Natural Deduction is a method for deriving the conclusion of valid arguments expressed in the symbolism of propositional logic.
|
|
- Percival Trevor Cain
- 5 years ago
- Views:
Transcription
1 Natural Deduction is a method for deriving the conclusion of valid arguments expressed in the symbolism of propositional logic. The method consists of using sets of Rules of Inference (valid argument forms) to derive either a conclusion or a series of intermediate conclusions that link the premises of an argument with the stated conclusion.
2 The First Four Rules of Inference: Modus Ponens (MP): p q p q
3 Modus Tollens (MT): p q ~q ~p
4 Pure Hypothetical Syllogism (HS): p q q r p r
5 Disjunctive Syllogism (DS): p v q ~p q
6 Common strategies for constructing a proof involving the first four rules: Always begin by attempting to find the conclusion in the premises. If the conclusion is not present in its entirely in the premises, look at the main operator of the conclusion. This will provide a clue as to how the conclusion should be derived. If the conclusion contains a letter that appears in the consequent of a conditional statement in the premises, consider obtaining that letter via modus ponens.
7 If the conclusion contains a negated letter and that letter appears in the antecedent of a conditional statement in the premises, consider obtaining the negated letter via modus tollens. If the conclusion is a conditional statement, consider obtaining it via pure hypothetical syllogism. If the conclusion contains a letter that appears in a disjunctive statement in the premises, consider obtaining that letter via disjunctive syllogism.
8 Four Additional Rules of Inference: Constructive Dilemma (CD): (p q) (r s) p v r q v s
9 Simplification (Simp): p q p
10 Conjunction (Conj): p q p q
11 Addition (Add): p p v q
12 Common Misapplications Common strategies involving the additional rules of inference: If the conclusion contains a letter that appears in a conjunctive statement in the premises, consider obtaining that letter via simplification. If the conclusion is a conjunctive statement, consider obtaining it via conjunction by first obtaining the individual conjuncts.
13 If the conclusion is a disjunctive statement, consider obtaining it via constructive dilemma or addition. If the conclusion contains a letter not found in the premises, addition must be used to introduce that letter. Conjunction can be used to set up constructive dilemma.
14 The ten rules of replacement are expressed in terms of pairs of logically equivalent statement forms, either of which can replace each other in a proof sequence. A double colon (::) is used to designate logical equivalence. Underlying the use of rules of replacement are Axioms of Replacement, which asserts that within the context of a proof, logically equivalent expressions may replace each other. By Axioms of Replacement, the rules of replacement may be applied to an entire line or to any part of a line.
15 The First Five Rules of Replacement: DeMorgan s Rule (DM) ~(p q) :: (~p v ~q) ~(p v q) :: (~p ~q) Commutativity (Com) (p v q) :: (q v p) (p q) :: (q p)
16 Associativity (Assoc): [p v (q v r)] :: [(p v q) v r)] [p (q r)] :: [(p q) r)] Distribution (Dist): [p (q v r)] :: [(p q) v (p r)] [p v (q r)] :: [(p v q) (p v r)] Double Negation (DN): p :: ~~p
17 Common strategies involving the first five rules of replacement: Conjunction can be used to set up DeMorgan s rule. Constructive dilemma can be used to set up DeMorgan s rule. Addition can be used to set up DeMorgan s rule. Distribution can be used in two ways to set up disjunctive syllogism. Distribution can be used in two ways to set up simplification. If inspection of the premises does not reveal how the conclusion should be derived, consider using the rules of replacement to deconstruct the conclusion.
18 The Remaining Five Rules of Replacement: Transposition (Trans): (p q) :: (~q ~p) Material Implication (Impl): (p q) :: (~q p) Material Equivalence (Equiv): (p q) :: [(p q) (q p)] (p q) :: [(p q) v (~q ~p)
19 Exportation (Exp): [(p q) r] :: [(p (q r)] Tautology (Taut): p :: (p v p) p :: (p p)
20 Common strategies involving the remaining five rules of replacement: Material implication can be used to set up hypothetical syllogism. Exportation can be used to set up modus ponens. Exportation can be used to set up modus tollens. Addition can be used to set up material implication. Transposition can be used to set up hypothetical syllogism. Transposition can be used to set up constructive dilemma.
21 Constructive dilemma can be used to set up tautology. Material implication can be used to set up tautology. Material implication can be used to set up distribution.
