Edit:
I have removed the original text in favor of showing the specific passages in the book that I am stuck on. Sorry about the inconvenience.
I am wondering whether $p ∧ q$ can be a proposition when $p$ and $q$ are both propositional variables. It seems to me that my book in one case says that a proposition can't have a variable truth value and then states that $p ∧ q$ is a proposition, even though it surely also has a variable truth value.
Page 2:
Consider the following sentences.
- What time is it?
- Read this carefully.
- $x + 1 = 2$
- $x + y = z$
Sentences 1 and 2 are not propositions because they are not declarative sentences. Sentences 3 and 4 are not propositions because they are neither true nor false. Note that each of sentences 3 and 4 can be turned into a proposition if we assign values to the variables.
Page 26:
Note that we will use the term "compound proposition" to refer to an expression formed from propositional variables using logical operators, such as $p ∧ q$.
Rosen, K. H. (2019). Discrete Mathematics and Its Applications Eighth Edition. New York, NY: McGraw-Hill Education.
Couldn't we have stated the following?
"$p ∧ q$ is not a proposition because it is neither true nor false. Note that it could be turned into a proposition if we assign values to the variables $p$ and $q$."