Nate's Notes
Collection of notes for various classes I've taken.
Week 2 - Symbolic Logic
Logical Symbols
- $\sim$ not (also $\lnot$)
- $\land$ and
- $\lor$ or
- $\equiv$ equivalent
- $\not\equiv$ not equivalent
Truth Table
| P | ~P |
|---|---|
| T | F |
| F | T |
de Morgan’s Laws
- $\lnot(P\land Q) \equiv \lnot P\lor \lnot Q$
- $\lnot(P\lor Q) \equiv \lnot P\land \lnot Q$
Tautology
- A tautology is a statement that is always true. E.g. $P\lor \lnot P$
Contradiction
- A tautology is a statement that is always false. E.g. $P\land \lnot P$
Conditional Statements
$P \leadsto Q$ “if P then Q”
Truth Table
| P | Q | $P\leadsto Q$ |
|---|---|---|
| T | T | T |
| T | F | F |
| F | T | T |
| F | F | T |
Negation
Notice this statement is only false when hypothesis is true and conclusion is false. This is vacuously true, or true by default.
E.g.
| P | q | $P \land \lnot Q$ | $P\land \lnot Q \leadsto \lnot P$ |
|---|---|---|---|
| T | T | F | T |
| T | F | T | F |
| F | T | F | T |
| F | F | F | T |
Representation of if-then ($\leadsto$) in terms of $\lor$
Important Claim: $p\leadsto q \equiv \lnot p \lor q$
Negation of $p \leadsto q$, i.e. $\lnot(p \leadsto q)$
\[\lnot(p \leadsto q) \equiv \lnot(\lnot p \lor q)\\ [\lnot(A \lor B)\equiv \lnot A \land \lnot B]\\ \equiv \lnot(\lnot p) \land \lnot q\\ \equiv p \land \lnot q\]i.e. $\lnot(p\leadsto q)$ is $p\land \lnot q$.
Negation
For example:
Negate: if x>2 then x>
\[\lnot(x>2 \leadsto x>1)\\ \equiv x>2 \land x \leq 1\]
Or:
Negate” if n is prime then n>1
\[\lnot(\textrm{n is prime }\leadsto n>1)\equiv \textrm{n is prime } \land n \leq 1\]
Or:
Negate: if n is prime then n > 1 and n has no divisors other than 1 and itself
\[\lnot(\textrm{statement above}) \equiv \textrm{n is prime and n }\leq 1\textrm{ or n has a divisor other than itself and 1}\]
Also: $A\land (B\lor C) \equiv (A \land B)\lor(A\land C)$
Contrapositive
Given $p\leadsto q$, $\lnot q \leadsto \lnot p$
E.g. “if it snows tonight, then I will be unhappy”
Contrapositive: If I will be happy, then it will not snow tonight.
Converse
Given $p\leadsto q$, $q\leadsto p$
E.g. “if it snows tonight, then I will be unhappy”
Converse: If I will be unhappy, then it will snow tonight.
Inverse
Given $p\leadsto q$, $\lnot p \leadsto \lnot q$
E.g. “if it snows tonight, then I will be unhappy”
Inverse: If it does not snow tonight, then I will be happy.
Examples
- If $\det A \neq 0$ then $A$ is invertible
- Contrapositive: If $A$ is not invertible, then $\det A = 0$
- Converse: If $A$ is invertible then $\det A \neq 0$
- Inverse: If $\det A=0$ then $A$ is not invertible
Two Important Claims
- Note that $p\leadsto q\equiv\lnot q \leadsto\lnot p$
- Additionally, $q\leadsto p\equiv\lnot p\leadsto\lnot q$.
Conditions
- Necessary Condition: $p$ is necessary for $q$ means $\lnot p\leadsto\lnot q \equiv q\leadsto p$
- Sufficient Condition: $p$ is sufficient for $q$ means $p\leadsto q$
- Biconditional: $p \iff q$ reads “$p$ if and only if $q$” means $(p\leadsto q)\land(q\leadsto p)$ or $p \iff q$.
P is necessary and sufficient for q means $p\iff q$.
Modus Ponens
- $p\leadsto q$
- $p$
- $\therefore q$
Truth table for Modus Ponens
| $p$ | $q$ | $p\leadsto q$ (premise 1) | $p$ (premise 2) | $q$ (conclusion) |
|---|---|---|---|---|
| T | T | T | T | T |
| T | F | F | T | F |
| F | T | T | F | T |
| F | F | T | F | F |
the first row in the truth table is called the critical row.
Invalid (converse error): $p\leadsto q$, $q$, $\therefore p$. This is a fallacious syllogism.
Modus Tollens
- $p\leadsto q$
- $\lnot q$
- $\therefore\lnot p$
Modus tollens is the contrapositive of modus ponens.
E.g.:
- If I’m tall then I wear socks
- I don’t wear socks
- Therefore I am not tall
Fallacy (Inverse Error):
- $p\leadsto q$
- $\lnot p$
- $\therefore\lnot q$
E.g.:
- If $n>2$ then n is positive
- $n\leq 2$
- $\therefore n$ is not positive
Generalization
- $p$
- $\therefore p\lor q$
OR
- $q$
- $\therefore p\lor q$
Such that the truth trable is
| $p$ | $q$ | $p\lor q$ |
|---|---|---|
| T | T | T |
| F | T | T |
| T | F | T |
| F | F | F |
Specialization
- $p\land q$
- $\therefore p$
OR
- $p\land q$
- $\therefore q$
Worded as “we have P and Q therefore we have P;” or, vice versa.
Elimination
- $p\lor q$
- $\lnot q$
- $\therefore p$
OR
- $p\lor q$
- $\lnot p$
- $\therefore q$
E.g.
- $p\lor q\lor r$
- $\lnot q\land\lnot r$
- $\therefore p$
Transitivity
- $p\leadsto q$
- $q\leadsto r$
- $\therefore p\leadsto r$
E.g.
- If I am home on Saturday I will be bored
- If I’m bored on Saturday then I will eat pizza
- Therefore if I’m home on Saturday then I will eat pizza
Division into Cases
- $p\lor q$
- $p\leadsto r$
- $q\leadsto r$
- $\therefore r$
Contradiction Rule
- $\lnot p\leadsto c$
- $\therefore p$
where $c$ is a contradiction (always-false).
| $p$ | $\lnot p\leadsto c$ | $p$ (conclusion) |
|---|---|---|
| T | F | |
| F | T |
(not p -> c is false when the statement p is true, because a conditional is false when the premise is true and the conclusion is false)
E.g. Claim: $\pi+1$ is irrational Proof:
- Suppose by way of contradiction (BWOC) that $\pi + 1$ is rational
- Since $\pi +1$ is rational, we can find two integers $m$ and $n$ such that $\pi +1=\frac{m}{n}$.
- Then it’s the case that $\pi=\frac{m}{n}-1=\frac{m-n}{n}$ so it’s the case that $\pi$ is rational
- Hence, by this contradiction is proven that $\pi +1$ is irrational