Deck 3: Understanding Causal Relationships: Necessary and Sufficient Conditions

In the statement "if A, then B," A is a necessary condition for

In the statement "if A, then B," B is a sufficient condition for

Modus Ponens is always valid.

Modus Tollens is always invalid.

A disjunction is an "either/or" statement.

A Venn Diagram tests validity in propositional logic.

"All A are B" is a Universal Affirmative statement.

"Some A are not B" is a Universal Negative statement.

Faulty memory can mar testimony.

The Post-Hoc Fallacy is an example of genuine causality.

Scientific reasoning relies upon Hypothetical-Deductive Reasoning.

Statistics are always trustworthy.

By careful wording of questions, conductors of surveys guarantee truthful results.

A truth table must be completed in order to determine validity.

Indicate whether the following examples are necessary or sufficient conditions.
-Striking the match against the matchbox causes the match to light.

Indicate whether the following examples are necessary or sufficient conditions.
-Eating causes one to sustain life.

Indicate whether the following examples are necessary or sufficient conditions.
-Listening to Wagner causes one to become violent.

Indicate whether the following examples are necessary or sufficient conditions.
-The President signing a bill causes it to become a law.

Indicate whether the following examples are necessary or sufficient conditions.
-Having four sides causes a shape to be a square.

Translate each statement into propositional logic form.
-If Ike is a baby, then Stan will kick him.

Translate each statement into propositional logic form.
-Either Damian or Mr. Hankey killed Kenny.

Translate each statement into propositional logic form.
-Cartman is not fat, but he does have big bones.

Translate each statement into propositional logic form.
-If Pip is English, then either Damian is not Satan's son or Mr. Garrison is not a good teacher.

Translate each statement into propositional logic form.
-Either Stewie is a megalomaniac, or Lois is crazy.

Translate each statement into propositional logic form.
-If Mel Gibson is a masochist, then Stan and Kyle should get their money back.

Translate each statement into propositional logic form.
-Homer eats donuts if and only if donuts exist.

Translate each statement into propositional logic form.
-If Patrick Stewart made an appearance, then either Stewie or Peter said "Wil Wheaton" strangely.

Given that A, B, and C are true and X, Y, and Z are false, determine the truth- value of the following statements.

-A v (B ? Z)

Given that A, B, and C are true and X, Y, and Z are false, determine the truth- value of the following statements.

-~B v ~X

Given that A, B, and C are true and X, Y, and Z are false, determine the truth- value of the following statements.

-(X & A) & (~B & Y)

Given that A, B, and C are true and X, Y, and Z are false, determine the truth- value of the following statements.

-[(A v B) & ~(Y & ~C)] v ~[~(Z ? ~X) v ~B]

Given that A, B, and C are true and X, Y, and Z are false, determine the truth- value of the following statements.

-~{~[~(A ? ~Y) & ~(Y ? C)] v ~[~(B ? ~Z) & ~(X v A)]}

Construct truth tables for the following arguments and indicate their validity.

- $\begin{array}{l}\mathrm{A} \rightarrow \sim \mathrm{B} \\ \end{array}$

$\frac {\text { B }} { \text { ?A} }$

Construct truth tables for the following arguments and indicate their validity.

- $\begin{array}{l}\sim(A \& B) \rightarrow C \\ \frac{\sim(B \& C)}{\sim A}\end{array}$

Construct truth tables for the following arguments and indicate their validity.

- $A \rightarrow(B \vee C)$
$B \rightarrow(C \& A)$
$\frac {\text { A}} { \rightarrow \text { C} }$

Construct truth tables for the following arguments and indicate their validity.

- $A$ v $B$
$\frac {\text { A \& B }} { \text {B \& A } }$

Construct truth tables for the following arguments and indicate their validity.

- $\begin{array}{l}\sim \mathrm{A} \rightarrow \sim(\mathrm{B} \vee \mathrm{C}) \\ \frac{\sim(\mathrm{B} \vee \mathrm{A})}{\sim \mathrm{C}}\end{array}$

Test the validity of the following syllogisms using the Venn Diagram test:

-All $x$ are $y$ All $\mathrm{z}$ are $\mathrm{x}$
$\frac {\text { All \( z \) are \( x \) }} { \text { All \( z \) are \( y \)} }$

Test the validity of the following syllogisms using the Venn Diagram test:

-All a are b
$\frac{\text { Some } \mathrm{a} \text { are } \mathrm{c}}{\text { Some } \mathrm{c} \text { are } \mathrm{b}}$

Test the validity of the following syllogisms using the Venn Diagram test:

-No a are $\mathrm{a}$ Some $m$ are not $m$

$\frac {\text { Some \( \mathrm{m} \) are not \( \mathrm{b} \) }} { \text {Some \( \mathrm{b} \) are not \( \mathrm{a} \) } }$

Test the validity of the following syllogisms using the Venn Diagram test:

-No $y$ are $x$
$\frac {\text { Some \( \mathrm{x} \) are \( \mathrm{z} \) }} { \text {Some \( \mathrm{z} \) are not \( \mathrm{y} \) } }$

Test the validity of the following syllogisms using the Venn Diagram test:

-All $d$ are $p$
$\frac {\text {Some \( \mathrm{p} \) are \( \mathrm{z} \) }} { \text { Some \( \mathrm{z} \) are \( \mathrm{d} \)} }$

Test the validity of the following syllogisms using the Venn Diagram test:

-No $a$ are $b$
$\frac {\text { All a are c}} { \text { All c are b } }$

Explain the causal relationships implied by necessary and sufficient conditions.

Why is truth in testimony problematic? What are the obstacles to overcome in determining truth in testimony?

What is the Hypothetical-Deductive Reasoning technique? Why is it important to science?

How might surveys be manipulated? How might one tell that a survey is legitimate?

Explain how one might use a truth table to determine validity.