All answers must be transferred to the Moodle Quiz function before the timer ends. π Key Course Topics for Study Groups
is one of the most versatile and popular introductory courses offered by the Department of Philosophy at The University of Hong Kong (HKU) . Designed to be accessible to students from any academic faculty, this 6-credit course introduces the foundational principles of formal logic without requiring any prior knowledge of philosophy or mathematics. By training students to systematically analyze arguments using symbolic notations, PHIL1068 serves as an essential framework for critical thinking across fields as diverse as computer science, law, linguistics, and the social sciences. Course Objectives and Core Structure
Ultimately, the "story" of PHIL1068 is one of clarity. By the end, students find that their ability to think systematically phil1068 hku
PHIL1068 is a 6-credit introductory course designed to teach the fundamentals of βa method of using special symbols to analyze and evaluate arguments in a systematic, almost mathematical way. The course is notably described as being suitable for students "of all levels," meaning no prior background in logic or philosophy is required.
Artificial Intelligence and the Problem of Moral Responsibility All answers must be transferred to the Moodle
[Course Code: PHIL1068] β [Topic Title]
: Learning to differentiate between an argument's structural validity (if the premises are true, the conclusion must be true) and its concrete soundness (the structural validity combined with factual premises). The course is notably described as being suitable
Mastering PHIL1068 Elementary Logic at HKU: The Ultimate Course Guide
Phil1068 is an undergraduate-level course offered by the Department of Philosophy at The University of Hong Kong (HKU). The course introduces students to central topics, methods, and debates in contemporary philosophy, emphasizing critical thinking, argumentation, and conceptual analysis.
[Weeks 1-3: Foundations & Truth Tables] ββ> [Weeks 4-6: Sentential Natural Deduction] ββ> [Week 7: Midterm Exam] β [Week 13: Final Exam] <ββ [Weeks 11-12: Predicate Derivations] <ββ [Weeks 9-10: Predicate Syntax] β