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Vocabulary
Valid or Invalid
Arguments
Sufficient/Necessary
Misc.
100

Biconditional Statement

p if and only if q (p <--> q)

100

What do we call the rows in a truth table that have two true premises?

Critical rows

100

What is the structure of generalization (name both posiblities) using p and q

a.     p

        therefore p or q

b.     q 

        therefore p or q

100

What is the logic form of a sufficient statement turned into a conditional statement?

if r then s

100

Name two of the fallacies we discussed in class.

Converse error and Inverse error. 

200

an error in reasoning that results in an invalid argument.

Fallacy 

200

Analyze the truth table and state whether or not the following argument is valid:


invalid

200

Name the structure of the following argument:

If p then q

p

therefore q 

Modus Ponens

200

What are the logic forms of a necessary statement turned into a conditional statement?

"if ~r then ~s"
or
"if s then r"


200

True or False:

Mr. Smejkal is younger than Mrs. Smejkal.

False. He is almost a year older. 

300

a sequence of statements

argument 

300

TRUE or FALSE: 

The truth table for an argument can have a row with two false premises and still be a valid argument. 

TRUE

300

Name the structure of the following argument:

If you are a senior then you are an upper classman.

You are not an upper classman.

Therefore you are not a senior.

Modus Tollens

300

What is the logic form of an unless statement turned into a conditional statement?

if ~s then r

300

Solve the complex deduction:


buried under the flagpole

400

assumptions or hypotheses of an argument

premises

400

Is the following argument invalid because of converse or inverse error?


If Caleb and Dylan sit next to each other, then the classroom will be loud. 

The classroom is loud.

Therefore Caleb and Dylan are sitting next to each other.

Converse error

400

Name the structure of the following argument:

x-3=0    OR    x+2=0

x does not equal -2

Therefore x+3=0

Elimination

400

Turn this statement into a conditional statement:

We are going to the party unless it snows.

If it doesn't snow then we are going to the party.  

400

What are the names of Mrs. Smejkal's kids (spelling counts). Who is the oldest?

Konrad and Cadence. Konrad is the oldest. 

500

if the resulting premises are all true, then the conclusion is also true

valid statement

500

Name the following argument structure and prove it is is valid using a truth table. Then come up with a real example of the argument.

If p then q

Not q

Therefore not p

Modus Tollens 

One critical row yields T conclusion 

Example:  TBD

500

Name the structure of the following argument:

If Mrs. Smejkal eats a good breakfast then she will have enough energy for the morning. 

If Mrs. Smejkal has enough energy for the morning then she will teach a good lesson.

Therefore if Mrs. Smejkal eats a good breakfast then she will teach a good lesson.

transitivity

500

Turn the necessary statement into a conditional statement: 

Knowing how to manage your finances is a necessary condition for being a successful adult. 

If you are a successful adult, then you know how to manage your finances. 

If you do not know how to manage your finances, then you will be a successful adult. 

500

Name three other fallacies that exist that we did not discuss in class. 

Ambiguous premises 

Circular reasoning

Jumping to a conclusion