PHI-DSC-202 (Logic II): Unit 4: Quantification
Contact Hours: 60 | Full Marks: 100 (ESE=70/CCA=30)
Table of Contents
Quantification: Symbolization
**Quantification** is the process of translating categorical and singular propositions into the language of Predicate Logic (or First-Order Logic), which can express internal structure not possible with Propositional Logic. It uses **quantifiers** and **predicates**.
Key Symbols
- Predicates: Capital letters (A, B, C...) representing properties or relations (e.g., Ax = "x is an Animal").
- Individual Constants: Lowercase letters (a, b, c...) representing specific individuals (e.g., s = Socrates).
- Individual Variables: Lowercase letters (x, y, z...) representing unspecified members of the universe of discourse.
- Universal Quantifier (x): Means "For all x" or "Every x".
- Existential Quantifier (∃x): Means "There is at least one x" or "Some x".
Symbolizing Standard Form Propositions
| Form | Example | Symbolization (Formula) |
|---|---|---|
| A (All S is P) | All dogs are mammals. (Dx, Mx) | (x) (Dx → Mx) |
| E (No S is P) | No fish are birds. (Fx, Bx) | (x) (Fx → ¬Bx) (or ¬(∃x) (Fx ⋅ Bx)) |
| I (Some S is P) | Some flowers are red. (Fx, Rx) | (∃x) (Fx ⋅ Rx) |
| O (Some S is not P) | Some humans are not kind. (Hx, Kx) | (∃x) (Hx ⋅ ¬Kx) |
Symbolization Tip: A/E use the Arrow (→); I/O use the Dot (⋅)
Rules of Quantification
In addition to the Nineteen Rules, four new rules are required for proofs involving quantifiers. These rules allow moving between quantified statements and instantiated (singular) statements.
- UI (Universal Instantiation):
From a universally quantified statement, you can deduce any statement that results from replacing the variable with an **individual constant (a, b, c...)**.
Formula: (x) (Fx) / ∴ Fa
- UG (Universal Generalization):
From an instantiated statement about an **arbitrarily chosen** individual (a specific variable *y* that is not tied to any premise), you can deduce the corresponding universally quantified statement.
Formula: Fy / ∴ (x) (Fx) (Requires strict constraints on *y*)
- EI (Existential Instantiation):
From an existentially quantified statement, you can deduce an instantiated statement using an **individual constant (a, b, c...) that has not occurred previously** in the proof.
Formula: (∃x) (Fx) / ∴ Fg (where 'g' is new)
- EG (Existential Generalization):
From an instantiated statement about a **specific** individual, you can deduce the corresponding existentially quantified statement.
Formula: Fa / ∴ (∃x) (Fx)
Proof Construction in Predicate Logic
Proofs in Predicate Logic combine the Nineteen Rules (for propositional steps) with the four Rules of Quantification (for handling quantifiers).
Steps in a Quantified Proof:
- **Symbolize:** Translate the premises and conclusion into symbolic quantified form.
- **Instantiate:** Use **UI** and **EI** to remove the quantifiers from the premises, yielding instantiated statements (propositional logic statements). **EI must be used first**, and always with a new constant.
- **Deduce:** Use the Nineteen Rules (MP, MT, Simp, etc.) to manipulate the instantiated lines and derive the required intermediate instantiated conclusion.
- **Generalize:** Use **UG** or **EG** to re-introduce the required quantifier to match the final conclusion.
Common Mistake: The Instantiation Rule Constraint
The biggest pitfall is violating the **EI** constraint: **The constant used in EI must be NEW.** Also, violate the **UG** constraint: You cannot generalize from a constant introduced by **EI** if that constant appears in a premise line or in the line you are trying to generalize from (if the line depends on a premise containing that constant).
Key Takeaway for Unit 4:
Master the four standard form **Symbolizations** (A, E, I, O) and the proper application constraints, particularly for **EI** (new constant) and **UG** (arbitrary individual/no reliance on existential constants).