Definitions from Wiktionary (inverse function)
▸ noun: (mathematics) For a given function f, another function, denoted f⁻¹, that reverses the mapping action of f; (formally) given a function f:X→Y, a function g:Y→X such that, ∀x∈X,f(x)=y⟹g(y)=x.
▸ Also see inverse_function
Inverse trigonometric functions,
Inverse hyperbolic functions,
inverse trigonometrical functions,
Integral of inverse functions,
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▸ Words similar to inverse functions
▸ Usage examples for inverse functions
▸ Idioms related to inverse functions
▸ Wikipedia articles (New!)
▸ Words that often appear near inverse functions
▸ Rhymes of inverse functions
▸ Invented words related to inverse functions
▸ noun: (mathematics) For a given function f, another function, denoted f⁻¹, that reverses the mapping action of f; (formally) given a function f:X→Y, a function g:Y→X such that, ∀x∈X,f(x)=y⟹g(y)=x.
▸ Also see inverse_function
Phrases:
▸ Words similar to inverse functions
▸ Usage examples for inverse functions
▸ Idioms related to inverse functions
▸ Wikipedia articles (New!)
▸ Words that often appear near inverse functions
▸ Rhymes of inverse functions
▸ Invented words related to inverse functions