1. Silly starter Clicker question
What does the word Proof mean to you A) Establishing a fact with complete certainty B) Establishing a fact beyond reasonable doubt C) What happens to dough when you add yeast D) None of the above

2. Silly starter Clicker question
The picture is an example of which fallacy? A) Straw man B Slippery slope C) Argumentum ad hominum D) Ignoratio Elenchi E) Circular reasoning

3. Lecture 2, MATH 210G.02, Fall 2017: Logic Part 2: Symbolic Logic

4. Law of the excluded middle
For every proposition, either the proposition is true or its negation is true
Either “Socrates is a man” or “Socrates is not a man”
Either “It is true that Socrates is a man” or “It is true that Socrates is not a man”
What about “This sentence is neither true nor false”
Problem of self-reference or implied “it is true that…”

5. A use of the excluded middle
There exist positive, irrational numbers a and b such that is rational.
Proof: is irrational (believe me next week)
If is rational then we are done:
If is irrational then
Does the trick. Proof is nonconstructive. It does not tell us whether is rational for particular irrational values of a and b.

6. Problems with the excluded middle
Many statements have an element of uncertainty and are subject to an error of equivocation or false dilemma
Four quarters are a dollar
Either it is raining or it is not raining
Either Sophia Vergara is blonde or she is not blonde.
Either NMSU has a better football team or UTEP has a better football team…
These examples all suffer from imprecise language.

7. Logical arguments I: The syllogism
Aristotle, Prior Analytics: a syllogism is "a discourse in which, certain things having been supposed, something different from the things supposed results of necessity because these things are so.”

8. Syllogism cont.
A categorical syllogism consists of three parts: the major premise, the minor premise and the conclusion.
Major premise: All men are mortal.
Minor premise: Socrates is a man.
Conclusion: Socrates is mortal.
Major premise: All mortals die.
Minor premise: All men are mortals.
Conclusion: All men die.

9. Identify the major premise:
All dogs have four legs Milo is a dog ________________________ People who solve problems can get jobs. Students good in math can solve problems. _______________________ Women like a man with a prominent chin. Robert Z’dar has a prominent chin.

10. ou
Logic, n. The art of thinking and reasoning in strict accordance with the limitations and incapacities of the human misunderstanding. The basic of logic is the syllogism, consisting of a major and a minor premise and a conclusion - thus: Major Premise: Sixty men can do a piece of work sixty times as quickly as one man. Minor Premise: One man can dig a post-hole in sixty seconds; Therefore- Conclusion: Sixty men can dig a post-hole in one second. This may be called syllogism arithmetical, in which, by combining logic and mathematics, we obtain a double certainty and are twice blessed.”

11. Modus ponendo ponens ("the way that affirms by affirming”)
If P, then Q. P. Thus, Q
If Socrates is a man then Socrates is mortal
Socrates is a man
Therefore, Socrates is mortal

12. Logic and causality

13. Causality
Plato is a dog.
all dogs are green
Plato is green.

14. Universe of discourse

15. Logic and symbol of propositional calculus
1515
Logic and symbol of propositional calculus
P, Q, R etc: propositional variables
Substitute for statements, e.g., P: Plato is a dog, Q: Plato is Green
Logical connectives:
Proposition: If Plato is a dog then Plato is green:

16. Truth tables P Q
(conjunction) T F P Q
(disjunction) T F

17. Clicker question P: Socrates is a man Q: Socrates is mortal.
If Socrates is a man then Socrates is mortal.
Suppose that Socrates is not a man.
Is the whole statement: true or false?
Clicker: True (A) or False (B)

18. Truth table for implicationQ
(implication) T F

19. Why is “If p then q” true whenever p is false?
Your mom always tells the truth…right? Your mom makes a promise: “ if you get an A in math then we’ll get you a puppy” Suppose you don’t get an A in math. If you don’t get a puppy, then your mom has not broken her promise. If you get a puppy anyway, she still has not broken her promise. P: you get an A in math; Q: get a puppy holds either way.

20. Simple and compound statements
A simple statement is sometimes called an atom. E.g., Milo is a dog; Socrates is a man; Men are mortal. A compound statement is a string of atoms joined by logical connectives (and, or, then, not) Logical equivalence: vs Truth value of a compound statement is inherited from the values of the atoms.

