In addition to using predicate logic, the limitations of sentential logic can also be overcome by using Venn diagrams to illustrate statements and arguments. Statements that include general words like "some" or "few" as well as absolute words like "every" and "all" – so-called categorical statements – lend themselves to being represented on paper as circles that may or may not overlap. Venn diagrams are especially helpful when dealing with logical arguments called syllogisms. Syllogisms are a special type of three-step argument with two premises and a conclusion, which involve quantifying terms. In this unit, you will learn the basic principles of Venn diagrams, how to use them to represent statements, and how to use them to evaluate arguments.
Completing this unit should take you approximately 6 hours.
Read these sections to learn and apply a visual method for determining the validity of categorical inferences: Venn diagrams. Note the four categorical forms and what they mean: universal affirmative, universal negative, particular affirmative, and particular negative. Get comfortable drawing Venn diagrams for categorical statements and shading in the area or drawing a star for the statements you are given.
Complete the exercises, checking your answers against the answer keys, translating the diagrams into statements, and using the Venn test of validity to determine the validity of the given categorical inferences.
Read the introduction and tutorial for an introduction to Venn diagrams. In Venn diagrams, circles represent sets or classes. These tutorials demonstrate how to use shading and overlapping to illustrate empty sets and relations of all, every, and nothing.
Working with Venn diagrams involving three circles is almost the same as working with two circles. The only difference is that there are now eight distinct regions, each with a specific logical meaning.
Complete these exercises and check your answers.
Read this section to learn about a potentially counter-intuitive relationship between universal and particular affirmatives – namely, one does not imply the other. This is because universal affirmatives do not contain an "existential commitment": a statement that there is anything in the category the universal affirmative references.
Complete the exercise, keeping in mind that universal affirmatives do not contain existential commitments. Check your validity answers against the key.
Complete these exercises relating to two-circle Venn diagrams. For each question, you must choose the sentence that best represents what is shown in the given diagram.
Read this section on Venn diagrams, which will help you use Venn diagrams to test the validity of whole categorical syllogisms rather than only categorical inferences. Read the section and identify the categories in every statement of the syllogisms as you go, making your own Venn diagrams to test the validity, as directed.
Complete the exercise, checking your validity answers against the key.
Read this tutorial on how to use Venn diagrams to evaluate arguments. You will be introduced to the concept of a syllogism, a special type of argument that cannot be evaluated in SL. Venn diagrams are ideal for evaluating this type of argument. Remember that a Venn diagram can only tell us if an argument is valid, not whether it is sound.
This page reviews how to set up Venn diagrams and the rules for using Venn diagrams in evaluating argument validity. It also introduces the notion of conditional validity and explains how to use Venn diagrams to evaluate the validity of categorical syllogisms.
Read this tutorial about the limitations of Venn diagrams. Although Venn diagrams are a powerful tool for representing some types of statements, there are many statements that they cannot handle.
Complete the exercises for this tutorial, then check your answers.
Complete these exercises to determine whether these arguments are valid or not. Draw out the Venn diagrams with pencil and paper.
Consider how you might adapt Venn diagrams to evaluate the validity of these arguments.
Share your thoughts on the discussion forum. Make sure to review and respond to other students' posts, as well.