Discrete Math - Midterm PDF

Summary

This document covers the fundamentals of propositional logic, including simple statements, compound statements, and logical connectives. It explains how to express these concepts in symbolic form and provides examples. It appears to be a set of lecture notes or a textbook.

Full Transcript

DISCREET MATHEMATICS r: "I will get wet." REVIEWER Now, we can construct some statements using these logical connectives:...

DISCREET MATHEMATICS r: "I will get wet." REVIEWER Now, we can construct some statements using these logical connectives: 1. Negation (NOT): PROPOSITIONAL LOGIC o ~p: "It is not raining." 2. Conjunction (AND): Aristotle - was the pioneer of logical reasoning. o p ∧ q: "It is raining, and I will bring an Propositional Logic is concerned with statements to umbrella." which the truth values, “true” and “false”, can be assigned. 3. Disjunction (OR): A proposition or statement is a declarative sentence that o p ∨ r: "It is raining, or I will get wet." can be classified as true or false, 4. Conditional (IF-THEN): We represent the statements by letters such as p, q and o p → q: "If it is raining, then I will bring r and we use the following symbols for and, or, and not. an umbrella." 5. Biconditional (IF AND ONLY IF): SIMPLE STATEMENTS AND COMPOUND STATEMENTS o p ↔ r: "I will get wet if and only if it is raining." Simple statement is a statement that conveys a single idea. COMPOUND STATEMENTS AND GROUPING SYMBOLS Ex: I will attend the meeting If a compound statement is written in symbolic form, then parentheses are used to indicate which simple statements are grouped together. Compound statement is a statement is a statement that conveys two or more ideas. Symbolic Form The parenthesis indicate that: p ∧ (q ∨ ~ r ) q and ~r are grouped together. Ex: I will attend the meeting or I will go to school (p ∧ q) ∨ r p and q are grouped together. (p ∧ ~q) → (r ∨ s) p and ~q are grouped together. r and s are also grouped George Boole used symbols such as p, q, r, and s to together represent simple statements and the symbols ∧,∨,∼,→ ,and ↔ to represent connectives. If a compound statement is written as an English Logic Connectives and Symbols sentence, then a comma is used to indicate which simple statements are grouped together. Statements on Conective SForm Type the same side of a comma are grouped together. not ∼p negation and p∧q conjuction English Sentence The comma indicates that: or p∨q disjunction p, and q or not r. q and ~r are grouped together If…then p→q conditional because they are both on the If and only if p↔q biconditional same side of the comma p and q, or r. p and q are grouped together because they are both on the Example: same side of the comma Let p, q, and r represent the following. p: "It is raining." Example: q: "I will bring an umbrella." Let p, q, and r represent the following. p: "It is cold outside." q: "I will wear a coat." F F F Example: r: "I will go for a walk." Consider the statement 2 ≤ 5 Now, let's construct some compound statements using grouping symbols. The statement's two component propositions are: Example Statement 1: 1. Proposition p : 2

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