formula |
functional |
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.
functional |
conceptual |
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.
functional |
functionalization |
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.
functional |
available |
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.
functional |
active |
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
.
systematic |
functional |
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.
functional |
functionalize |
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 functionalize is
to provide something with a function.
fundamental |
functional |
As nouns the difference between fundamental and functional
is that
fundamental is a leading or primary principle, rule, law, or article, which serves as the groundwork of a system; essential part, as, the fundamentals of linear algebra 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 adjectives the difference between fundamental and functional
is that
fundamental is pertaining to the foundation or basis; serving for the foundation hence: essential, as an element, principle, or law; important; original; elementary while
functional is in good working order.
functional |
undefined |
As adjectives the difference between functional and undefined
is that
functional is in good working order while
undefined is lacking a definition or value.
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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