Logic symbols: Difference between revisions
Jump to navigation
Jump to search
imported>John R. Brews (subpages template) |
Pat Palmer (talk | contribs) (WP Attribution) |
||
(2 intermediate revisions by 2 users not shown) | |||
Line 91: | Line 91: | ||
|align=center|xor | |align=center|xor | ||
|- | |- | ||
|align=right|[[propositional logic]], [[ | |align=right|[[propositional logic]], [[Boolean algebra]] | ||
|- | |- | ||
| rowspan=3 bgcolor=#d0f0d0 align=center|<br/><div style="font-size:200%;">⊤<br/><br/>T<br/><br/>1</div> ||[[Tautology (logic)|Tautology]] | | rowspan=3 bgcolor=#d0f0d0 align=center|<br/><div style="font-size:200%;">⊤<br/><br/>T<br/><br/>1</div> ||[[Tautology (logic)|Tautology]] | ||
Line 102: | Line 102: | ||
|align=center|top | |align=center|top | ||
|- | |- | ||
|align=right|[[propositional logic]], [[ | |align=right|[[propositional logic]], [[Boolean algebra]] | ||
|- | |- | ||
| rowspan=3 bgcolor=#d0f0d0 align=center|<br/><div style="font-size:200%;">⊥<br/><br/>F<br/><br/>0</div> ||[[Contradiction]] | | rowspan=3 bgcolor=#d0f0d0 align=center|<br/><div style="font-size:200%;">⊥<br/><br/>F<br/><br/>0</div> ||[[Contradiction]] | ||
Line 113: | Line 113: | ||
|align=center|bottom | |align=center|bottom | ||
|- | |- | ||
|align=right|[[propositional logic]], [[ | |align=right|[[propositional logic]], [[Boolean algebra]] | ||
|- | |- | ||
| rowspan=3 bgcolor=#d0f0d0 align=center|<div style="font-size:200%;">∀</div> | | rowspan=3 bgcolor=#d0f0d0 align=center|<div style="font-size:200%;">∀</div> | ||
Line 187: | Line 187: | ||
|align=right|[[propositional logic]], [[first-order logic]] | |align=right|[[propositional logic]], [[first-order logic]] | ||
|} | |} | ||
== | |||
{{ | ==Attribution== | ||
{{WPAttribution}} | |||
==Footnotes== | |||
<small> | |||
<references> | |||
</references> | |||
</small> |
Latest revision as of 12:01, 28 August 2024
In logic, a basic set of logic symbols is used as a shorthand for logical constructions. As these symbols are often considered as familiar, they are not always explained. For convenience, the following table lists some common symbols together with their name, pronunciation and related field of mathematics. Additionally, the third column contains an informal definition, and the fourth column gives a short example.
Be aware that, outside of logic, different symbols have the same meaning, and the same symbol has, depending on the context, different meanings.
