Table of mathematical symbols Guide, Meaning , Facts, Information and Description
In mathematics, a set of symbols is frequently used in mathematical expressions. As mathematicians are familiar with these symbols, they are not explained each time they are used. So, for mathematical novices, the following table lists many common symbols together with their name, pronunciation and related field of mathematics. Additionally, the second line contains an informal definition, and the third line gives a short example.Note: If some of the symbols don't display properly for you, then your browser does not completely implement the HTML 4 character entities, or you have to install additional fonts. You can check your browser here.
| Symbol | Name | reads as | Category
|
|---|---|---|---|
+ | addition | plus | arithmetic |
| 4 + 6 = 10 means if 4 is added to 6, the sum, or result, is 10. | |||
| 43 + 65 = 108; 2 + 7 = 9
| |||
− | subtraction | minus | arithmetic |
| 9 − 4 = 5 means if 4 is subtracted from 9, the result will be 5. | |||
| 87 − 36 = 51
| |||
| negative sign | negative | arithmetic | |
| −3 means the number 3 less than 0. | |||
| −(− 5) = 5
| |||
| set theoretic complement | minus; without | set theory | |
| A − B means the set that contains all those elements of A that are not in B | |||
| {1,2,3,4} − {3,4,5,6} = {1,2}
| |||
× | multiplication | times | arithmetic |
| 3 × 4 = 12 means if 4 is multiplied by 3, the result will be 12. | |||
| 7 × 8 = 56
| |||
| cartesian product | the cartesian product of … and …; the direct product of … and … | set theory | |
| X×Y means the set of all ordered pairs with the first element of each pair selected from X and the second element selected from Y. | |||
| {1,2} × {3,4} = {(1,3),(1,4),(2,3),(2,4)}
| |||
÷
| division | divided by | arithmetic |
| 6 ÷ 3 = 2 or 6/3 = 2 means if 6 is divided by 3, the result is 2. | |||
| 2 ÷ 4 = .5; 12/4 = 3
| |||
⇒
| material implication | implies; if .. then | propositional logic |
| 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 ⇒, or it may have the meaning for functionss mentioned further down | |||
| x = 2 ⇒ x2 = 4 is true, but x2 = 4 ⇒ x = 2 is in general false (since x could be −2)
| |||
⇔
| material equivalence | if and only if; iff | propositional logic |
| A ⇔ B means A is true if B is true and A is false if B is false | |||
| x + 5 = y + 2 ⇔ x + 3 = y
| |||
∧ | logical conjunction or meet in a lattice | and | propositional logic, lattice theory |
| 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
| |||
∨ | logical disjunction or join in a lattice | or | propositional logic, lattice theory |
| 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
| |||
⊻ | exclusive or | xor | propositional logic, boolean algebra |
| is true when either A or B are true, but not when both are true
| |||
¬ | logical negation | not | propositional logic |
| 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 ∧ B) ⇔ (¬A) ∨ (¬B); x ∉ S ⇔ ¬(x ∈ S)
| |||
∀ | universal quantification | for all; for any; for each | predicate logic |
| ∀ x: P(x) means P(x) is true for all x | |||
| ∀ n ∈ N: n2 ≥ n
| |||
∃ | existential quantification | there exists | predicate logic |
| ∃ x: P(x) means there is at least one x such that P(x) is true | |||
| ∃ n ∈ N: n + 5 = 2n
| |||
= | equality | equals | everywhere |
| x = y means x and y are different names for precisely the same thing | |||
| 1 + 2 = 6 − 3
| |||
≠ | Inequation | does not equal | everywhere |
| x ≠ y States that x and y do not represent the same value.
| |||
:=
| definition | is defined as | everywhere |
| 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)
| |||
{ , } | set brackets | the set of ... | set theory |
| {a,b,c} means the set consisting of a, b, and c | |||
| N = {0,1,2,...}
| |||
{ : }
| set builder notation | the set of ... such that ... | set theory |
| {x : P(x)} means the set of all x for which P(x) is true. {x | P(x)} is the same as {x : P(x)}. | |||
| {n ∈ N : n2 < 20} = {0,1,2,3,4}
| |||
∅
| empty set | empty set | set theory |
| {} means the set with no elements; ∅ is the same thing | |||
| {n ∈ N : 1 < n2 < 4} = {}
| |||
∈
| set membership | in; is in; is an element of; is a member of; belongs to | set theory |
| a ∈ S means a is an element of the set S; a ∉ S means a is not an element of S | |||
| (1/2)−1 ∈ N; 2−1 ∉ N
| |||
⊆
| subset | is a subset of | set theory |
| A ⊆ B means every element of A is also element of B A ⊂ B means A ⊆ B but A ≠ B | |||
| A ∩ B ⊆ A; Q ⊂ R
| |||
∪ | set theoretic union | the union of ... and ...; union | set theory |
| A ∪ B means the set that contains all the elements from A and also all those from B, but no others | |||
| A ⊆ B ⇔ A ∪ B = B
| |||
∩ | set theoretic intersection | intersected with; intersect | set theory |
| A ∩ B means the set that contains all those elements that A and B have in common | |||
| {x ∈ R : x2 = 1} ∩ N = {1}
| |||
\\ | set theoretic complement | minus; without | set theory |
