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Related vs Rel - What's the difference?

related | rel |

In mathematics|lang=en terms the difference between related and rel

is that related is (mathematics) fulfilling a relation while rel is (mathematics) relative to.

As an adjective related

is standing in relation or connection.

As a verb related

is (relate).

As a preposition rel is

(mathematics) relative to.

related

English

Adjective

(en adjective)
  • Standing in relation or connection.
  • *{{quote-magazine, date=2013-06-22, volume=407, issue=8841, page=68, magazine=(The Economist)
    • , title= T time , passage=The ability to shift profits to low-tax countries by locating intellectual property in them, which is then licensed to related businesses in high-tax countries, is often assumed to be the preserve of high-tech companies.}}
  • Being a relative of.
  • Narrated; told.
  • (music) Same as the adjective relative.
  • (mathematics) Fulfilling a relation.
  • (in combination) Having a relationship with the thing named

    • Verb

    (head)
  • (relate)

    • See also

    * relation * relationship * interrelate * interrelated

    Anagrams

    * * * * *

    rel

    English

    Preposition

    (English prepositions)
  • (mathematics) Relative to.
  • * 1994 , N[ikita] Netsvetaev, "Diffeomorphism Criteria for Simply Connected Even-Dimensional Manifolds", in, Oleg Viro, editor, Topology of Manifolds and Varieties , Advances in Soviet Mathematics [series] 18, [publisher], ISBN 0821841246, page 237,
    • Since M_0 and M_1 are cobordant rel boundary and f_0, f_1 are n -connected, the number \delta:=\frac12(\mathrm{rk} H_nM_0-\mathrm{rk}H_nM_1) is a nonnnegative integer.
  • * 1997 , Paul Selick, Introduction to Homotopy Theory , Fields Institute Monographs [series], [publisher], ISBN 0821806904, page 15,
    • The following notations are in common use: H:f\simeq g (rel A'') means that ''H'' is a homotopy rel ''A'' from ''f'' to ''g ....
  • * 2002 , , Algebraic Topology ], [[w:Cambridge University Press, Cambridge], ISBN 0521795400, page 355,
    • Then in n\ge n', there is a map h:Z\to Z' such that h, A=g and gf\simeq f'h rel' ''A'', so the diagram above is commutative up to homotopy '''rel ''A .

    Anagrams

    * ----