HUNTERTUTORING

Answer Key — Rings and fields

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Abstract algebra

Do not share with students before practice tests.

Worksheets — Sets 1–10

| Set | Guidance | | --- | --- | | Set 1 | Rings and fields — verify written work and accept reasonable drawings. | | Set 2 | Rings and fields — verify written work and accept reasonable drawings. | | Set 3 | Rings and fields — verify written work and accept reasonable drawings. | | Set 4 | Rings and fields — verify written work and accept reasonable drawings. | | Set 5 | Rings and fields — verify written work and accept reasonable drawings. | | Set 6 | Rings and fields — verify written work and accept reasonable drawings. | | Set 7 | Rings and fields — verify written work and accept reasonable drawings. | | Set 8 | Rings and fields — verify written work and accept reasonable drawings. | | Set 9 | Rings and fields — verify written work and accept reasonable drawings. | | Set 10 | Rings and fields — verify written work and accept reasonable drawings. |

Worksheets — Sets 11–20

| Set | Guidance | | --- | --- | | Set 11 | Rings and fields — verify written work and accept reasonable drawings. | | Set 12 | Rings and fields — verify written work and accept reasonable drawings. | | Set 13 | Rings and fields — verify written work and accept reasonable drawings. | | Set 14 | Rings and fields — verify written work and accept reasonable drawings. | | Set 15 | Rings and fields — verify written work and accept reasonable drawings. | | Set 16 | Rings and fields — verify written work and accept reasonable drawings. | | Set 17 | Rings and fields — verify written work and accept reasonable drawings. | | Set 18 | Rings and fields — verify written work and accept reasonable drawings. | | Set 19 | Rings and fields — verify written work and accept reasonable drawings. | | Set 20 | Rings and fields — verify written work and accept reasonable drawings. |

Review tiers 1–10

  • Checklists are parent-judged.
  • Written items: verify against practice set patterns.
  • Standard text: Rings: definitions and examples (Z, polynomial rings, matrix rings) Integral domains, fields, and ideals Quotient rings and ring homomorphisms Polynomial rings; irreducibility and factorization over Q and R Field extensions and constructibility (introduction)

Practice test scoring

| Tier | Pass guidance | | --- | --- | | 1–3 | Most oral tasks smooth; majority of written correct | | 4–6 | 7/10+ total with clear understanding | | 7–8 | 9/12+ with explanations | | 9–10 | Near-perfect; ready to move on |

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