Template Didn't Work: Troubleshooting Bi-Conditionals

Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
5 replies · 3K views
XodoX
Messages
195
Reaction score
0
Sorry, the template didn't really work for those questions.

1.)
Which of these sentences are propositions? What are their truth values?
a)Boston is the capital of Massachusetts. -> Proposition, but what do they mean by truth values? F and T? Then it would be T.

b) Miami is the capital of Florida. -> proposition. Truth value F?


13. Determine if these bi-conditionals are true or false

a) If 1+1=2, then 2+2=5.

b) If 1+1=3, then 2+2=4.

c) If 1+1=3, then 2+2=5

d) If monkeys can fly, then 1+1=3

Those are all FALSE, right??


Thanks!
 
Physics news on Phys.org
XodoX said:
Sorry, the template didn't really work for those questions.

1.)
Which of these sentences are propositions? What are their truth values?
a)Boston is the capital of Massachusetts. -> Proposition, but what do they mean by truth values? F and T? Then it would be T.

b) Miami is the capital of Florida. -> proposition. Truth value F?


13. Determine if these bi-conditionals are true or false

a) If 1+1=2, then 2+2=5.

b) If 1+1=3, then 2+2=4.

c) If 1+1=3, then 2+2=5

d) If monkeys can fly, then 1+1=3

Those are all FALSE, right??


Thanks!

1a) True
1b) False

For an implication (such as 13 a, b, c, and d), the only situation it is false is when the first statement--the hypothesis--is true and the conclusion--the second statement--is false, so 13a is false.
 
XodoX said:
Thanks! Makes sense.

XodoX said:
False.
Read what I said again, because you're not getting it. For an implication p [itex]\Rightarrow[/itex] q (also written as if p then q), where p and q are statements, the only possible way for p [itex]\Rightarrow[/itex] q to be false is when p is true and q is false.