Classification/types of functions. [closed]
See: Types of Functions
.
Is there any other type of function left outside this classification?
algebra-precalculus functions
asked Dec 27 '18 at 18:38
user366312
520317
closed as too broad by Jyrki Lahtonen, Cesareo, José Carlos Santos, Andrew, Eevee Trainer Dec 29 '18 at 0:36
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
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See: Types of Functions
.
Is there any other type of function left outside this classification?
algebra-precalculus functions
asked Dec 27 '18 at 18:38
user366312
520317
closed as too broad by Jyrki Lahtonen, Cesareo, José Carlos Santos, Andrew, Eevee Trainer Dec 29 '18 at 0:36
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
where do you classify $x^x$?
– Tito Eliatron
Dec 27 '18 at 18:40
$F(x)=int_0^x e^{-t^2}dt$ seems to be outside
– Tito Eliatron
Dec 27 '18 at 18:41
@TitoEliatron, regarding your 1st comment: I don't know. regarding your second comment: that is an exponential function.
– user366312
Dec 27 '18 at 18:42
1
@stackoverflow.com The first comment: $x^x=e^{xlog x}$, so it may be a mixed exp-log function. For the second, It is the Primitive of an exponetial function, but as far as I know, it cannot be expressed by elementary functions. So I think it is NOT exponential
– Tito Eliatron
Dec 27 '18 at 18:44
2
Also en.m.wikipedia.org/wiki/…
– Eddy
Dec 27 '18 at 18:46
|
show 7 more comments
See: Types of Functions
.
Is there any other type of function left outside this classification?
algebra-precalculus functions
asked Dec 27 '18 at 18:38
user366312
520317
See: Types of Functions
.
Is there any other type of function left outside this classification?
algebra-precalculus functions
algebra-precalculus functions
asked Dec 27 '18 at 18:38
user366312
520317
asked Dec 27 '18 at 18:38
user366312
520317
asked Dec 27 '18 at 18:38
user366312
520317
asked Dec 27 '18 at 18:38
user366312
520317
asked Dec 27 '18 at 18:38
user366312
520317
520317
closed as too broad by Jyrki Lahtonen, Cesareo, José Carlos Santos, Andrew, Eevee Trainer Dec 29 '18 at 0:36
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
closed as too broad by Jyrki Lahtonen, Cesareo, José Carlos Santos, Andrew, Eevee Trainer Dec 29 '18 at 0:36
Please edit the question to limit it to a specific problem with enough detail to identify an adequate answer. Avoid asking multiple distinct questions at once. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.
where do you classify $x^x$?
– Tito Eliatron
Dec 27 '18 at 18:40
$F(x)=int_0^x e^{-t^2}dt$ seems to be outside
– Tito Eliatron
Dec 27 '18 at 18:41
@TitoEliatron, regarding your 1st comment: I don't know. regarding your second comment: that is an exponential function.
– user366312
Dec 27 '18 at 18:42
1
@stackoverflow.com The first comment: $x^x=e^{xlog x}$, so it may be a mixed exp-log function. For the second, It is the Primitive of an exponetial function, but as far as I know, it cannot be expressed by elementary functions. So I think it is NOT exponential
– Tito Eliatron
Dec 27 '18 at 18:44
2
Also en.m.wikipedia.org/wiki/…
– Eddy
Dec 27 '18 at 18:46
|
show 7 more comments
where do you classify $x^x$?
– Tito Eliatron
Dec 27 '18 at 18:40
$F(x)=int_0^x e^{-t^2}dt$ seems to be outside
– Tito Eliatron
Dec 27 '18 at 18:41
@TitoEliatron, regarding your 1st comment: I don't know. regarding your second comment: that is an exponential function.
