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 |
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 |
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.
functional |
departmental |
As adjectives the difference between functional and departmental
is that
functional is in good working order while
departmental is of or pertaining to a department.
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.
functional |
capable |
As adjectives the difference between functional and capable
is that
functional is in good working order while
capable is able and efficient; having the ability needed for a specific task; having the disposition to do something; permitting or being susceptible to something.
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.
functional |
interim |
As adjectives the difference between functional and interim
is that
functional is in good working order while
interim is transitional.
As nouns the difference between functional and interim
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
interim is a transitional or temporary period between other events.
functional |
study |
As nouns the difference between functional and study
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
study is a state of mental perplexity or worried thought.
As an adjective functional
is in good working order.
As a verb study is
to revise materials already learned in order to make sure one does not forget them, usually in preparation for an examination.
parameter |
functional |
As nouns the difference between parameter and functional
is that
parameter is parameter 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.
utility |
functional |
In computing terms the difference between utility and functional
is that
utility is a software program designed to perform a single task or a small range of tasks, often to help manage and tune computer hardware, an operating system or application software while
functional is an object encapsulating a function pointer (or equivalent).
As nouns the difference between utility and functional
is that
utility is the state or condition of being useful; usefulness 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.
As an adjective functional is
in good working order.
proficient |
functional |
As adjectives the difference between proficient and functional
is that
proficient is good at; skilled; fluent; practiced, especially in relation to a task or skill while
functional is in good working order.
As nouns the difference between proficient and functional
is that
proficient is an expert 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.
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