22 Conditional Proof is a method for deriving a conditional statement (either the conclusion or some intermediate line) that offers the usual advantage of being both shorter and simpler than the direct method. For example: a (b c) ( b v d) e / a e
23 To Construct a Conditional Proof: Begin by assuming the antecedent of the desired conditional statement on one line. Derive the consequent on the subsequent line. Discharge these lines in the desired conditional statement. Every conditional proof must be discharged, otherwise any conclusion can be derived from any premises.
24 Indirect Proof is a technique similar to conditional proof that can be used on any argument to derive either the conclusion or some intermediate line leading to the conclusion. To construct an indirect proof: Begin by assuming the negation of the statement to be obtained. Use this assumption to derive a contradiction. Conclude that the original statement is false. As in conditional proofs, every indirect proof must be discharged, otherwise any conclusion can be derived from any premises.
25 Indirect and conditional proofs can be combined to derive either a line in a proof sequence or the conclusion of a proof.
26 Both conditional and indirect proof can be used to establish the truth of a logical truth, or tautology. You can treat tautologies as if they were the conclusions of arguments having no premises. This is suggested by the fact that any argument having a tautology for its conclusion is valid regardless of its premises.
Today s Lecture 2/25/10. Truth Tables Continued Introduction to Proofs (the implicational rules of inference)
Today s Lecture 2/25/10 Truth Tables Continued Introduction to Proofs (the implicational rules of inference) Announcements Homework: -- Ex 7.3 pg. 320 Part B (2-20 Even). --Read chapter 8.1 pgs. 345-361.
More information2. The Logic of Compound Statements Summary. Aaron Tan August 2017
2. The Logic of Compound Statements Summary Aaron Tan 21 25 August 2017 1 2. The Logic of Compound Statements 2.1 Logical Form and Logical Equivalence Statements; Compound Statements; Statement Form (Propositional
More information(ÀB Ä (A Â C)) (A Ä ÀC) Á B. This is our sample argument. Formal Proofs
(ÀB Ä (A Â C)) (A Ä ÀC) Á B This is our sample argument. Formal Proofs From now on, formal proofs will be our main way to test arguments. We ll begin with easier proofs. Our initial strategy for constructing
More informationSample Problems for all sections of CMSC250, Midterm 1 Fall 2014
Sample Problems for all sections of CMSC250, Midterm 1 Fall 2014 1. Translate each of the following English sentences into formal statements using the logical operators (,,,,, and ). You may also use mathematical
More informationPROPOSITIONAL CALCULUS
PROPOSITIONAL CALCULUS A proposition is a complete declarative sentence that is either TRUE (truth value T or 1) or FALSE (truth value F or 0), but not both. These are not propositions! Connectives and
More informationPacket #1: Logic & Proofs. Applied Discrete Mathematics
Packet #1: Logic & Proofs Applied Discrete Mathematics Table of Contents Course Objectives Page 2 Propositional Calculus Information Pages 3-13 Course Objectives At the conclusion of this course, you should
More informationPHI Propositional Logic Lecture 2. Truth Tables
PHI 103 - Propositional Logic Lecture 2 ruth ables ruth ables Part 1 - ruth unctions for Logical Operators ruth unction - the truth-value of any compound proposition determined solely by the truth-value
More informationSection 1.1 Propositions
Set Theory & Logic Section 1.1 Propositions Fall, 2009 Section 1.1 Propositions In Chapter 1, our main goals are to prove sentences about numbers, equations or functions and to write the proofs. Definition.
More informationSection 1.2: Propositional Logic
Section 1.2: Propositional Logic January 17, 2017 Abstract Now we re going to use the tools of formal logic to reach logical conclusions ( prove theorems ) based on wffs formed by some given statements.