– user366312
Dec 27 '18 at 18:42
1
@stackoverflow.com The first comment: $x^x=e^{xlog x}$, so it may be a mixed exp-log function. For the second, It is the Primitive of an exponetial function, but as far as I know, it cannot be expressed by elementary functions. So I think it is NOT exponential
– Tito Eliatron
Dec 27 '18 at 18:44
2
Also en.m.wikipedia.org/wiki/…
– Eddy
Dec 27 '18 at 18:46
where do you classify $x^x$?
– Tito Eliatron
Dec 27 '18 at 18:40
where do you classify $x^x$?
– Tito Eliatron
Dec 27 '18 at 18:40
$F(x)=int_0^x e^{-t^2}dt$ seems to be outside
– Tito Eliatron
Dec 27 '18 at 18:41
$F(x)=int_0^x e^{-t^2}dt$ seems to be outside
– Tito Eliatron
Dec 27 '18 at 18:41
@TitoEliatron, regarding your 1st comment: I don't know. regarding your second comment: that is an exponential function.
– user366312
Dec 27 '18 at 18:42
@TitoEliatron, regarding your 1st comment: I don't know. regarding your second comment: that is an exponential function.
– user366312
Dec 27 '18 at 18:42
1
1
@stackoverflow.com The first comment: $x^x=e^{xlog x}$, so it may be a mixed exp-log function. For the second, It is the Primitive of an exponetial function, but as far as I know, it cannot be expressed by elementary functions. So I think it is NOT exponential
– Tito Eliatron
Dec 27 '18 at 18:44
@stackoverflow.com The first comment: $x^x=e^{xlog x}$, so it may be a mixed exp-log function. For the second, It is the Primitive of an exponetial function, but as far as I know, it cannot be expressed by elementary functions. So I think it is NOT exponential
– Tito Eliatron
Dec 27 '18 at 18:44
2
2
Also en.m.wikipedia.org/wiki/…
– Eddy
Dec 27 '18 at 18:46
Also en.m.wikipedia.org/wiki/…
– Eddy
Dec 27 '18 at 18:46
|
show 7 more comments
1 Answer
1
active
oldest
votes
Continuous, discontinuous, differentiable, piecewise continuous, open, closed, compact supported, bounded, with bounded variation and many more besides all functions that have a domain or codomain other than the reals.
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
add a comment |
1 Answer
1
active
oldest
votes
1 Answer
1
active
oldest
votes
active
oldest
votes
active
oldest
votes
Continuous, discontinuous, differentiable, piecewise continuous, open, closed, compact supported, bounded, with bounded variation and many more besides all functions that have a domain or codomain other than the reals.
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
add a comment |
Continuous, discontinuous, differentiable, piecewise continuous, open, closed, compact supported, bounded, with bounded variation and many more besides all functions that have a domain or codomain other than the reals.
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
add a comment |
Continuous, discontinuous, differentiable, piecewise continuous, open, closed, compact supported, bounded, with bounded variation and many more besides all functions that have a domain or codomain other than the reals.
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
Continuous, discontinuous, differentiable, piecewise continuous, open, closed, compact supported, bounded, with bounded variation and many more besides all functions that have a domain or codomain other than the reals.
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
answered Dec 28 '18 at 3:13
William Elliot
7,3212620
7,3212620
add a comment |
add a comment |
where do you classify $x^x$?
– Tito Eliatron
Dec 27 '18 at 18:40
$F(x)=int_0^x e^{-t^2}dt$ seems to be outside
– Tito Eliatron
Dec 27 '18 at 18:41
@TitoEliatron, regarding your 1st comment: I don't know. regarding your second comment: that is an exponential function.
– user366312
Dec 27 '18 at 18:42
1
@stackoverflow.com The first comment: $x^x=e^{xlog x}$, so it may be a mixed exp-log function. For the second, It is the Primitive of an exponetial function, but as far as I know, it cannot be expressed by elementary functions. So I think it is NOT exponential
– Tito Eliatron
Dec 27 '18 at 18:44
2
Also en.m.wikipedia.org/wiki/…
– Eddy
Dec 27 '18 at 18:46