The statement "Reasons can explain events" is true. Reasons provide the underlying motivations or justifications for why certain events occur, helping to clarify the connections between actions and their outcomes. Understanding these reasons can enhance our comprehension of events in various contexts, such as social, historical, or scientific situations.
B. False. Reversing the clauses of an if-then statement changes its meaning, and the new statement is not necessarily true. For example, in the statement "If it rains, then the ground is wet," reversing it to "If the ground is wet, then it rains" is not always true, as the ground could be wet for other reasons.
Yes, a statement can be true or false but without knowing what the statement is no-one can possibly say whether it is true or it is false.
false
algebra
It is a statement. It is a false statement, but a statement nevertheless.
fermi paradox is very confusing. We can not explain that Paradox.
This statement is true.
If the statement is false, then "This statement is false", is a lie, making it "This statement is true." The statement is now true. But if the statement is true, then "This statement is false" is true, making the statement false. But if the statement is false, then "This statement is false", is a lie, making it "This statement is true." The statement is now true. But if the statement is true, then... It's one of the biggest paradoxes ever, just like saying, "I'm lying right now."
The keyword "p" represents a statement that is true, while "not p" represents the negation of that statement, meaning it is false.
For a given increase in supply the slope of both demand curve and supply curve affect the change in equilibrium quantity Is this statement true or false Explain with diagrams?
Yes, a statement can be true or false but without knowing what the statement is no-one can possibly say whether it is true or it is false.
A counterexample is a specific case in which a statement is false.
Let us consider "This statement is false." This quotation could also be read as "This, which is a statement, is false," which could by extent be read as "This is a statement and it is false." Let's call this quotation P. The statement that P is a statement will be called Q. If S, then R and S equals R; therefore, if Q, then P equals not-P (since it equals Q and not-P). Since P cannot equal not-P, we know that Q is false. Since Q is false, P is not a statement. Since P says that it is a statement, which is false, P itself is false. Note that being false does not make P a statement; all things that are statements are true or false, but it is not necessarily true that all things that are true or false are statements. In summary: "this statement is false" is false because it says it's a statement but it isn't.
False. A declaration is a public statement.
A counter example is a statement that shows conjecture is false.
false
As a rule, you're not permitted to withdraw an official statement once it has been recorded. You could recant the statement in court, but the prosecutor is probably going to ask if you were untruthful at the time you made the statement. That could invite criminal liability, as it's usually a criminal offense to make a false report to the police.