Formal logic studies the abstract form of an argument rather than its content. This module studies the assumptions of classical logic, how to clarify claims in order to symbolize them, and how to use very basic truth tables and Venn Diagrams to model validity. Topics studied in this module include:
- Applying Formal Logic only to statements;
- Symbolizing Simple Positive and Negative Claims;
- The Laws of Non-Contradiction and Excluded Middle;
- The Rules of Reiteration and Double Negation;
- Introduction to Basic Truth Tables;
- Introduction to Basic Venn Diagrams;
- Making Sentences more Precise;
- Making Sentences more Concise;
- Distinguishing the Explicit, Literal Meaning of Logical Connectives from Implicatures;
- Testing the Validity of Rules of Inference;
- Making use of formal tools to reason more methodically;
- Making use of formal tools to more objectively approach controversial topics.
- 4.1 The Form of an Argument
- 4.2 True and False
- 4.3 Clarifying Claims
- 4.4 Modeling Validity
- 4.4.1 Validity and Truth Tables
- Step 1: Symbolize the Argument
- Step 2: One Row Per Truth Value Assignment
- Step 3: Calculate Truth Values for Premises
- Step 4: Calculate Truth Values for Conclusion
- Step 5: Highlight all Rows Where All Premises are True
- Step 6: Check if the Conclusion is true in all Highlighted Rows
- Invalid Arguments
- Extending Truth Tables
- 4.4.2 Validity and Venn Diagrams
- 4.4.3 Rules of Inference
- 4.4.4 Controversy
- Submodule 4.4 Quiz
- 4.4.1 Validity and Truth Tables