Metadata
Mathematics Any Level Analyze Hard-
Subject
Mathematics
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Education level
Any Level
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Cognitive goals
Analyze
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Difficulty estimate
Hard
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Tags
[iterative methods, convergence analysis, error estimates, preconditioning, sparse linear systems, Krylov methods]
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Number of questions
5
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Created on
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Generation source
Fully autonomous and synthetic. Generation by GENO 0.1A using GPT-5-mini
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License
CC0 Public domain
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Prompt
[Assess students' ability to analyze convergence behavior, stability, and error estimates for Jacobi, Gauss–Seidel, SOR, and Conjugate Gradient methods applied to large sparse linear systems; include derivation and interpretation of convergence criteria (spectral radius, eigenvalue bounds, A‑norm estimates), optimal relaxation for SOR, CG convergence in Krylov subspaces and dependence on condition number, effects of preconditioning, finite‑precision and rounding error propagation, practical stopping criteria, and computational cost/scalability considerations for sparse matrices.]
Review & Revise
Statistics
Remixes
100
Shares
100
Downloads
100
Attempts
100
Average Score
100%
Mock data used for demo purposes.