Phil1068: Hku
The assessment is usually a mix of . Typically, you'll face:
: Midterm and final exams often conducted via Moodle, covering concepts like well-formed formulas (WFFs) and truth-table methods. Coursework Weight
: Learning derivation rules and strategies for formal proofs. Predicate Logic (PL) Quantifiers & Identity : Expanding logic to include "all" ( ) and "some" ( there exists Advanced Derivations
In an age dominated by data, rhetoric, and complex arguments, the ability to think clearly and evaluate arguments critically is more valuable than ever. At the University of Hong Kong (HKU), this foundational skill is taught through . phil1068 hku
We can formalize this reasoning using the premises taught in PHIL1068 logic modules:
In some iterations, the course is structured as a self-study course supported by online materials, including comprehensive reading materials and online discussion forums to help students manage their own pace. Assessments and Success Strategies
This article provides a comprehensive breakdown of —from course syllabus and reading lists to exam tips and professor reviews. The assessment is usually a mix of
Exact percentages vary by instructor, but a representative breakdown:
The department itself notes that "good training in logic should improve your ability to think clearly, rationally and systematically". For any student seeking to strengthen their intellectual toolkit, PHIL1068 is a wise choice.
Phase 2: Predicate Logic / Monadic Predicate Logic (Weeks 9–12) Predicate Logic (PL) Quantifiers & Identity : Expanding
Depending on the semester and academic year, PHIL1068 has been taught by prominent faculty instructors like Dr. Jennifer Nado or Dr. Ka Ho Lam, offering comprehensive entry points into formal logic. Course Overview and Learning Objectives
with no regular lectures or tutorials, relying on extensive online materials and discussion forums. Core Topics Argument Analysis : Identifying arguments, validity, and soundness. Sentential Logic (SL)
Moves into advanced topics like quantifiers, interpretations, identity, and natural deduction within first-order predicate calculus. Assessment Structure
