functional

Functional is a synonym of operable.

As adjectives the difference between functional and operable

is that functional is in good working order while operable is operable.

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.

As adjectives the difference between communicative and functional

is that communicative is someone or something which tends to eagerly and effectively communicate 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.

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.

As a letter x is

the twenty-fourth letter of the.

As a symbol x is

voiceless velar fricative.

As adjectives the difference between reasonable and functional

is that reasonable is having the faculty of reason; endued with reason; rational 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.

As nouns the difference between formula and functional

is that formula is formula 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 an adjective functional is

in good working order.

As adjectives the difference between functional and conceptual

is that functional is in good working order while conceptual is of, or relating to concepts or mental conception; existing in the imagination.

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.

As nouns the difference between functional and functionalization

is that 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 while functionalization is the act of functionalizing.

As an adjective functional

is in good working order.

As adjectives the difference between functional and available

is that functional is in good working order while available is such as one may avail one’s self of; capable of being used for the accomplishment of a purpose.

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.

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.

As a verb active is

.

As adjectives the difference between systematic and functional

is that systematic is carried out using a planned, ordered procedure 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.