21. Truth table for modus ponens
No matter what truth values are assigned to the statements p and q, the statement is true

22. Exercise: complete the truth table for modus tollensQ ~P ~Q T F
Stopped here 2/2/17

23. For compound statements with conjunctions (∧) to be true, the elements on both sides of ∧ must have the value “T” so the fourth column is as follows: P Q T F

24. For condition statements or “implications” with “ ->” to be true, either the statement to the left of the implication has to be false or the statement to the right of the implicationhas to be true. The statement (p->q)∧-q is false in the first three cases and the statement –p is true in the last, so the fourth column has value “T” in all cases P Q T F

25. Clicker questions: First row: True (A) or False (B)p ~p q Q~ T F
First row: True (A) or False (B)
Second row: True (A) or False (B)
Third row: True (A) or False (B)
Fourth row: True (A) or False (B)

26. Logical equivalence
Two formulas are logically equivalent if they have the same truth values once values are assigned to the atoms.
Ex: is equivalent is equivalent to
How to check logical equivalence: verify that the statements always have the same values

27. Exercise: verify that the statements , and are logically equivalentp q T F

28. Exercise: Verify using truth tables that the following DeMorgan’s laws are logically equivalent

29. Exercise: Verify using truth tables the following absorption rules and the conditional rules

30. Match the following logical equivalencies with the corresponding rules of inference

31. Tautology and contradiction: T or C
A logical statement that is always true, independent of whether each of the symbols is true, is called a tautology. A logical statement that is always true, independent of whether each of the symbols is true, is called a contradiction. Note:

32. Logical equivalence laws
Commutative laws: p ∧ q = q ∧ p; p ∨ q = q ∨ p Associative laws: (p ∧ q) ∧ r = p ∧ (q ∧ r), (p ∨ q) ∨ r = p ∨ (q ∨ r) Distributive laws: p ∧ (q ∨ r) = (p ∧ q) ∨ (p ∧ r) p ∨ (q ∧ r) = (p ∨ q) ∧ (p ∨ r) Identity, universal bound, idempotent, and absorption laws: p ∧ t = p, p ∨ c = p p ∨ t = t, p ∧ c = c p ∧ p = p, p ∨ p = p p ∨ (p ∧ q) = p, p ∧ (p ∨ q) = p De Morgan’s laws: ~(p ∧ q) = ~p ∨ ~q, ~(p ∨ q) = ~p ∧ ~q

33. Show that the following are logically equivalent: (r V p) ^ ( ( ~r V (p^q) ) ^ (r V q) ) and p ^ q

35. Boole (1815-1864) and DeMorgan (1806–1871)
De Morgan’s laws:
not (P and Q) = (not P) or (not Q)
not (P or Q) = (not P) and (not Q)

36. Boolean algebra

37. Other logical deduction rules

38. Exercises

39. Fill in the following truth table

40. Fill in the following truth table

41. Fill in the following truth table

42. Exercise 1: Complex deduction
• Premises: – If my glasses are on the kitchen table, then I saw them at breakfast I was reading the newspaper in the living room or I was reading the newspaper in the kitchen – If I was reading the newspaper in the living room, then my glasses are on the coffee table – I did not see my glasses at breakfast – If I was reading my book in bed, then my glasses are on the bed table – If I was reading the newspaper in the kitchen, then my glasses are on the kitchen table • Where are the glasses?

43. Deduce the following using truth tables or deduction rules

44. a. If it walks like a duck and it talks like a duck, then it is a duck
NAME_______________ NAME_____________
Write each of the following three statements in the symbolic form and determine which pairs are logically equivalent
a. If it walks like a duck and it talks like a duck, then it is a duck
b. Either it does not walk like a duck or it does not talk like a duck, or it is a duck
c. If it does not walk like a duck and it does not talk like a duck, then it is not a duck

45. Walks like duck (W)
Talks like duck (Ta)
Is duck (D) T F
Walks like duck
~ W
Talks like duck
~ T
Is duck T F

46. Exercise: Are the statements and are logically equivalentp q T F

47. Spatial logic puzzles
The last set of exercises here will not be reflected on the midterm exam because of their level of complexity, combining spatial reasoning and logic.

48. Spatial logic puzzles
Spatial logic puzzles involve deducing certain attributes attached to specific entities by a process of elimination that takes spatial or temporal information into account.

49. Zebra puzzle
There are 5 houses each with a different color. Their owners, each with a unique heritage, drinks a certain type of beverage, smokes a certain brand of cigarette, and keeps a certain variety of pet. None of the owners have the same variety of pet, smoke the same brand of cigarette or drink the same beverage. Clues: The Brit lives in the red house. The Swede keeps dogs as pets. The Dane drinks tea. Looking from in front, the green house is just to the left of the white house. The green house's owner drinks coffee. The person who smokes Pall Malls raises birds. The owner of the yellow house smokes Dunhill. The man living in the center house drinks milk. The Norwegian lives in the leftmost house. The man who smokes Blends lives next to the one who keeps cats. The man who keeps a horse lives next to the man who smokes Dunhill. The owner who smokes Bluemasters also drinks beer. The German smokes Prince. The Norwegian lives next to the blue house. The man who smokes Blends has a neighbor who drinks water. Who owns the pet fish?

