Konstantin Matetski (Instructor) - Grade Details
(with breakdown by course)
Konstantin Matetski - All Courses
Average Grade - 3.322
Median Grade - 3.5
Latest grades from Fall 2025
Konstantin Matetski - Overview
| Course Number | Grade Info | Number of Students | Latest Grade Data | Breakdown |
|---|---|---|---|---|
| MTH 133 | Average Grade - 2.904 Median Grade - 3.0 |
698 | Fall 2023 | |
| MTH 235 | Average Grade - 3.584 Median Grade - 4.0 |
1132 | Spring 2025 | |
| MTH 299 | Average Grade - 2.821 Median Grade - 3.0 |
80 | Fall 2025 | |
| MTH 317H | Average Grade - 3.797 Median Grade - 4.0 |
33 | Fall 2025 | |
| MTH 320 | Average Grade - 3.435 Median Grade - 3.5 |
126 | Fall 2023 | |
| MTH 829 | Average Grade - 3.531 Median Grade - 4.0 |
16 | Spring 2025 |
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MTH 133 - Calculus II
Applications of the integral and methods of integration. Improper integrals. Polar coordinates and parametric curves. Sequences and series. Power series.
Average Grade - 2.904
Median Grade - 3.0
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MTH 235 - Differential Equations
Separable and exact equations. Linear equations and variation of parameters. Higher order linear equations. Laplace transforms. Systems of first-order linear equations. Introduction to partial differential equations and Fourier series.
Average Grade - 3.584
Median Grade - 4.0
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MTH 299 - Transitions
Introduction to mathematical reasoning, basic logic, set theory, integers, natural numbers and induction, basic number theory, real numbers, limits, sequences, series.
Average Grade - 2.821
Median Grade - 3.0
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MTH 317H - Honors Linear Algebra
Systems of equations, matrix algebra, vector spaces, linear transformations, geometry of R^n, eigenvalues, eigenvectors, diagonalization, inner products. Emphasis on mathematical reasoning, proofs, and concepts.
Average Grade - 3.797
Median Grade - 4.0
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MTH 320 - Analysis I
Convergence of sequences and series. Upper and lower limits, completeness, limits and continuity. Derivatives. Uniform convergence.
Average Grade - 3.435
Median Grade - 3.5
Latest grades from Fall 2023
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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 - 3.531
Median Grade - 4.0
Latest grades from Spring 2025
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