| A \\ B means the set that contains all those elements of A that are not in B | |||
| {1,2,3,4} \\ {3,4,5,6} = {1,2}
| |||
( ) | function application | of | set theory |
| f(x) means the value of the function f at the element x | |||
| If f(x) := x2, then f(3) = 32 = 9 | |||
| precedence grouping | everywhere | ||
| perform the operations inside the parentheses first | |||
| (8/4)/2 = 2/2 = 1, but 8/(4/2) = 8/2 = 4
| |||
f:X→Y | function arrow | from ... to | functionss |
| f: X → Y means the function f maps the set X into the set Y | |||
| Consider the function f: Z → N defined by f(x) = x2
| |||
Nℕ | natural numbers | N | numbers |
| N means {0,1,2,3,...}, but see the article on natural numbers for a different convention. | |||
| {|a| : a ∈ Z} = N
| |||
Zℤ | integers | Z | numbers |
| Z means {...,−3,−2,−1,0,1,2,3,...} | |||
| {a : |a| ∈ N} = Z
| |||
Qℚ | rational numbers | Q | numbers |
| Q means {p/q : p,q ∈ Z, q ≠ 0} | |||
| 3.14 ∈ Q; π ∉ Q
| |||
Rℝ | real numbers | R | numbers |
| R means {limn→∞ an : ∀ n ∈ N: an ∈ Q, the limit exists} | |||
| π ∈ R; √(−1) ∉ R
| |||
Cℂ | complex numbers | C | numbers |
| C means {a + bi : a,b ∈ R} | |||
| i = √(−1) ∈ C
| |||
<
| strict inequality | is less than, is greater than | partial orders |
| x < y means x is less than y; x > y means x is greater than y | |||
| x < y ⇔ y > x
| |||
≤
| inequality | is less than or equal to, is greater than or equal to | partial orders |
| x ≤ y means x is less than or equal to y; x ≥ y means x is greater than or equal to y | |||
| x ≥ 1 ⇒ x2 ≥ x
| |||
√ | square root | the principal square root of; square root | real numbers |
| √x means the positive number whose square is x | |||
| √(x2) = |x|
| |||
∞ | infinity | infinity | numbers |
| ∞ is an element of the extended number line that is greater than all real numbers; it often occurs in limits | |||
| limx→0 1/|x| = ∞
| |||
π | pi | pi | Euclidean geometry |
| π means the ratio of a circle's circumference to its diameter | |||
| A = πr² is the area of a circle with radius r
| |||
! | factorial | factorial | combinatorics |
| n! is the product 1×2×...×n | |||
| 4! = 24
| |||
| | | absolute value | absolute value of | numbers |
| |x| means the distance in the real line (or the complex plane) between x and zero | |||
| |a + bi| = √(a2 + b2)
| |||
|| || | norm | norm of; length of | functional analysis |
| ||x|| is the norm of the element x of a normed vector space | |||
| ||x+y|| ≤ ||x|| + ||y||
| |||
∑ | summation | sum over ... from ... to ... of | arithmetic |
| ∑k=1n ak means a1 + a2 + ... + an | |||
| ∑k=14 k2 = 12 + 22 + 32 + 42 = 1 + 4 + 9 + 16 = 30
| |||
∏ | product | product over ... from ... to ... of | arithmetic |
| ∏k=1n ak means a1a2···an | |||
| ∏k=14 (k + 2) = (1 + 2)(2 + 2)(3 + 2)(4 + 2) = 3 × 4 × 5 × 6 = 360
| |||
| cartesian product | the cartesian product of; the direct product of | set theory | |
| ∏i=0nYi means the set of all (n+1)-tuples (y0,...,yn). | |||
| ∏n=13R = Rn
| |||
∫ | integration | integral from ... to ... of ... with respect to | calculus |
| ∫ab f(x) dx means the signed area between the x-axis and the graph of the function f between x = a and x = b | |||
| ∫0b x2 dx = b3/3; ∫x2 dx = x3/3
| |||
f ' | derivative | derivative of f; f prime | calculus |
| f '(x) is the derivative of the function f at the point x, i.e., the slope of the tangent there | |||
| If f(x) = x2, then f '(x) = 2x and f ''(x) = 2
| |||
∇ | gradient | del, nabla, gradient of | calculus |
| ∇f (x1, …, xn) is the vector of partial derivatives (df / dx1, …, df / dxn) | |||
| If f (x,y,z) = 3xy + z² then ∇f = (3y, 3x, 2z) A transparent image for text is: Image:Del.gif ().
| |||
∂ | partial | partial derivative of | calculus |
| With f (x1, …, xn), ∂f/∂xi is the derivative of f with respect to xi, with all other variables kept constant. | |||
| If f(x,y) = x2y, then ∂f/∂x = 2xy
| |||
⊥ | perpendicular | is perpendicular to | orthogonality |
| x ⊥ y means x is perpendicular to y; or more generally x is orthogonal to y. | |||
| .
| |||
| bottom element | the bottom element | lattice theory | |
| x = ⊥ means x is the smallest element. | |||
| .
| |||
⊧ | entailment | entails | propositional logic, predicate logic |
| means the sentence a entails the sentence b. Formal definition: if and only if, in every model in which a is true, b is also true.
| |||
⊢ | inference | infers or is derived from | propositional logic, predicate logic |
| x y means y is derived from x. | |||
| .
| |||
| . | . | ||
| insert more (suggestions are the inequality symbols); some symbols are used in examples before they are defined | |||
| . | |||
If some of these symbols are used in a Wikipedia article that is intended for beginners, it may be a good idea to include a statement like the following, (below the definition of the subject), in order to reach a broader audience:
- ''This article uses [[table of mathematical symbols|mathematical symbols]].''
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