 To solve this question, we should use the concept of the terms contrapositive and converse. Converse of the statement if p then q is if q then p and contrapositive of the statement if p then q is if negation of q then negation of p. Therefore, first we should write the two statements p and q which correspond to the given statement and then apply the verb rule to do the required. Let's now begin with the solution. We will first write this statement in the form of if p then q. So the given statement can be written as it is a sunny day then I go to a beach. Now here p statement is it is a sunny day and q statement is I go to a beach. So now we will write the converse of the statement. Now the converse of this statement will be if q then p. So go to a beach and it is a sunny day. Like the contrapositive of the given statement the statement if p then q is if negation of q then negation of p. Now here q statement is I go to a beach so negation of q will be I do not go to a beach and negation of p will be it is not a sunny day. So the conrapositive of the given statement is if I do not go to a beach then it is not a sunny day. These are our required statements. This completes the session. Bye and take care.