More informationMACM 101 Discrete Mathematics I. Exercises on Propositional Logic. Due: Tuesday, September 29th (at the beginning of the class)
MACM 101 Discrete Mathematics I Exercises on Propositional Logic. Due: Tuesday, September 29th (at the beginning of the class) SOLUTIONS 1. Construct a truth table for the following compound proposition:
More informationLecture 2. Logic Compound Statements Conditional Statements Valid & Invalid Arguments Digital Logic Circuits. Reading (Epp s textbook)
Lecture 2 Logic Compound Statements Conditional Statements Valid & Invalid Arguments Digital Logic Circuits Reading (Epp s textbook) 2.1-2.4 1 Logic Logic is a system based on statements. A statement (or
More informationCOMP 182 Algorithmic Thinking. Proofs. Luay Nakhleh Computer Science Rice University
COMP 182 Algorithmic Thinking Proofs Luay Nakhleh Computer Science Rice University 1 Reading Material Chapter 1, Section 3, 6, 7, 8 Propositional Equivalences The compound propositions p and q are called
More informationPropositional Logic. Spring Propositional Logic Spring / 32
Propositional Logic Spring 2016 Propositional Logic Spring 2016 1 / 32 Introduction Learning Outcomes for this Presentation Learning Outcomes... At the conclusion of this session, we will Define the elements
More information2.2: Logical Equivalence: The Laws of Logic
Example (2.7) For primitive statement p and q, construct a truth table for each of the following compound statements. a) p q b) p q Here we see that the corresponding truth tables for two statement p q
More information10/5/2012. Logic? What is logic? Propositional Logic. Propositional Logic (Rosen, Chapter ) Logic is a truth-preserving system of inference
Logic? Propositional Logic (Rosen, Chapter 1.1 1.3) TOPICS Propositional Logic Truth Tables Implication Logical Proofs 10/1/12 CS160 Fall Semester 2012 2 What is logic? Logic is a truth-preserving system
More informationDiscrete Structures of Computer Science Propositional Logic III Rules of Inference
Discrete Structures of Computer Science Propositional Logic III Rules of Inference Gazihan Alankuş (Based on original slides by Brahim Hnich) July 30, 2012 1 Previous Lecture 2 Summary of Laws of Logic
More informationChapter 1, Logic and Proofs (3) 1.6. Rules of Inference
CSI 2350, Discrete Structures Chapter 1, Logic and Proofs (3) Young-Rae Cho Associate Professor Department of Computer Science Baylor University 1.6. Rules of Inference Basic Terminology Axiom: a statement
More informationIntroduction Logic Inference. Discrete Mathematics Andrei Bulatov
Introduction Logic Inference Discrete Mathematics Andrei Bulatov Discrete Mathematics - Logic Inference 6-2 Previous Lecture Laws of logic Expressions for implication, biconditional, exclusive or Valid
More informationFormal Logic 2. This lecture: Standard Procedure of Inferencing Normal forms Standard Deductive Proofs in Logic using Inference Rules
ormal Logic 2 HW2 Due Now & ickup HW3 handout! Last lecture ropositional Logic ropositions, Statements, Connectives, ruth table, ormula W roperties: autology, Contradiction, Validity, Satisfiability Logical
More informationProofs. Example of an axiom in this system: Given two distinct points, there is exactly one line that contains them.
Proofs A mathematical system consists of axioms, definitions and undefined terms. An axiom is assumed true. Definitions are used to create new concepts in terms of existing ones. Undefined terms are only
More informationDERIVATIONS AND TRUTH TABLES
DERIVATIONS AND TRUTH TABLES Tomoya Sato Department of Philosophy University of California, San Diego Phil120: Symbolic Logic Summer 2014 TOMOYA SATO LECTURE 3: DERIVATIONS AND TRUTH TABLES 1 / 65 WHAT
More information1.1 Statements and Compound Statements
Chapter 1 Propositional Logic 1.1 Statements and Compound Statements A statement or proposition is an assertion which is either true or false, though you may not know which. That is, a statement is something
More informationProof Tactics, Strategies and Derived Rules. CS 270 Math Foundations of CS Jeremy Johnson
Proof Tactics, Strategies and Derived Rules CS 270 Math Foundations of CS Jeremy Johnson Outline 1. Review Rules 2. Positive subformulas and extraction 3. Proof tactics Extraction, Conversion, Inversion,
More informationLogical Form 5 Famous Valid Forms. Today s Lecture 1/26/10
Logical Form 5 Famous Valid Forms Today s Lecture 1/26/10 Announcements Homework: --Read Chapter 7 pp. 277-298 (doing the problems in parts A, B, and C pp. 298-300 are recommended but not required at this
More informationCHAPTER 1 - LOGIC OF COMPOUND STATEMENTS
CHAPTER 1 - LOGIC OF COMPOUND STATEMENTS 1.1 - Logical Form and Logical Equivalence Definition. A statement or proposition is a sentence that is either true or false, but not both. ex. 1 + 2 = 3 IS a statement
More informationCSCI.6962/4962 Software Verification Fundamental Proof Methods in Computer Science (Arkoudas and Musser) Chapter p. 1/33
CSCI.6962/4962 Software Verification Fundamental Proof Methods in Computer Science (Arkoudas and Musser) Chapter 4.1-4.8 p. 1/33 CSCI.6962/4962 Software Verification Fundamental Proof Methods in Computer
More informationManual of Logical Style
Manual of Logical Style Dr. Holmes January 9, 2015 Contents 1 Introduction 2 2 Conjunction 3 2.1 Proving a conjunction...................... 3 2.2 Using a conjunction........................ 3 3 Implication
More informationPropositional Logic. Jason Filippou UMCP. ason Filippou UMCP) Propositional Logic / 38
Propositional Logic Jason Filippou CMSC250 @ UMCP 05-31-2016 ason Filippou (CMSC250 @ UMCP) Propositional Logic 05-31-2016 1 / 38 Outline 1 Syntax 2 Semantics Truth Tables Simplifying expressions 3 Inference
More informationLogic. Definition [1] A logic is a formal language that comes with rules for deducing the truth of one proposition from the truth of another.
