In the conditional "P �¨ Q," "Q is a
sufficient condition for Q.
sufficient condition for P.
necessary condition for P.
X necessary condition for Q.
In the conditional statement "P �¨ Q," we can break it down to two parts: "P" and "Q."
A sufficient condition for an event or statement is something that, if it is true or happens, guarantees that the event or statement will also be true.
On the other hand, a necessary condition is something that must be true or happen in order for the event or statement to be true.
In our case, "Q" is the necessary condition for "P." This means that if "Q" is not true or does not happen, then "P" will not be true or happen either. In other words, if "Q" does not occur, then "P" cannot occur.