Ilya Kachkovskiy (Instructor) - Grade Details
(with breakdown by course)
Ilya Kachkovskiy - All Courses
Average Grade - 3.164
Median Grade - 3.5
Latest grades from Spring 2025
Ilya Kachkovskiy - Overview
| Course Number | Grade Info | Number of Students | Latest Grade Data | Breakdown |
|---|---|---|---|---|
| MTH 234 | Average Grade - 2.643 Median Grade - 3.0 |
35 | Spring 2018 | |
| MTH 309 | Average Grade - 2.943 Median Grade - 3.0 |
132 | Fall 2024 | |
| MTH 828 | Average Grade - 3.517 Median Grade - 3.5 |
61 | Fall 2024 | |
| MTH 829 | Average Grade - 3.614 Median Grade - 3.5 |
36 | Spring 2023 | |
| MTH 920 | Average Grade - 3.962 Median Grade - 4.0 |
13 | Spring 2025 |
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MTH 234 - Multivariable Calculus
Vectors in space. Functions of several variables and partial differentiation. Multiple integrals. Line and surface integrals. Green's and Stokes's theorems.
Average Grade - 2.643
Median Grade - 3.0
Latest grades from Spring 2018
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MTH 309 - Linear Algebra I
Matrices, systems of linear equations, vector spaces, linear transformations, inner products and orthogonal spaces, eigenvalues and eigenvectors, and applications to geometry. A writing course with emphasis on proofs.
Average Grade - 2.943
Median Grade - 3.0
Latest grades from Fall 2024
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MTH 828 - Real Analysis I
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.
Average Grade - 3.517
Median Grade - 3.5
Latest grades from Fall 2024
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MTH 829 - Complex Analysis I
Cauchy theorem, identity principle, Liouville's theorem, maximum modulus theorem. Cauchy formula, residue theorem, Rouche's theorem. Casorati-Weierstrass theorem, Arzela-Ascoli theorem. Conformal mapping, Schwarz lemma, Riemann mapping theorem.
Average Grade - 3.614
Median Grade - 3.5
Latest grades from Spring 2023
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MTH 920 - Functional Analysis
Hilbert spaces, Banach spaces and locally convex vector spaces. Topics include Riesz representation theorem, Parseval's identity, Riesz-Fisher theorem, Fourier series operators, Hahn-Banach theorem, open mapping and closed graph theorems, Banach-Steinhaus theorem, duality theory for locally convex spaces, convexity, Krein-Milman theorem, theory of distributions, compact operators.
Average Grade - 3.962
Median Grade - 4.0
Latest grades from Spring 2025
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