Phil1068 Hku !exclusive! Jun 2026

Using derivation rules (like Modus Ponens or Reductio ad Absurdum ) to prove that a conclusion is true. Why Take It?

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The "Easy A" reputation of PHIL1068 is a bit of a myth. For students with a mathematical or "systems" brain, it can be very straightforward. However, for students who prefer subjective discussion over objective proofs, it can be quite challenging.

A: Yes. No philosophy background required. phil1068 hku

PHIL 1068: Elementary Logic at the University of Hong Kong (HKU) is a 6-credit introductory course focusing on the basic techniques and concepts of formal logic. It is designed for students of all levels and does not require prior knowledge of logic or mathematics. The University of Hong Kong (HKU) Course Overview The course provides a comprehensive introduction to First-Order Logic

A: Email the Department of Philosophy: phil@hku.hk . Include your UID and course code.

with all materials online and no physical lectures, as well as more traditional lecture-based structures. The University of Hong Kong (HKU) Assessment & Performance Using derivation rules (like Modus Ponens or Reductio

: Covering syntax, semantics, truth tables, and natural deduction. Predicate Logic

: Quantifiers, interpretations, and derivations in monadic predicate logic. Workload and Assessment The course is generally considered to have a light to manageable workload , but the difficulty can spike during the final exam. PHIL 1068 Facts - Philosophy@HKU

Sentential logic is limited because it cannot inspect internal sentence properties. This module fixes that by looking inside statements. PHIL 1068 Reading - Philosophy@HKU The "Easy A" reputation of PHIL1068 is a bit of a myth

: Understanding well-formed formulas and logical connectives. Evaluation Methods

The primary goal of PHIL1068 is to teach students how to distinguish good reasoning from bad reasoning using precise, formal systems. Instead of relying on intuitive or subjective notions of what "makes sense," students learn to map out human language into mathematical symbols to test for structural validity.

Have you taken PHIL1068? Drop a comment below—am I right about the tutors, or did you have a horror story?