(Solved):
Rephrase the argument, if necessary, so that the first premise has the form all \( S \) ar ...
Rephrase the argument, if necessary, so that the first premise has the form all \( S \) are P or no \( S \) are \( P \). Then draw a Venn diagram to determine whether the argument is valid. If possible, discuss the truth of the premises and whether the argument is sound. Premise: All tables have legs. Premise: Jacob has legs. Conclusion: Jacob is a table. If the stated conclusion is contained in the Venn diagram for the premises then the argument is valid. Is the argument valid or invalid? Valid Invalid A deductive argument is sound if and only if it is valid and its premises are all true. Is the argument sound? Yes No