Math 0413 Appendix A.0 Logic Definition [1] A logic is a formal language that comes with rules for deducing the truth of one proposition from the truth of another. This type of logic is called propositional.
More informationCSC Discrete Math I, Spring Propositional Logic
CSC 125 - Discrete Math I, Spring 2017 Propositional Logic Propositions A proposition is a declarative sentence that is either true or false Propositional Variables A propositional variable (p, q, r, s,...)
More informationCHAPTER 10: SYMBOLIC TRAILS AND FORMAL PROOFS OF VALIDITY, PART 2
Essential Logic Ronald C. Pine CHAPTER 10: SYMBOLIC TRAILS AND FORMAL PROOFS OF VALIDITY, PART 2 Introduction In the previous chapter there were many frustrating signs that something was wrong with our
More informationManual of Logical Style (fresh version 2018)
Manual of Logical Style (fresh version 2018) Randall Holmes 9/5/2018 1 Introduction This is a fresh version of a document I have been working on with my classes at various levels for years. The idea that
More informationReadings: Conjecture. Theorem. Rosen Section 1.5
Readings: Conjecture Theorem Lemma Lemma Step 1 Step 2 Step 3 : Step n-1 Step n a rule of inference an axiom a rule of inference Rosen Section 1.5 Provide justification of the steps used to show that a
More information3 The Semantics of the Propositional Calculus
3 The Semantics of the Propositional Calculus 1. Interpretations Formulas of the propositional calculus express statement forms. In chapter two, we gave informal descriptions of the meanings of the logical
More informationSection 1.2 Propositional Equivalences. A tautology is a proposition which is always true. A contradiction is a proposition which is always false.
Section 1.2 Propositional Equivalences A tautology is a proposition which is always true. Classic Example: P P A contradiction is a proposition which is always false. Classic Example: P P A contingency
More informationThe Logic of Compound Statements cont.
The Logic of Compound Statements cont. CSE 215, Computer Science 1, Fall 2011 Stony Brook University http://www.cs.stonybrook.edu/~cse215 Refresh from last time: Logical Equivalences Commutativity of :
More information3.0. OBJECTIVES 3.1.INTRODUCTION
1 UNIT 3 INDIRECT PROOF Contents 1.0 Objectives 3.1.Introduction 3.2.The Meaning of Indirect Proof 3.3.Application of Indirect Proof 3.4.Examples 3.5.Exercises on Indirect Proof 3.6 Indirect Proof and
More informationReview. Propositions, propositional operators, truth tables. Logical Equivalences. Tautologies & contradictions
Review Propositions, propositional operators, truth tables Logical Equivalences. Tautologies & contradictions Some common logical equivalences Predicates & quantifiers Some logical equivalences involving
More informationReview The Conditional Logical symbols Argument forms. Logic 5: Material Implication and Argument Forms Jan. 28, 2014
Logic 5: Material Implication and Argument Forms Jan. 28, 2014 Overview I Review The Conditional Conditional statements Material implication Logical symbols Argument forms Disjunctive syllogism Disjunctive
More informationPacket #2: Set Theory & Predicate Calculus. Applied Discrete Mathematics
CSC 224/226 Notes Packet #2: Set Theory & Predicate Calculus Barnes Packet #2: Set Theory & Predicate Calculus Applied Discrete Mathematics Table of Contents Full Adder Information Page 1 Predicate Calculus
More informationRules Build Arguments Rules Building Arguments
Section 1.6 1 Section Summary Valid Arguments Inference Rules for Propositional Logic Using Rules of Inference to Build Arguments Rules of Inference for Quantified Statements Building Arguments for Quantified
More information15414/614 Optional Lecture 1: Propositional Logic
15414/614 Optional Lecture 1: Propositional Logic Qinsi Wang Logic is the study of information encoded in the form of logical sentences. We use the language of Logic to state observations, to define concepts,
More informationn logical not (negation) n logical or (disjunction) n logical and (conjunction) n logical exclusive or n logical implication (conditional)
Discrete Math Review Discrete Math Review (Rosen, Chapter 1.1 1.6) TOPICS Propositional Logic Logical Operators Truth Tables Implication Logical Equivalence Inference Rules What you should know about propositional
More informationPropositional Logic: Syntax
4 Propositional Logic: Syntax Reading: Metalogic Part II, 22-26 Contents 4.1 The System PS: Syntax....................... 49 4.1.1 Axioms and Rules of Inference................ 49 4.1.2 Definitions.................................