51. Five women bought five different types of flowers for different reasons on different days. Names: Julia, Amy, Bethany, Rachel, and Kristen Flowers: Roses, Daisies, Lilies, Tulips, and Carnations Colors: Purple, Yellow, Pink, White, and Peach Places or Occasions: Backyard, Park, Office, Wedding, and Birthday Days: Monday, Tuesday, Wednesday, Thursday, and Friday The flowers were purchased in the following order: tulips, the flowers for the office, the purple flowers, the roses for the park, and the white flowers bought by Julia. 2. Bethany loves flowers but is allergic, so she would never have them indoors. 3. It rained on Wednesday and Friday, because of this, the wedding and birthday party had to be moved indoors. 4. Amy bought her flowers after Rachel, but before Kristen. 5. Rachel needed something more to add to her office, so she chose peach flowers to match her curtains. 6. On Wednesday the only purple flowers available at the flower shop were daisies. 7. The pink flowers were bought after the carnations, but before the lilies. 8. The flowers for the birthday were bought after the flowers for the office, but before the flowers for the wedding.

52. Assassin is a popular game on college campuses
Assassin is a popular game on college campuses. The game consists of several players trying to eliminate the others by means of squirting them with water pistols in order to be the last survivor. Once hit, the player is out of the game. Game play is fair play at all times and all locations, and tends to last several days depending on the number of participants and their stealth. At Troyhill University, 5 students participated in a game that only lasted four days. Can you determine each player's first name, their color, their assassin alias, how they were eliminated, and their major? Names: Liam, Anabel, Bella, Oliver, Ethan Colors: Red, Green, Blue, Purple, Black Alias: Captain Dawn, Night Stalker, Dark Elf, McStealth, Billy Capture: Caught at weekly study group, Caught helping friend with car trouble, Ambushed during sleep, Caught on the way to class, Winner Major: Economics, Biology, Art History, Sociology, Psychology MONDAY: Liam, the girl named Captain Dawn, and the person in purple avoided any action that day. The psychology major was able to easily catch Ethan because she already had a study group meeting with him that day. Since it was a weekly engagement, he didn't suspect a thing. Goodbye red player. TUESDAY: Everyone tried to get in on the action today. The girl masquerading as the Dark Elf (who was wearing either black or red) and the sociology major lived to see another day. The purple player was able to catch the obliging yet naive green player by calling her and pretending he had car trouble. WEDNESDAY: The biology major (who was still "alive") was surprised to hear that the Psychology major, who wasn't Anabel the art history major, ambushed Night Stalker as he slept in his dorm. THURSDAY: The black player was declared the victor after luckily spotting "Billy" on his way to Mammalian Physiology, a class required by his major.

54. More logic grid puzzles

55. Exercise Solutions

56. Fill in the following truth tablep q r
p ^ r
~ ( p ^ r )
~ ( p ^ r ) v q T F

57. Fill in the following truth tablep q r
p ^ r
~ ( p ^ r )
~ ( p ^ r ) v q T F

58. Fill in the following truth tableP Q ~P ~Q
P^~Q
~P v Q
~(~P v Q)
~P v ( P ^ ~ Q)
Q ^ ~ (~ P v Q) T F

59. Fill in the following truth tableP Q ~P ~Q
P^~Q
~P v Q
~(~P v Q)
~P v ( P ^ ~ Q)
Q ^ ~ (~ P v Q) T F

60. Fill in the following truth tableC D ~A
~AvB ~C
~C^D
(~AvB)->(~C^D) T F

61. Fill in the following truth tableC D ~A
~AvB ~C
~C^D
(~AvB)->(~C^D) T F

62. Exercise 1: Complex deduction (solution)
• Premises: – If my glasses are on the kitchen table, then I saw them at breakfast. I was reading the newspaper in the living room or I was reading the newspaper in the kitchen. If I was reading the newspaper in the living room, then my glasses are on the coffee table. I did not see my glasses at breakfast. If I was reading my book in bed, then my glasses are on the bed table. If I was reading the newspaper in the kitchen, then my glasses are on the kitchen table • Where are the glasses? SOLN: Since I did not see my glasses at breakfast, they are not on the kitchen table. Therefore I was not reading the newspaper in the kitchen. Therefore I was reading the newspaper in the living room. Therefore my glasses are on the coffee table. Notice that the conditional statement: “If I was reading my book in bed then my glasses are on the bed table “ is a red herring because nothing else supports the conclusion that I was reading in bed or that my glasses are on the bed table.

