#Standard - text symbol - copyright © pounds ££ - foreign - ae æ AE Æ oe œ OE Œ aa å AA Å l ł L Ł o ø O Ø ss ß - symbol - dots … cdots ⋯ vdots ⋮⫶ ddots ⋱ ell ℓ imath 𝚤 jmath 𝚥 wp ℘ Re ℜ Im ℑ aleph ℵ partial ∂ infty ∞ prime ′ emptyset ∅ backslash \ forall ∀ exists ∃ smallint ∫ triangle △∆ surd √ |,Vert ‖ top ⟙ bot ⟘ P ¶ S § dagger † ddagger ‡ flat ♭ natural ♮ sharp ♯ clubsuit ☘ diamondsuit ♢ heartsuit ♡ spadesuit ♠ lnot,neg ¬¬ nabla ∇ Box □ Diamond ◇ - operator - pm ± mp ∓ times × div ÷ ast ∗* star ⋆ circ ◦ bullet ∙• cdot · cap ∩ cup ∪ sqcap ⊓ sqcup ⊔ lor,vee ∨ land,wedge ∧ setminus ∖ wr ≀ diamond ⋄ amalg ⨿ bigtriangleup △ bigtriangledown ▽ triangleleft ◁ triangleright ▷ lhd ⊲ rhd ⊳ unlhd ⊴ unrhd ⊵ uplus ⊎ oplus ⊕ ominus ⊖ otimes ⊗ oslash ⊘ odot ⊙ bigcirc ○ sum ∑ bigcap ⋂ bigodot ⨀ prod ∏ bigcup ⋃ bigotimes ⨂ coprod ∐ bigsqcup ⨆ bigoplus ⨁ int ∫ bigvee ⋁ biguplus ⨄ oint ∮ bigwedge ⋀ - relational operator - le,leq ≤ ge,geq ≥ prec ≺ succ ≻ preceq ⪯ succeq ⪰ ll ≪ gg ≫ subset ⊂ supset ⊃ subseteq ⊆ supseteq ⊇ sqsubseteq ⊑ sqsupseteq ⊒ in ∈ ni ∋ vdash ⊢ dashv ⊣ equiv ≡ models ⊧ sim ∼ simeq ≃ perp ⟂ propto ∝ mid ∣| asymp ≍ parallel ∥ approx ≈ bowtie ⋈ cong ≅ Join ⨝ notin ∉ ne,neq ≠ smile ⌣ doteq ≐ frown ⌢ lfloor ⌊ rfloor ⌋ lceil ⌈ rceil ⌉ langle 〈 rangle 〉 - arrow - leftarrow ← longleftarrow ⟵ Leftarrow ⇐ Longleftarrow ⟸ to,rightarrow → longrightarrow ⟶ Rightarrow ⇒ Longrightarrow ⟹ leftrightarrow ↔ longleftrightarrow ⟷ Leftrightarrow ⇔ Longleftrightarrow ⟺ mapsto ↦ longmapsto ⟼ hookleftarrow ↩ hookrightarrow ↪ leftharpoonup ↼ rightharpoonup ⇀ leftharpoondown ↽ rightharpoondown ⇁ leadsto ↝ uparrow ↑ Uparrow ⇑ downarrow ↓ Downarrow ⇓ updownarrow ↕ Updownarrow ⇕ nearrow ↗ searrow ↘ swarrow ↙ nwarrow ↖ - Greek - alpha α beta β gamma γ delta δ epsilon ϵ zeta ζ eta η theta θ iota ι kappa κ lambda λ mu μ nu ν xi ξ pi π rho ρ sigma σ tau τ upsilon υ phi ϕ chi χ psi ψ omega ω Gamma Γ Delta Δ Theta Θ Lambda Λ Xi Ξ Pi Π Sigma Σ Upsilon Υ Phi Φ Psi Ψ Omega Ω varepsilon ε vartheta ϑ varpi ϖ varrho ϱ varsigma ς varphi φ