Phi 270 Fall 2013 |
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Phi 270 F08 test 1
F08 test 1 topics
The following are the topics to be covered. The proportion of the test covering each will approximate the proportion of the classes so far that have been devoted to that topic. Your homework and the collection of old tests will provide specific examples of the kinds of questions I might ask.
Basic concepts of deductive logic. You will be responsible for entailment, tautologousness and absurdity, and the relations between pairs of sentences (i.e., implication, equivalence, exclusiveness, joint exhaustiveness, and contradictoriness). You should be able to define any of these ideas in terms of truth values and possible worlds (see appendix A.1 and 1.2.3 for samples of such definitions), and you should be ready to answer questions about the concepts using such definitions.
Implicature. Be able to define it and distinguish it from implication. Be able to give examples and explain them. Be ready to answer questions about it, justifying your answer by reference to its definition.
Analysis. Be able to analyze the logical form of a sentence as fully as possible using conjunction and present the form in both symbolic and English notation (that is, with the logical-and symbol ∧ and with the both
… and
… way of expressing forms).
Synthesis. Be able to synthesize an English sentence that has a given logical form.
Derivations. Be able to construct derivations to show that entailments hold and to show that they fail. I may tell you in advance whether an entailment holds or leave it to you to check that using derivations. There may be some derivations where the rule Adj introduced in 2.4 would be convenient to use; but it is never necessary. You should be ready to use EFQ and ENV (the rules for ⊤ and ⊥) as well as Ext, Cnj, and QED; but derivations involving the latter three are much more likely.
F08 test 1 questions
1. |
Define the idea of two sentences being mutually exclusive by completing the following with a definition in terms of truth values and possible worlds:
φ and ψ are mutually exclusive if and only if …
answer
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2. |
Suppose you are told about some sentences φ and ψ and the tautology ⊤ that φ ⊨ ⊤ and ⊤ ⊨ ψ. (i) What does this tell you about the possible truth values of φ? And (ii) what does it tell you about the possible truth values of ψ? In each case, explain your answer by reference to the definitions of a tautology and of implication (i.e., entailment). answer |
3. |
Give an example of three sentences where the first implies (i.e., entails) the second, the second implicates the third (i.e., has the third as an implicature), but the first does not implicate the third. (It may be easiest to choose the second and third sentences as an example of an implicature—and it doesn’t have to be a new example—and then look for a sentence that implies one without implicating the other.) Be sure to say enough about the context of your sentences for me to be able to see that what you claim about them is so. answer |
4. |
Analyze the sentence below in as much detail as possible, presenting the result using symbolic notation and also English notation (i.e., using |
Although Al took the first turn, he missed the second; but he found his way to the meeting. |
5. |
Synthesize an English sentence that has the analysis below. Choose a simple and natural sentence whose organization reflects the grouping of the logical form. B ∧ (C ∧ D) B: Al wrote to Bob; C: Al spoke to Carol; D: Al spoke to Dave |
Use derivations to check whether each of the claims of entailment below holds. If an entailment fails, confirm a counterexample by providing a table in which you calculate the truth values of the premises and conclusion on an assignment of truth values that is a counterexample lurking in an open gap. (Your table should indicate the value of any compound component by writing this value under the main connective of the component.) Do not use the rule Adj in the first derivation, but you may use it in the second. |
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6. |
A ∧ (B ∧ C), D ⊨ C ∧ D
answer |
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7. |
A ∧ B, B ∧ D ⊨ A ∧ (C ∧ D)
answer |
F08 test 1 answers
1. |
φ and ψ are mutually exclusive if and only if there is no possible world in which φ and ψ are both true (or: if and only if, in each possible world, at least one of φ and ψ is false) |
6. |
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