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functional

Functional vs Substantial - What's the difference?

functional | substantial |


As adjectives the difference between functional and substantial

is that functional is in good working order while substantial is having to substance; actually existing; real; as, substantial life.

As nouns the difference between functional and substantial

is that functional is a function that takes a function as its argument; More precisely: A function y=f(x) whose argument x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space. An example: the definite integration of integrable real functions in a real interval while substantial is anything having substance; an essential part.

Functional vs Substantive - What's the difference?

functional | substantive |


As adjectives the difference between functional and substantive

is that functional is in good working order while substantive is nominalized.

As a noun functional

is (mathematics) a function that takes a function as its argument; more precisely: a function y''=''f''(''x'') whose argument ''x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space an example: the definite integration of integrable real functions in a real interval.

Notional vs Functional - What's the difference?

notional | functional |


As adjectives the difference between notional and functional

is that notional is of, containing, or being a notion; mental or imaginary while functional is in good working order.

As a noun functional is

a function that takes a function as its argument; More precisely: A function y=f(x) whose argument x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space. An example: the definite integration of integrable real functions in a real interval.

Disciplinary vs Functional - What's the difference?

disciplinary | functional |


As adjectives the difference between disciplinary and functional

is that disciplinary is having to do with discipline, or with the imposition of discipline while functional is in good working order.

As nouns the difference between disciplinary and functional

is that disciplinary is a disciplinary action while functional is a function that takes a function as its argument; More precisely: A function y=f(x) whose argument x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space. An example: the definite integration of integrable real functions in a real interval.

Work vs Functional - What's the difference?

work | functional |


As nouns the difference between work and functional

is that work is employment while functional is (mathematics) a function that takes a function as its argument; more precisely: a function y''=''f''(''x'') whose argument ''x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space an example: the definite integration of integrable real functions in a real interval.

As a verb work

is to do a specific task by employing physical or mental powers.

As an adjective functional is

in good working order.

Oop vs Functional - What's the difference?

oop | functional |


As an adverb oop

is .

As a verb oop

is (scotland) to bind with a thread or cord; to join; to unite.

As an adjective functional is

in good working order.

As a noun functional is

(mathematics) a function that takes a function as its argument; more precisely: a function y''=''f''(''x'') whose argument ''x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space an example: the definite integration of integrable real functions in a real interval.

Constructive vs Functional - What's the difference?

constructive | functional |


As adjectives the difference between constructive and functional

is that constructive is relating to or causing construction while functional is in good working order.

As a noun functional is

(mathematics) a function that takes a function as its argument; more precisely: a function y''=''f''(''x'') whose argument ''x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space an example: the definite integration of integrable real functions in a real interval.

Functional vs Suitable - What's the difference?

functional | suitable |


As adjectives the difference between functional and suitable

is that functional is in good working order while suitable is having sufficient or the required properties for a certain purpose or task; appropriate to a certain occasion.

As a noun functional

is a function that takes a function as its argument; More precisely: A function y=f(x) whose argument x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space. An example: the definite integration of integrable real functions in a real interval.

Ornamental vs Functional - What's the difference?

ornamental | functional |


As adjectives the difference between ornamental and functional

is that ornamental is serving to ornament; characterized by ornament; beautifying; embellishing while functional is in good working order.

As nouns the difference between ornamental and functional

is that ornamental is an ornamental plant while functional is (mathematics) a function that takes a function as its argument; more precisely: a function y''=''f''(''x'') whose argument ''x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space an example: the definite integration of integrable real functions in a real interval.

Professed vs Functional - What's the difference?

professed | functional |


As adjectives the difference between professed and functional

is that professed is professing to be qualified while functional is in good working order.

As a verb professed

is (profess).

As a noun functional is

(mathematics) a function that takes a function as its argument; more precisely: a function y''=''f''(''x'') whose argument ''x varies in a space of (real valued, complex valued) functions and whose value belongs to a monodimensional space an example: the definite integration of integrable real functions in a real interval.

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