Symbol L a T e X Comment Symbol L a T e X Comment < {\displaystyle <\,} < is less than > {\displaystyle >\,} > is greater than ≮ {\displaystyle

less }

less is not less than ≯ {\displaystyle

gtr }

gtr is not greater than ≤ {\displaystyle \leq } \leq is less than or equal to ≥ {\displaystyle \geq } \geq is greater than or equal to ⩽ {\displaystyle \leqslant } \leqslant is less than or equal to ⩾ {\displaystyle \geqslant } \geqslant is greater than or equal to ≰ {\displaystyle

leq }

leq is neither less than nor equal to ≱ {\displaystyle

geq }

geq is neither greater than nor equal to ⪇ {\displaystyle

leqslant }

leqslant is neither less than nor equal to ⪈ {\displaystyle

geqslant }

geqslant is neither greater than nor equal to ≺ {\displaystyle \prec } \prec precedes ≻ {\displaystyle \succ } \succ succeeds ⊀ {\displaystyle

prec }

prec doesn't precede ⊁ {\displaystyle

succ }

succ doesn't succeed ⪯ {\displaystyle \preceq } \preceq precedes or equals ⪰ {\displaystyle \succeq } \succeq succeeds or equals ⋠ {\displaystyle

preceq }

preceq neither precedes nor equals ⋡ {\displaystyle

succeq }

succeq neither succeeds nor equals ≪ {\displaystyle \ll } \ll ≫ {\displaystyle \gg } \gg ⋘ {\displaystyle \lll } \lll ⋙ {\displaystyle \ggg } \ggg ⊂ {\displaystyle \subset } \subset is a proper subset of ⊃ {\displaystyle \supset } \supset is a proper superset of ⊄ {\displaystyle

ot \subset }

ot\subset is not a proper subset of ⊅ {\displaystyle

ot \supset }

ot\supset is not a proper superset of ⊆ {\displaystyle \subseteq } \subseteq is a subset of ⊇ {\displaystyle \supseteq } \supseteq is a superset of ⊈ {\displaystyle

subseteq }

subseteq is not a subset of ⊉ {\displaystyle

supseteq }

supseteq is not a superset of ⊏ {\displaystyle \sqsubset } \sqsubset ⊐ {\displaystyle \sqsupset } \sqsupset ⊑ {\displaystyle \sqsubseteq } \sqsubseteq ⊒ {\displaystyle \sqsupseteq } \sqsupseteq

Symbol L a T e X Comment = {\displaystyle =\,} = is equal to ≐ {\displaystyle \doteq } \doteq ≡ {\displaystyle \equiv } \equiv is equivalent to ≈ {\displaystyle \approx } \approx is approximately ≅ {\displaystyle \cong } \cong is congruent to ≃ {\displaystyle \simeq } \simeq is similar or equal to ∼ {\displaystyle \sim } \sim is similar to ∝ {\displaystyle \propto } \propto is proportional to ≠ {\displaystyle

eq } ≠ {\displaystyle

eq }

eq or

e is not equal to