number of Students | Latest Grade Data | Breakdown |
|---|---|---|---|---|
| Jeffrey H Schenker | Average Grade - 3.352 Median Grade - 3.5 |
76 | Fall 2020 | |
| Ignacio Uriarte-Tuero | Average Grade - 2.885 Median Grade - 3.0 |
65 | Fall 2018 | |
| Vladimir Peller | Average Grade - 2.793 Median Grade - 3.0 |
46 | Fall 2019 | |
| Alexander L Volberg | Average Grade - 3.529 Median Grade - 3.5 |
17 | Fall 2016 | |
| Ilya Kachkovskiy | Average Grade - 3.500 Median Grade - 3.5 |
42 | Fall 2022 | |
| Brent Nelson | Average Grade - 3.957 Median Grade - 4.0 |
48 | Fall 2023 |
Alexander L Volberg
Average Grade - 3.529
Median Grade - 3.5
Latest grades from Fall 2016
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Brent Nelson
Average Grade - 3.957
Median Grade - 4.0
Latest grades from Fall 2023
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Ignacio Uriarte-Tuero
Average Grade - 2.885
Median Grade - 3.0
Latest grades from Fall 2018
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Ilya Kachkovskiy
Average Grade - 3.500
Median Grade - 3.5
Latest grades from Fall 2022
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Jeffrey H Schenker
Average Grade - 3.352
Median Grade - 3.5
Latest grades from Fall 2020
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Vladimir Peller
Average Grade - 2.793
Median Grade - 3.0
Latest grades from Fall 2019
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