CONDITIONAL.
A conditional statement.
A conditional statement
The conditional statement "If A then B" is equivalent to "Not B or A" So, the inverse of "If A then B" is the inverse of "Not B or A" which is "Not not B and not A", that is "B and not A",
conditional statement
A conditional statement.
An example of a conditional statement is: If I throw this ball into the air, it will come down.In "if A then B", A is the antecedent, and B is the consequent.
A mathematical statement of the form if A then B would be a conditional statement.
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The answer is conditional!
ABA For that can be represented as statement (A) Contrast (B) Return of Statement(A)
ABA For that can be represented as statement (A) Contrast (B) Return of Statement(A)
[object Object]
A conditional statement.
It is a logical conditional statement which states that if some condition, a, is satisfied then another condition, b, must be satisfied. If a is not satisfied then we can say nothing about b.An equivalent statement, in a non-conditional form, is that~b or a must be TRUE, where ~b denotes not b.
A conditional statement
Assuming the exponential form, 9a4 - b2 has the factors (3a + b)(3a - b).
The statement you're describing is a form of logical implication often expressed as "If A, then B." In this structure, if A is true, then B must also be true. However, it does not mean that B is always true independently; it is only true when A is true. Therefore, the correct interpretation is that B's truth is contingent upon A being true.