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What else can I help you with?
All needs of everyone in the family are always met?
false
An example that makes a statement false?
i always lie
What is the circumference of a circle is always 3?
It is a false statement.
What statement is always false?
A statement that is always false is known as a "contradiction." For example, the statement "It is raining and it is not raining at the same time and in the same place" is always false because it contradicts itself. In logic, any assertion that cannot possibly be true under any circumstances falls into this category.
What one of these statements about how people respond to disasters is false?
"Everyone responds to disasters in the same way" is a false statement.
Do you know if the reverse of a conditional statement is always true?
false
In the economic process people are always concerned with making a profit True or false?
The statement is false.
What is a example for contadiction?
An example of a contradiction is the statement, "I always lie." If the statement is true, then the speaker is lying, which means the statement must be false. Conversely, if the statement is false, then the speaker does not always lie, making the original claim contradictory. This creates a paradox where the truth of the statement cannot be consistently determined.
What statements about subordinate clause is false?
One false statement about subordinate clauses is that they always function as independent sentences on their own. Another false statement is that they are always placed at the beginning of a sentence. Subordinate clauses can also come after the main clause in a sentence.
What statement about medication for the treatment of psychology disorders is false?
Medications are so cheap today that everyone who needs them can afford them
Is this statement true or falseThe cicumcenter of a triangle is always in the interior of a triangle?
false
Is the Converse of a false statement always false?
Let's take an example.If it is raining (then) the match will be cancelled.A conditional statement is false if and only if the antecedent (it is raining) is true and the consequent (the match will be cancelled) is false. Thus the sample statement will be false if and only if it is raining but the match still goes ahead.By convention, if the antecedent is false (if it isn't raining) then the statement as a whole is considered true regardless of whether the match takes place or not.To recap: if told that the sample statement is false, we can deduce two things: It is raining is a true statement, and the match will be cancelled is a false statement. Also, we know a conditional statement with a false antecedent is always true.The converse of the statement is:If the match is cancelled (then) it is raining.Since we know (from the fact that the original statement is false) that the match is cancelled is false, the converse statement has a false antecedent and, by convention, such statements are always true.Thus the converse of a false conditional statement is always true. (A single example serves to show it's true in all cases since the logic is identical no matter what specific statements you apply it to.)If you are familiar with truth tables, the explanation is much easier. Here is the truth table for A = X->Y (i.e. A is the statement if X then Y) and B = Y->X (i.e. B is the converse statement if Y then X).X Y A BF F T TF F T TT F F TF T T FLooking at the last two rows of the A and B columns, when either of the statements is false, its converse is true.