More informationTHE LOGIC OF COMPOUND STATEMENTS
THE LOGIC OF COMPOUND STATEMENTS All dogs have four legs. All tables have four legs. Therefore, all dogs are tables LOGIC Logic is a science of the necessary laws of thought, without which no employment
More informationWhat is Logic? Introduction to Logic. Simple Statements. Which one is statement?
What is Logic? Introduction to Logic Peter Lo Logic is the study of reasoning It is specifically concerned with whether reasoning is correct Logic is also known as Propositional Calculus CS218 Peter Lo
More informationAnalyzing Arguments with Truth Tables
Analyzing Arguments with Truth Tables MATH 100 Survey of Mathematical Ideas J. Robert Buchanan Department of Mathematics Fall 2014 Introduction Euler diagrams are useful for checking the validity of simple
More informationA Quick Lesson on Negation
A Quick Lesson on Negation Several of the argument forms we have looked at (modus tollens and disjunctive syllogism, for valid forms; denying the antecedent for invalid) involve a type of statement which
More informationThe proposition p is called the hypothesis or antecedent. The proposition q is called the conclusion or consequence.
The Conditional (IMPLIES) Operator The conditional operation is written p q. The proposition p is called the hypothesis or antecedent. The proposition q is called the conclusion or consequence. The Conditional
More informationFor a horseshoe statement, having the matching p (left side) gives you the q (right side) by itself. It does NOT work with matching q s.
7.1 The start of Proofs From now on the arguments we are working with are all VALID. There are 18 Rules of Inference (see the last 2 pages in Course Packet, or front of txt book). Each of these rules is
More informationA. Propositional Logic
CmSc 175 Discrete Mathematics A. Propositional Logic 1. Statements (Propositions ): Statements are sentences that claim certain things. Can be either true or false, but not both. Propositional logic deals
More informationPropositional Logic. Argument Forms. Ioan Despi. University of New England. July 19, 2013
Propositional Logic Argument Forms Ioan Despi despi@turing.une.edu.au University of New England July 19, 2013 Outline Ioan Despi Discrete Mathematics 2 of 1 Order of Precedence Ioan Despi Discrete Mathematics
More informationCompound Propositions
Discrete Structures Compound Propositions Producing new propositions from existing propositions. Logical Operators or Connectives 1. Not 2. And 3. Or 4. Exclusive or 5. Implication 6. Biconditional Truth
More informationInference in Propositional Logic
Inference in Propositional Logic Deepak Kumar November 2017 Propositional Logic A language for symbolic reasoning Proposition a statement that is either True or False. E.g. Bryn Mawr College is located
More informationNatural Deduction for Propositional Logic
Natural Deduction for Propositional Logic Bow-Yaw Wang Institute of Information Science Academia Sinica, Taiwan September 10, 2018 Bow-Yaw Wang (Academia Sinica) Natural Deduction for Propositional Logic
More informationLogic Overview, I. and T T T T F F F T F F F F
Logic Overview, I DEFINITIONS A statement (proposition) is a declarative sentence that can be assigned a truth value T or F, but not both. Statements are denoted by letters p, q, r, s,... The 5 basic logical
More informationi.e. The conclusion to the following argument says If you had an A, then you d have a ~(B v Z).