63. Deduce the following using truth tables or deduction rules
Complete the following truth table to confirm the equivalence: P ~P Q ~Q
P v ~ Q
~P ^ ~Q
~(P v ~ Q)
~(P v ~ Q) v (~P ^ ~Q) T F

64. Deduce the following using truth tables or deduction rules
The following truth table confirms the equivalence: P ~P Q ~Q
P v ~ Q
~P ^ ~Q
~(P v ~ Q)
~(P v ~ Q) v (~P ^ ~Q) T F

65. a. If it walks like a duck and it talks like a duck, then it is a duck
NAME_______________ NAME_____________
Write each of the following three statements in the symbolic form and determine which pairs are logically equivalent
a. If it walks like a duck and it talks like a duck, then it is a duck
b. Either it does not walk like a duck or it does not talk like a duck, or it is a duck
c. If it does not walk like a duck and it does not talk like a duck, then it is not a duck

66. Walks like duck (W)
Talks like duck (Ta)
Is duck (D) T F
Walks like duck
Talks like duck
Is duck
~ W
~ T
~WV~T T F

67. Walks like duck (W)
Talks like duck (Ta)
Is duck (D) T F
Walks like duck
Talks like duck
Is duck
~ W
~ T
~WV~T T F

68. Exercise: Are the statements and are logically equivalent
Exercise: Are the statements and are logically equivalent? SOLN: No: truth values are not all the same: p q T F

69. Spatial logic puzzles
We only solve the “zebra”puzzle to illustrate the thinking involved.

70. Zebra puzzle
Brit
Swede
Dane
German
Norge
Red
Green
White
Yellow
Blue
Dog
Bird
Cat
Horse
Fish
Tea
Coffee
Milk
Beer
Water
Pall
Dun
Blend
BlMa
Prince 1 2 3 4 5 o x
BlMas
There are 5 houses each with a different color. Their owners, each with a unique heritage, drinks a certain type of beverage, smokes a certain brand of cigarette, and keeps a certain variety of pet. None of the owners have the same variety of pet, smoke the same brand of cigarette or drink the same beverage. Clues: The Brit lives in the red house. The Swede keeps dogs as pets. The Dane drinks tea. Looking from in front, the green house is just to the left of the white house. The green house's owner drinks coffee. The person who smokes Pall Malls raises birds. The owner of the yellow house smokes Dunhill. The man living in the center house drinks milk. The Norwegian lives in the leftmost house. The man who smokes Blends lives next to the one who keeps cats. The man who keeps a horse lives next to the man who smokes Dunhill. The owner who smokes Bluemasters also drinks beer. The German smokes Prince. The Norwegian lives next to the blue house. The man who smokes Blends has a neighbor who drinks water. Who owns the pet fish?

71. Soln:
We know that the Norwegian lives in the leftmost house, which is next to the blue house, so the blue house is the second house. Since the Brit lives in the red house, the red house cannot be the first leftmost house. Since the white house is to the right of the green house, we can only conclude that the three houses on the right are red, green or white. So the Norwegian lives in the yellow house and smokes Dunhills. Thus, the horse must belong to the second (blue) house. The center house is not green since its owner drinks milk, not coffee. Therefore the center house must be red, the next house green and the rightmost house white. We now know that the Brit lives in the middle house. The man in the blue house is not British, Norwegian or Swedish (dogs) so is German or Danish. If he is German then he smokes Pall Malls and the smokers of Blends, BlueMeisters and Pall Mall live in the right three houses as do the drinkers of milk (middle), beer (Bluemeisters) and coffee (green). This leads to a contradiction since then the drinkers of tea and water live in the left two houses—impossible if the tea drinker is Danish. So the blue house belongs to the Dane. The owners of the two right houses then are German and Swede. Since the Dane in the blue house does not smoke Prince (German), Dunhill (Norwegian), Pall Mall (Birds, not horse) or Bluemeister (beer, not tea), the Dane must smoke Blends. Since the middle house drinks milk, the Dane’s other neighbor-the Norwegian, must drink water. This forces the owner of the white house to drink beer since that of the Green house drinks tea. Since the German smokes Prince, not Bluemeisters, the German must live in the Green house and the Swede in the White house and the Brit must have the birds. The cat must live with the Norwegian. This means the German owns the fish.