The statement "if A then B" is a conditional statement indicating that if condition A is true, then condition B will also be true. It establishes a cause-and-effect relationship, where A is the antecedent and B is the consequent. This means that the occurrence of A guarantees the occurrence of B, but B may occur independently of A. In logical terms, it implies that the truth of B is contingent upon the truth of A.
if A then B (original) if not A then not B (inverse)
B is between A and C.
If a b = 0, then either a = 0 or b = 0, or both.
A therefore B A is true Therefore B is true Logically..... A is true A is false Therefore B is false
6x+4 is the expression that you are looking for.
if a is true, then b must be true
The statement "A then B" suggests that if A occurs, then B will follow or happen as a result. It implies a sequential relationship between A and B, indicating that B is dependent on the occurrence of A.
The statement "if Athen B" does not convey a clear meaning since it lacks context. It could possibly be part of a conditional statement or a comparison. More information would be needed to accurately determine its meaning.
A mathematical statement of the form if A then B would be a conditional statement.
A conditional statement.
B and C only..........plato users only
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A conditional statement.
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A conditional statement
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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.