codomain

Codomain vs X - What's the difference?

As a noun codomain

is (mathematics) the target space into which a function maps elements of its domain it always contains the range of the function, but can be larger than the range if the function is not surjective.

As a letter x is

the twenty-fourth letter of the.

As a symbol x is

voiceless velar fricative.

Codomain - What does it mean?

codomain | |

is likely misspelled.

has no English definition.

As a noun codomain

is the target space into which a function maps elements of its domain. It always contains the range of the function, but can be larger than the range if the function is not surjective.

Wikidiffcom vs Codomain - What's the difference?

wikidiffcom | codomain |

As a noun codomain is

(mathematics) the target space into which a function maps elements of its domain it always contains the range of the function, but can be larger than the range if the function is not surjective.

Rangeimage vs Codomain - What's the difference?

rangeimage | codomain |

As a noun codomain is

(mathematics) the target space into which a function maps elements of its domain it always contains the range of the function, but can be larger than the range if the function is not surjective.

As nouns the difference between taxonomy and codomain

is that taxonomy is the science or the technique used to make a classification while codomain is (mathematics) the target space into which a function maps elements of its domain it always contains the range of the function, but can be larger than the range if the function is not surjective.

Codomain vs Subobject - What's the difference?

codomain | subobject |

As nouns the difference between codomain and subobject

is that codomain is (mathematics) the target space into which a function maps elements of its domain it always contains the range of the function, but can be larger than the range if the function is not surjective while subobject is (category theory) given an object b'', a ''subobject'' of it is an equivalence class of objects $a_i$ which relate to ''b'' through monomorphisms $m_i : a_i \rightarrow b$ (if a pair of monomorphisms with codomain ''b'' , which is a monomorphism) of another set.

Codomain vs Dianalytic - What's the difference?

codomain | dianalytic |

In mathematics|lang=en terms the difference between codomain and dianalytic
is that codomain is (mathematics) the target space into which a function maps elements of its domain it always contains the range of the function, but can be larger than the range if the function is not surjective while dianalytic is (mathematics) describing a function that is analytic or antianalytic with regards to both the domain and codomain.

As a noun codomain
is (mathematics) the target space into which a function maps elements of its domain it always contains the range of the function, but can be larger than the range if the function is not surjective.

As an adjective dianalytic is
(mathematics) describing a function that is analytic or antianalytic with regards to both the domain and codomain.

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codomain

As a noun codomain

As a letter x is

As a symbol x is

is likely misspelled.

As a noun codomain

As a noun codomain is

As a noun codomain is

As nouns the difference between taxonomy and codomain

As nouns the difference between codomain and subobject

In mathematics|lang=en terms the difference between codomain and dianalytic

As a noun codomain

As an adjective dianalytic is

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