7.5 Conditional Proof (CP): Conditional Proof is a different way to do proofs. Using CP will always get you a horseshoe statement, so the best time to use it is when your conclusion is either a horseshoe
More informationWhat is the decimal (base 10) representation of the binary number ? Show your work and place your final answer in the box.
Question 1. [10 marks] Part (a) [2 marks] What is the decimal (base 10) representation of the binary number 110101? Show your work and place your final answer in the box. 2 0 + 2 2 + 2 4 + 2 5 = 1 + 4
More informationChapter 1 Elementary Logic
2017-2018 Chapter 1 Elementary Logic The study of logic is the study of the principles and methods used in distinguishing valid arguments from those that are not valid. The aim of this chapter is to help
More informationAdvanced Topics in LP and FP
Lecture 1: Prolog and Summary of this lecture 1 Introduction to Prolog 2 3 Truth value evaluation 4 Prolog Logic programming language Introduction to Prolog Introduced in the 1970s Program = collection
More informationIn this chapter, we specify a deductive apparatus for PL.
Handout 5 PL Derivations In this chapter, we specify a deductive apparatus for PL Definition deductive apparatus A deductive apparatus for PL is a set of rules of inference (or derivation rules) that determine
More informationProof Worksheet 2, Math 187 Fall 2017 (with solutions)
Proof Worksheet 2, Math 187 Fall 2017 (with solutions) Dr. Holmes October 17, 2017 The instructions are the same as on the first worksheet, except you can use all the rules in the strategies handout. We
More informationProving Things. Why prove things? Proof by Substitution, within Logic. Rules of Inference: applying Logic. Using Assumptions.
1 Proving Things Why prove things? Proof by Substitution, within Logic Rules of Inference: applying Logic Using Assumptions Proof Strategies 2 Why Proofs? Knowledge is power. Where do we get it? direct
More informationWarm-Up Problem. Write a Resolution Proof for. Res 1/32
Warm-Up Problem Write a Resolution Proof for Res 1/32 A second Rule Sometimes throughout we need to also make simplifications: You can do this in line without explicitly mentioning it (just pretend you
More informationsoftware design & management Gachon University Chulyun Kim
Gachon University Chulyun Kim 2 Outline Propositional Logic Propositional Equivalences Predicates and Quantifiers Nested Quantifiers Rules of Inference Introduction to Proofs 3 1.1 Propositional Logic
More informationPHIL012. SYMBOLIC LOGIC PROPOSITIONAL LOGIC DERIVATIONS
HIL012 SYMBOLIC LOGIC ROOSITIONL LOGIC DERIVTIONS When we argue, what we want are (i) clearly specifiable rules, (ii) that apply to any particular subject matter, and (iii) that legitimate transitions
More informationLanguage of Propositional Logic
Logic A logic has: 1. An alphabet that contains all the symbols of the language of the logic. 2. A syntax giving the rules that define the well formed expressions of the language of the logic (often called
More informationPropositional natural deduction
Propositional natural deduction COMP2600 / COMP6260 Dirk Pattinson Australian National University Semester 2, 2016 Major proof techniques 1 / 25 Three major styles of proof in logic and mathematics Model
More informationComputational Intelligence Lecture 13:Fuzzy Logic
Computational Intelligence Lecture 13:Fuzzy Logic Farzaneh Abdollahi Department of Electrical Engineering Amirkabir University of Technology Fall 2011 arzaneh Abdollahi Computational Intelligence Lecture
More informationChapter 1: The Logic of Compound Statements. January 7, 2008
Chapter 1: The Logic of Compound Statements January 7, 2008 Outline 1 1.1 Logical Form and Logical Equivalence 2 1.2 Conditional Statements 3 1.3 Valid and Invalid Arguments Central notion of deductive
More informationPart Two: The Basic Components of the SOFL Specification Language
Part Two: The Basic Components of the SOFL Specification Language SOFL logic Module Condition Data Flow Diagrams Process specification Function definition and specification Process decomposition Other
More informationLogic, Sets, and Proofs
Logic, Sets, and Proofs David A. Cox and Catherine C. McGeoch Amherst College 1 Logic Logical Operators. A logical statement is a mathematical statement that can be assigned a value either true or false.
