melodic |
supermelodic |
As adjectives the difference between melodic and supermelodic
is that
melodic is of, relating to, or having melody while
supermelodic is very melodic.
overcome |
superable |
As a verb overcome
is to surmount (a physical or abstract obstacle); to prevail over, to get the better of.
As an adjective superable is
capable of being overcome or surmounted; surmountable or conquerable.
surmounted |
superable |
As a verb surmounted
is past tense of surmount.
As an adjective superable is
capable of being overcome or surmounted; surmountable or conquerable.
set |
quasiconvex |
As adjectives the difference between set and quasiconvex
is that
set is fixed in position while
quasiconvex is said of a function, if the inverse of any set of the form (-∞,a) for that function is a convex set.
As a verb set
is to put (something) down, to rest.
As a noun set
is a punch for setting nails in wood.
As a proper noun Set
is an ancient Egyptian god, variously described as the god of chaos, the god of thunder and storms, or the god of destruction.
quasiconcave |
quasiconvex |
Antonyms |
Quasiconcave is an antonym of quasiconvex.
In mathematics|lang=en terms the difference between quasiconcave and quasiconvex
is that
quasiconcave is (mathematics) said of a function, if the inverse image of any set of the form (a,∞) for that function is a convex set while
quasiconvex is (mathematics) said of a function, if the inverse image of any set of the form (-∞,a) for that function is a convex set.
As adjectives the difference between quasiconcave and quasiconvex
is that
quasiconcave is (mathematics) said of a function, if the inverse image of any set of the form (a,∞) for that function is a convex set while
quasiconvex is (mathematics) said of a function, if the inverse image of any set of the form (-∞,a) for that function is a convex set.
quasiconvexity |
quasiconvex |
Related terms |
Quasiconvexity is a related term of quasiconvex.
As an adjective quasiconvex is
(mathematics) said of a function, if the inverse image of any set of the form (-∞,a) for that function is a convex set.
function |
quasiconcave |
In mathematics terms the difference between function and quasiconcave
is that
function is a relation in which each element of the domain is associated with exactly one element of the codomain while
quasiconcave is said of a function, if the inverse of any set of the form (a,∞) for that function is a convex set.
As a noun function
is what something does or is used for.
As a verb function
is to have a function.
As an adjective quasiconcave is
said of a function, if the inverse of any set of the form (a,∞) for that function is a convex set.
inverse |
quasiconcave |
As adjectives the difference between inverse and quasiconcave
is that
inverse is inverted while
quasiconcave is (mathematics) said of a function, if the inverse image of any set of the form (a,∞) for that function is a convex set.
As a verb inverse
is .
image |
quasiconcave |
As adjectives the difference between image and quasiconcave
is that
image is figurative (of sense of term or discourse) while
quasiconcave is (mathematics) said of a function, if the inverse image of any set of the form (a,∞) for that function is a convex set.
As a verb image
is .
set |
quasiconcave |
As a numeral set
is seven.
As an adjective quasiconcave is
(mathematics) said of a function, if the inverse image of any set of the form (a,∞) for that function is a convex set.
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