Most of the challenges with math come from the complexities of the symbols. It’s effectively a different language, with its own logical rules that define all of its symbols.
Each of the symbols denote a concept, and learning math creates a cumulative codex that draws from most of the previous symbols to communicate an idea.
Mathematical state
±
- Indicates the number is either positive or negative
- Can often indicate a range of values
- e.g., 5 ± 2 is an unknown value somewhere between 3 and 7
∓
- Indicates the inverse sign of ±, where it’s + when ± is – and – when ± is +
|□|
- The absolute value of a number (i.e., how far it is from 0), which always gives a positive number
- e.g., |-5| = 5
- Can also refer to the number of elements in a set (i.e., “cardinality”)
- e.g., |5,4,2| = 3
- Can also refer to the length of a line segment along with d(A,B)
- e.g., |AB|
Comparison between values
=
- Equality, where two things are effectively the same quantities
- e.g., 2 + 2 = 4
≠
- Inequality, where two things are not the same quantities
- e.g., 2 + 2 ≠ 5
≈
- Approximately equal, where two things are almost the same quantities
- e.g., 22 / 3 ≈ 7
≡ (aka triple bar)
- Identity, an indication of “if an only if”
- e.g., “Hat ≡ Hat”, but not “Hat ≡ hat”
≅
- Isomorphism, where two things are effectively equal, but in different ways
<
- Less than, represents that it’s certainly unequal (strict inequality) and the former is less than the latter
- e.g., 2 < 3
>
- Greater than, represents that it’s certainly unequal and the former is more than the latter
- e.g., 3 > 2
≤
- Less than or equal to, sometimes uses ≦
- can also be much less than (≪), which isn’t always clearly defined
≥
- Greater than or equal to
- can also be much greater than (≫), which isn’t always clearly defined
~
- A general-use symbol that can mean “approximately equal” or “same order of magnitude”
≺ and ≻
- Indicates an order or preorder (in order theory)
□:□
- A ratio between two numbers
%
- A per cent (□/100) amount relative to another value
‰
- A per mille (□/1000) amount relative to another value
Basic arithmetic
+
- Addition, which is combining two numbers together
- e.g., 1 + 2 = 3
–
- Subtraction, which is removing the following number from the preceding
- e.g., 3 – 1 = 2
x, · or *
- Multiplication, which is adding a number over and over a certain number of times
- e.g., 2 x 4 = 8
/ or ÷
- Division, which is indicating how many times the latter number fits into the former number
- e.g., 7 / 2 = 3.5
:
- Indicates a ratio of quantities, which is a relationship of relative size
- e.g., 2:3
Advanced arithmetic
xy (aka superscript)
- Exponents, which are multiple iterations of multiplication
- e.g., 23 = 2 x 2 x 2 = 8
- Can also be represented by ^ symbol (e.g., 2^3) when superscript isn’t easily available
√ (aka radical symbol)
- Square root, which is the value that will become the source number when multiplied together
- e.g., √9 = 3
- Similar to exponents, superscript can also indicate cube roots (∛), fourth roots (∜), and so on
Set theory
∅
- An empty set
- Can also be represented by { }
#
- Number sign, with 3 possible indications:
- With #S as the number of elements, may alternatively represent as |S|
- With n# as the sum of prime numbers up to n (i.e., primorial)
- With M#N, the topological connected sum of two manifolds or knots
∈
- Set membership
- Can read as “is in”, “belongs to”, or “is a member of”
∉
- Not a member of a set
- Reads as “is not in” (e.g., x ∉ S means ¬(x ∈ S)
⊂
⊆
⊊
⊃, ⊇, ⊋
∪
∩
∖
⊖ or △
∁
×
⊔
∐
Logic
¬
∧
∨
⊻
Ɐ
∃
∃!
⇒
⇔
⊤
⊥
Number theory (aka blackboard bold)
N
Z
Zp
Q
Qp
R
C
H
Fq
O
Calculus
□’
◌̇
◌̈
d □/d □
∂ □/∂ □
? □/? □
▭
→
↦
○
∂
∫
∮
∬, ∯
∇ or ∇→
∇2 or ∇⋅∇
Δ
∂ or ∂μ
◻or ◻2
Linear and multilinear algebra
∑
∏
⊕
⊗
□⊤
□⊥
Advanced group theory
⋉
⋊
≀
Infinite numbers
∞
?
ℵ
ℶ
ω
Brackets: parentheses
(□)
□(□, …, □)
(□, □)
(□, □, □)
(□, …, □)
(□, □, …)
(matrix)
(□/□)
Brackets: square brackets
- [□]
- □[□]
- [□, □]
- [□ : □]
- [□, □, □]
- [matrix]
Brackets: braces
{□}
{□, …, □}
{□ : □}
{□ | □}
{ (single brace)
Brackets: other
|□:□|
||□||
⌊□⌋
⌈□⌉
⌊□⌉
]□, □[
(□, □] and ]□, □]
[□, □) and [□, □[
⟨□⟩
⟨□, □⟩ and ⟨□ | □⟩
⟨□| and |□⟩
Non-mathematical symbols frequently used for reasoning or communication
■ , □
☡
∴
∵
∋
∝
!
*
|
∤
∥
∦
⊙