More informationKP/Worksheets: Propositional Logic, Boolean Algebra and Computer Hardware Page 1 of 8
KP/Worksheets: Propositional Logic, Boolean Algebra and Computer Hardware Page 1 of 8 Q1. What is a Proposition? Q2. What are Simple and Compound Propositions? Q3. What is a Connective? Q4. What are Sentential
More informationArtificial Intelligence: Knowledge Representation and Reasoning Week 2 Assessment 1 - Answers
Artificial Intelligence: Knowledge Representation and Reasoning Week 2 Assessment 1 - Answers 1. When is an inference rule {a1, a2,.., an} c sound? (b) a. When ((a1 a2 an) c) is a tautology b. When ((a1
More information10/13/15. Proofs: what and why. Proposi<onal Logic Proofs. 1 st Proof Method: Truth Table. A sequence of logical arguments such that:
Proofs: what and why Rules of Inference (Rosen, Section 1.6) TOPICS Logic Proofs ² via Truth Tables ² via Algebraic Simplification ² via Inference Rules A sequence of logical arguments such that: each
More informationSteinhardt School of Culture, Education, and Human Development Department of Teaching and Learning. Mathematical Proof and Proving (MPP)
Steinhardt School of Culture, Education, and Human Development Department of Teaching and Learning Terminology, Notations, Definitions, & Principles: Mathematical Proof and Proving (MPP) 1. A statement
More information4 Derivations in the Propositional Calculus
4 Derivations in the Propositional Calculus 1. Arguments Expressed in the Propositional Calculus We have seen that we can symbolize a wide variety of statement forms using formulas of the propositional
More information1 The Foundation: Logic and Proofs
1 The Foundation: Logic and Proofs 1.1 Propositional Logic Propositions( ) a declarative sentence that is either true or false, but not both nor neither letters denoting propostions p, q, r, s, T: true
More informationCS 512, Spring 2016, Handout 02 Natural Deduction, and Examples of Natural Deduction, in Propositional Logic
CS 512, Spring 2016, Handout 02 Natural Deduction, and Examples of Natural Deduction, in Propositional Logic Assaf Kfoury January 19, 2017 Assaf Kfoury, CS 512, Spring 2017, Handout 02 page 1 of 41 from
More informationPropositional Logic. Chrysippos (3 rd Head of Stoic Academy). Main early logician. AKA Modern Logic AKA Symbolic Logic. AKA Boolean Logic.
Propositional Logic. Modern Logic. Boolean Logic. AKA Modern Logic AKA Symbolic Logic. AKA Boolean Logic. Chrysippos (3 rd Head of Stoic Academy). Main early logician Stoic Philosophers Zeno ff301bc. Taught
More informationFour Basic Logical Connectives & Symbolization
PHI2LOG Topic 2 LOGIC Norva Y S Lo Produced by Norva Y S Lo Four Basic Logical Connectives & 1 Summary Under Topic 2, we will learn to: 1. Recognize four basic Logical Connectives and their correspinding
More informationPropositional Logic Arguments (5A) Young W. Lim 10/11/16
Propositional Logic (5A) Young W. Lim Copyright (c) 2016 Young W. Lim. Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version
More informationBoolean Algebra and Proof. Notes. Proving Propositions. Propositional Equivalences. Notes. Notes. Notes. Notes. March 5, 2012
March 5, 2012 Webwork Homework. The handout on Logic is Chapter 4 from Mary Attenborough s book Mathematics for Electrical Engineering and Computing. Proving Propositions We combine basic propositions
More informationMath 3336: Discrete Mathematics Practice Problems for Exam I
Math 3336: Discrete Mathematics Practice Problems for Exam I The upcoming exam on Tuesday, February 26, will cover the material in Chapter 1 and Chapter 2*. You will be provided with a sheet containing
More informationDiscrete Structures & Algorithms. Propositional Logic EECE 320 // UBC
Discrete Structures & Algorithms Propositional Logic EECE 320 // UBC 1 Review of last lecture Pancake sorting A problem with many applications Bracketing (bounding a function) Proving bounds for pancake
More informationIt rains now. (true) The followings are not propositions.
