Print Froggy Jumps: Argument Challenge ()

1. A declaration that can be determined to be either true or false, but not both.

A

argument

B

statement

C

counterexample

2. A statement or set of statements that you use in order to try to convince.

A

statement

B

counterexample

C

argument

3. Statement in the beginning or middle of an argument

A

counterexample

B

premise

C

conclusion

4. Statement in the end of an argument

A

premise

B

conclusion

C

counterexample

5. Premise, and premise, and premise, ... therefore conclusion

A

argument

B

statement

C

counterexample

6. Deductive argument where the conclusion is guaranteed from the premises.

A

invalid argument

B

valid argument

C

counterexample

7. Argument using deductive reasoning

A

counterexample

B

inductive argument

C

deductive argument

8. Argument using inductive reasoning

A

inductive argument

B

deductive argument

C

counterexample

9.

A

Valid Argument type I

B

Valid Argument type II

C

Invalid Argument

10.

A

Valid Argument type I

B

Invalid Argument

C

Valid Argument type II

11. The moon is made out of blue cheese.

A

False Statement

B

Valid Argument type I

C

Invalid Argument

12.

A

Valid Argument type II

B

Invalid Argument

C

Valid Argument type 1

13.

A

Valid Argument type I

B

Valid Argument type II

C

Invalid Argument

14.

A

Valid Argument type I

B

Valid Argument type II

C

Invalid Argument

15. To determine whether the argument is valid or invalid

A

To evaluate the argument

B

To solve an argument

C

To provide a counterexample

16. If we can find even one situation that does not satisfy our conclusion.

A

Valid Argument

B

Invalid Argument

C

Argument

17. A situation that does not satisfy the conclusion of an argument, and proves that the argument is invalid.

A

A proof

B

An example

C

A counterexample

18. Find a counterexample: The sum of a negative number and a positive number will always be positive.

A

-10+7=-3

B

10+(-7) = 3

C

-7 + 10 = 3

19. Find a counterexample: The product of a number and itself will always be larger than the original number.

A

2x2=4

B

0.5 x 0.5 = 0.25

C

(-2)x(-2) = 4

20. Find a counterexample: The quotient of two whole numbers is a whole number.

A

5/2=2.5

B

6/2=3

C

0/3=0

21. Find a counterexample: The difference of two prime numbers is prime.

A

11-7=4

B

7-5=2

C

5-2=3