. Mapping TeX symbols to HTML Entities
Some TeX symbols have no HTML entity and are mapped to ascii words
\TeX
.As_is \TeX Τ\Ε<\/sub>\Χ
\alpha
.As_is \alpha α
\nexists
.As_is \nexists no
\neg
.As_is \neg not
\neq
.As_is \neq ≠
\beta
.As_is \beta β
\gamma
.As_is \gamma γ
\delta
.As_is \delta δ
\epsilon
.As_is \epsilon ε
\zeta
.As_is \zeta ζ
\eta
.As_is \eta η
\vartheta
.As_is \vartheta ϑ
\theta
.As_is \theta θ
\iota
.As_is \iota ι
\kappa
.As_is \kappa κ
\lambda
.As_is \lambda λ
\mu
.As_is \mu μ
\nu
.As_is \nu ν
\xi
.As_is \xi ξ
\varpi
.As_is \varpi ϖ
\pi
.As_is \pi π
\varsigma
.As_is \varsigma ς
\sigma
.As_is \sigma σ
\tau
.As_is \tau τ
\upsilon
.As_is \upsilon υ
\phi
.As_is \phi φ
\chi
.As_is \chi χ
\omega
.As_is \omega ω
\Alpha
.As_is \Alpha Α
\Beta
.As_is \Beta Β
\Gamma
.As_is \Gamma Γ
\Delta
.As_is \Delta Δ
\Epsilon
.As_is \Epsilon Ε
\Zeta
.As_is \Zeta Ζ
\Theta
.As_is \Theta Θ
\Iota
.As_is \Iota Ι
\Kappa
.As_is \Kappa Κ
\Lambda
.As_is \Lambda Λ
\Mu
.As_is \Mu Μ
\Nu
.As_is \Nu Ν
\Xi
.As_is \Xi Ξ
\Pi
.As_is \Pi Π
\Sigma
.As_is \Sigma Σ
\Tau
.As_is \Tau Τ
\Upsilon
.As_is \Upsilon Υ
\Phi
.As_is \Phi Φ
\Chi
.As_is \Chi Χ
\Psi
.As_is \Psi Ψ
\Omega
.As_is \Omega Ω
\bullet
.As_is \bullet •
\prime
.As_is \prime ′
\Im
.As_is \Im ℑ
\Re
.As_is \Re ℜ
\aleph
.As_is \aleph ℵ
\leftarrow
.As_is \leftarrow ←
\uparrow
.As_is \uparrow ↑
\rightarrow
.As_is \rightarrow →
\downarrow
.As_is \downarrow ↓
\leftrightarrow
.As_is \leftrightarrow ↔
\Leftarrow
.As_is \Leftarrow ⇐
\Uparrow
.As_is \Uparrow ⇑
\Rightarrow
.As_is \Rightarrow ⇒
\Downarrow
.As_is \Downarrow ⇓
\Leftrightarrow
.As_is \Leftrightarrow ⇔
\diamondsuit
.As_is \diamondsuit ◊
\spadesuit
.As_is \spadesuit ♠
\clubsuit
.As_is \clubsuit ♣
\emptyset
.As_is \emptyset ∅
\propto
.As_is \propto ∝
\infty
.As_is \infty ∞
\angle
.As_is \angle ∠
\nabla
.As_is \nabla ∇
\wedge
.As_is \wedge ∧
\equiv
.As_is \equiv ≡
\partial
.As_is \partial ∂
\forall
.As_is \forall ∀
\exists
.As_is \exists ∃
\approx
.As_is \approx ≈
\langle
.As_is \langle ⟨
\rangle
.As_is \rangle ⟩
\subseteq
.As_is \subseteq ⊆
\supseteq
.As_is \supseteq ⊇
\subset
.As_is \subset ⊂
\supset
.As_is \supset ⊃
\land
.As_is \land ∧
\oplus
.As_is \oplus ⊕
\otimes
.As_is \otimes ⊗
\prod
.As_is \prod ∏
\surd
.As_is \surd √
\cong
.As_is \cong ≅
\gets
.As_is \gets ←
\sum
.As_is \sum ∑
\bot
.As_is \bot ⊥
\lor
.As_is \lor ∨
\vee
.As_is \vee ∨
\cap
.As_is \cap ∩
\cup
.As_is \cup ∪
\int
.As_is \int ∫
\leq
.As_is \leq ≤
\geq
.As_is \geq ≥
\ge
.As_is \ge ≥
\le
.As_is \le ≤
\nexists
.As_is \nexists not &exists;
\neg
.As_is \neg &neg;
\neq
.As_is \neq ≠
\ne
.As_is \ne ≠
\wp
.As_is \wp ℘
\to
.As_is \to →
\in
.As_is \in ∈
\ni
.As_is \ni ∋
\o
.As_is \o ο