Chapter 8 Fuzzy Logic Formal language is a language in which the syntax is precisely given and thus is different from informal language like English and French. The study of the formal languages is the
More informationPropositional Logic. Logical Expressions. Logic Minimization. CNF and DNF. Algebraic Laws for Logical Expressions CSC 173
Propositional Logic CSC 17 Propositional logic mathematical model (or algebra) for reasoning about the truth of logical expressions (propositions) Logical expressions propositional variables or logical
More informationPropositional Logic Arguments (5A) Young W. Lim 11/30/16
Propositional Logic (5A) Young W. Lim Copyright (c) 2016 Young W. Lim. Permission is granted to copy, distribute and/or modify this document under the terms of the GNU Free Documentation License, Version
More informationPropositional Logic Basics Propositional Equivalences Normal forms Boolean functions and digital circuits. Propositional Logic.
Propositional Logic Winter 2012 Propositional Logic: Section 1.1 Proposition A proposition is a declarative sentence that is either true or false. Which ones of the following sentences are propositions?
More informationCSE 20: Discrete Mathematics
Spring 2018 Summary Last time: Today: Logical connectives: not, and, or, implies Using Turth Tables to define logical connectives Logical equivalences, tautologies Some applications Proofs in propositional
More information02 Propositional Logic
SE 2F03 Fall 2005 02 Propositional Logic Instructor: W. M. Farmer Revised: 25 September 2005 1 What is Propositional Logic? Propositional logic is the study of the truth or falsehood of propositions or
More informationOutline. Rules of Inferences Discrete Mathematics I MATH/COSC 1056E. Example: Existence of Superman. Outline
Outline s Discrete Mathematics I MATH/COSC 1056E Julien Dompierre Department of Mathematics and Computer Science Laurentian University Sudbury, August 6, 2008 Using to Build Arguments and Quantifiers Outline
More informationKS MATEMATIKA DISKRIT (DISCRETE MATHEMATICS ) RULES OF INFERENCE. Discrete Math Team
KS091201 MATEMATIKA DISKRIT (DISCRETE MATHEMATICS ) RULES OF INFERENCE Discrete Math Team 2 -- KS091201 MD W-04 Outline Valid Arguments Modus Ponens Modus Tollens Addition and Simplification More Rules
More information2. Use quantifiers to express the associative law for multiplication of real numbers.
1. Define statement function of one variable. When it will become a statement? Statement function is an expression containing symbols and an individual variable. It becomes a statement when the variable
More informationProofs. Introduction II. Notes. Notes. Notes. Slides by Christopher M. Bourke Instructor: Berthe Y. Choueiry. Fall 2007
Proofs Slides by Christopher M. Bourke Instructor: Berthe Y. Choueiry Fall 2007 Computer Science & Engineering 235 Introduction to Discrete Mathematics Sections 1.5, 1.6, and 1.7 of Rosen cse235@cse.unl.edu
More informationEECS 1028 M: Discrete Mathematics for Engineers
EECS 1028 M: Discrete Mathematics for Engineers Suprakash Datta Office: LAS 3043 Course page: http://www.eecs.yorku.ca/course/1028 Also on Moodle S. Datta (York Univ.) EECS 1028 W 18 1 / 12 Using the laws
More informationFirst-Degree Entailment
March 5, 2013 Relevance Logics Relevance logics are non-classical logics that try to avoid the paradoxes of material and strict implication: p (q p) p (p q) (p q) (q r) (p p) q p (q q) p (q q) Counterintuitive?
More informationUNIVERSITY OF CALICUT SCHOOL OF DISTANCE EDUCATION B Sc (MATHEMATICS) I Semester Core Course. FOUNDATIONS OF MATHEMATICS (MODULE I & ii) QUESTION BANK
UNIVERSITY OF CALICUT SCHOOL OF DISTANCE EDUCATION B Sc (MATHEMATICS) (2011 Admission Onwards) I Semester Core Course FOUNDATIONS OF MATHEMATICS (MODULE I & ii) QUESTION BANK 1) If A and B are two sets
More informationCOMP Intro to Logic for Computer Scientists. Lecture 6
COMP 1002 Intro to Logic for Computer Scientists Lecture 6 B 5 2 J Treasure hunt In the back of an old cupboard you discover a note signed by a pirate famous for his bizarre sense of humour and love of
More information1 The Foundation: Logic and Proofs
1 The Foundation: Logic and Proofs 1.1 Propositional Logic Propositions( 명제 ) a declarative sentence that is either true or false, but not both nor neither letters denoting propositions p, q, r, s, T:
More information