Note: This article contains logic symbols. Without proper rendering support, you may see question marks, boxes, or other symbols instead of logic symbols. |
Symbol
|
Name | Explanation | Examples | Unicode Value |
HTML Entity |
LaTeX symbol |
---|---|---|---|---|---|---|
Should be read as | ||||||
Category | ||||||
⇒
→ ⊃ |
material implication | A ⇒ B means if A is true then B is also true; if A is false then nothing is said about B. → may mean the same as ⇒ (the symbol may also indicate the domain and codomain of a function; see table of mathematical symbols). ⊃ may mean the same as ⇒ (the symbol may also mean superset). |
x = 2 ⇒ x2 = 4 is true, but x2 = 4 ⇒ x = 2 is in general false (since x could be −2). | U+21D2 U+2192 U+2283 |
⇒ → ⊃ |
\Rightarrow
\to \supset |
implies; if .. then | ||||||
propositional logic, Heyting algebra | ||||||
⇔
≡ ↔ |
material equivalence | A ⇔ B means A is true if and only if B is true. | x + 5 = y +2 ⇔ x + 3 = y | U+21D4 U+2261 U+2194 |
⇔ ≡ ↔ |
\Leftrightarrow
\equiv \leftrightarrow |
if and only if; iff | ||||||
propositional logic | ||||||
¬
˜ ! |
negation | The statement ¬A is true if and only if A is false. A slash placed through another operator is the same as "¬" placed in front. |
¬(¬A) ⇔ A x ≠ y ⇔ ¬(x = y) |
U+00AC U+02DC |
¬ ˜ ~ |
\lnot
\sim |
not | ||||||
propositional logic | ||||||
∧
• & |
logical conjunction | The statement A ∧ B is true if A and B are both true; else it is false. | n < 4 ∧ n >2 ⇔ n = 3 when n is a natural number. | U+2227 U+0026 |
∧ & |
\wedge or \land \&[1] |
and | ||||||
propositional logic | ||||||
∨
+ |
logical disjunction | The statement A ∨ B is true if A or B (or both) are true; if both are false, the statement is false. | n ≥ 4 ∨ n ≤ 2 ⇔ n ≠ 3 when n is a natural number. | U+2228 | ∨ | \lor |
or | ||||||
propositional logic | ||||||
⊕ ⊻ |
exclusive disjunction | The statement A ⊕ B is true when either A or B, but not both, are true. A ⊻ B means the same. | (¬A) ⊕ A is always true, A ⊕ A is always false. | U+2295 U+22BB |
⊕ | \oplus \veebar |
xor | ||||||
propositional logic, Boolean algebra | ||||||
⊤ T 1 |
Tautology | The statement ⊤ is unconditionally true. | A ⇒ ⊤ is always true. | U+22A4 | T | \top |
top | ||||||
propositional logic, Boolean algebra | ||||||
⊥ F 0 |
Contradiction | The statement ⊥ is unconditionally false. | ⊥ ⇒ A is always true. | U+22A5 | ⊥ F |
\bot |
bottom | ||||||
propositional logic, Boolean algebra | ||||||
∀
|
universal quantification | ∀ x: P(x) means P(x) is true for all x. | ∀ n ∈ N: n2 ≥ n. | U+2200 | ∀ | \forall |
for all; for any; for each | ||||||
predicate logic | ||||||
∃
|
existential quantification | ∃ x: P(x) means there is at least one x such that P(x) is true. | ∃ n ∈ N: n is even. | U+2203 | ∃ | \exists |
there exists | ||||||
first-order logic | ||||||
∃!
|
uniqueness quantification | ∃! x: P(x) means there is exactly one x such that P(x) is true. | ∃! n ∈ N: n + 5 = 2n. | U+2203 U+0021 | ∃ ! | \exists ! |
there exists exactly one | ||||||
first-order logic | ||||||
:=
≡ :⇔ |
definition | x := y or x ≡ y means x is defined to be another name for y (but note that ≡ can also mean other things, such as congruence). P :⇔ Q means P is defined to be logically equivalent to Q. |
cosh x := (1/2)(exp x + exp (−x)) A XOR B :⇔ (A ∨ B) ∧ ¬(A ∧ B) |
U+2254 (U+003A U+003D) U+2261 U+003A U+229C |
:= : ≡ ⇔ |
:=
\equiv \Leftrightarrow |
is defined as | ||||||
everywhere | ||||||
( )
|
precedence grouping | Perform the operations inside the parentheses first. | (8/4)/2 = 2/2 = 1, but 8/(4/2) = 8/2 = 4. | U+0028 U+0029 | ( ) | ( ) |
everywhere | ||||||
⊢
|
inference | x ⊢ y means y is derived from x. | A → B ⊢ ¬B → ¬A | U+22A2 | \vdash | |
infers or is derived from | ||||||
propositional logic, first-order logic |
Attribution
- Some content on this page may previously have appeared on Wikipedia.
Footnotes