The correct answer is D. converse. The converse of a conditional statement "If P, then Q" is formed by reversing the hypothesis and conclusion, resulting in "If Q, then P." In this context, the second statement being the converse of the first means it is derived by exchanging the positions of the two parts of the original statement.
ABA For that can be represented as statement (A) Contrast (B) Return of Statement(A)
true
thesis
C. The traditions and rules that lead to a reader's expectations
B
B statement is correct.
Without further information, the only correct statement would be "he is not AB type".
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.
A mathematical statement of the form if A then B would be 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",
It is what you get in an inference, after negating both sides. That is, if you have a statement such as: if a then b the inverse of this statement is: if not a then not b Note that the inverse is NOT equivalent to the original statement.
It is a statement of succession.
B = A.
in each species the amount of adenine equals the amount of cytosine
Your statement is correct. y=mx+b when m is the slope and b is the y-intercept.
conditional statement