phi_270_F98_test

Phi 270 F98 test 4

F98 test 4 questions

(Questions 1-2 are from quiz 4 and 3-8 are from quiz 5 out of 6 quizzes—these two quizzes addressed the part of the course your test is designed to cover.)

Identify individual terms and quantifier phrases in the following sentence and indicate links between pronouns and their antecedents. (You can do this by marking up an English sentence; you are not being asked to provide a symbolic analysis.)
1.	`Sam ordered a book, but instead of it he received a book he didn’t want.` answer

Analyze the following generalization in as much detail as possible. Provide a key to the non-logical vocabulary (upper and lower case letters) appearing in your answer.
2.	`No one saw the book that was lying on the table`. answer

Analyze the following sentences in as much detail as possible, providing a key to the non-logical vocabulary (upper and lower case letters) appearing in your answer.
3.	`No one except numismatists understood the joke` answer
4.	`The movie delighted all boys and girls` answer
5.	`If anyone relayed the message to everyone, then no one understood every part of it` answer

Use derivations to establish the validity of the following arguments. You may use attachment rules.

∀x (Fx ∨ Gx)

∀x ¬ Gx

∀x Fx

answer

∀x (Fx → ∀y (Pxy → Rxy))

∀y ∀x ((Fx ∧ Pxy) → Rxy)

answer

Use a derivation to show that the following argument is not valid and describe a counterexample lurking in one of the derivation’s open gaps.

∀x (Fx → ¬ Rxx)

∀x ∀y (Fy → ¬ Rxy)

answer

F98 test 4 answers

No one saw the book that was lying on the table.

No one is such that (he or she saw the book that was lying on the table)

(∀x: x is a person) ¬ x saw the book that was lying on the table

(∀x: Px) ¬ Sx(the book that was lying on the table)

(∀x: Px) ¬ Sx(bt)

P: [ _ is a person]; S: [ _ saw _ ]; b: [the book that was lying on _ ]; t: the table

3.	`No one except numismatists understood the joke` (∀x: x `is a person` ∧ ¬ x `is a numismatist`) ¬ x `understood` `the joke` (∀x: Px ∧ ¬ Nx) ¬ Uxj N: [ _ `is a person`]; P: [ _ `is a numismatist`]; U: [ _ `understood` _ ]; j: `the joke`

The movie delighted all boys and girls

all boys and girls are such that (the movie delighted them)

(∀x: x is a boy or girl) the movie delighted x

(∀x: x is a boy ∨ x is a girl) the movie delighted x

(∀x: Bx ∨ Gx) Dmx

B: [ _ is a boy]; D: [ _ delighted _ ]; G: [ _ is a girl]; m: the movie

If anyone relayed the message to everyone, then no one understood every part of it

(∀x: x is a person) if x relayed the message to everyone, then no one understood every part of it

(∀x: Px) (x relayed the message to everyone → no one understood every part of the message)

(∀x: Px) ((∀y: y is a person) x relayed the message to y → (∀z: z is a person) ¬ z understood every part of the message)

(∀x: Px) ((∀y: Py) x relayed the message to y → (∀z: Pz) ¬ (∀w: w is a part of the message) z understood w)

(∀x: Px) ((∀y: Py) Rxmy → (∀z: Pz) ¬ (∀w: Twm) Uzw)

P: [ _ is a person]; R: [ _ relayed _ to _ ]; T: [ _ is a part of _ ]; U: [ _ understood _ ]; m: the message

	│∀x (Fx ∨ Gx)	a:2
	│∀x ¬ Gx	a:3
	├─
	│ⓐ
2 UI	││Fa ∨ Ga	4
3 UI	││¬ Ga	(4)
4 MTP	││Fa	(5)
	││●
	│├─
5 QED	││Fa	1
	├─
1 UG	│∀x Fx

	│∀x (Fx → ∀y (Pxy → Rxy))	b:5
	├─
	│ⓐ
	││ⓑ
	││││Fb ∧ Pba	4
	│││├─
4 Ext	││││Fb	(6)
4 Ext	││││Pba	(8)
5 UI	││││Fb → ∀y (Pby → Rby)	6
6 MPP	││││∀y (Pby → Rby)	a:7
7 UI	││││Pba → Rba	8
8 MPP	││││Rba	(9)
	││││●
	│││├─
9 QED	││││Rba	3
	││├─
3 CP	│││(Fb ∧ Pba) → Rba	2
	│├─
2 UG	││∀x ((Fx ∧ Pxa) → Rxa)	1
	├─
1 UG	│∀y ∀x ((Fx ∧ Pxy) → Rxy)

	│∀x (Fx → ¬ Rxx)	b:5, a:7
	├─
	│ⓐ
	││ⓑ
	││││Fb	(6)
	│││├─
	│││││Rab
	││││├─
5 UI	│││││Fb → ¬ Rbb	6
6 MPP	│││││¬ Rbb
7 UI	│││││Fa → ¬ Raa	8
	│││││
	│││││││¬ Fa
	││││││├─
	│││││││○	Fb,Rab,¬Rbb,¬Fa ⊭ ⊥
	││││││├─
	│││││││⊥	9
	│││││├─
9 IP	││││││Fa	8
	│││││
	││││││¬ Raa
	│││││├─
	││││││○	Fb,Rab,¬Rbb,¬Raa ⊭ ⊥
	│││││├─
	││││││⊥	8
	││││├─
8 RC	│││││⊥	4
	│││├─
4 RAA	││││¬ Rab	3
	││├─
3 CP	│││Fb → ¬ Rab	2
	│├─
2 UG	││∀y (Fy → ¬ Ray)	1
	├─
1 UG	│∀x ∀y (Fy → ¬ Rxy)

This counterexample lurks in both gaps: