Fungsi dénsitas probabilitas: Béda antarrépisi
Addbot (obrolan | kontribusi) m Bot: Migrating 33 interwiki links, now provided by Wikidata on d:q207522 (translate me) |
m →top: Ngarapihkeun éjahan, replaced: oge → ogé , dipake → dipaké , ea → éa (2), bere → béré |
||
| Baris ka-1: | Baris ka-1: | ||
{{tarjamahkeun|Inggris}} |
{{tarjamahkeun|Inggris}} |
||
Dina [[matematika]], '''probability density function''' |
Dina [[matematika]], '''probability density function''' dipaké keur ngagambarkeun [[probability distribution]] di watesan [[integral]]s. Lamun probability distribution ngabogaan densiti ''f''(''x''), saterusna [[interval (mathematics)|interval]] tak terhingga [''x'', ''x'' + d''x''] ngabogaan probabiliti ''f''(''x'') d''x''. Probability density function bisa ogé ditempo tina versi "smoothed out" [[histogram]]: if one empirically méasures values of a [[variabel acak]] repéatedly and produces a histogram depicting relative frequencies of output ranges, then this histogram will resemble the random variable's probability density (assuming that the variable is sampled sufficiently often and the output ranges are sufficiently narrow). |
||
Formally, a probability distribution has density ''f''(''x'') if ''f''(''x'') is a non-negative [[Lebesgue integration|Lebesgue-integrable]] function '''R''' → '''R''' such that the probability of the interval [''a'', ''b''] is given by |
Formally, a probability distribution has density ''f''(''x'') if ''f''(''x'') is a non-negative [[Lebesgue integration|Lebesgue-integrable]] function '''R''' → '''R''' such that the probability of the interval [''a'', ''b''] is given by |
||
:<math>\int_a^b f(x)\,dx</math> |
:<math>\int_a^b f(x)\,dx</math> |
||
| Baris ka-12: | Baris ka-12: | ||
:<math>f(x)={e^{-{x^2/2}}\over \sqrt{2\pi}}</math>. |
:<math>f(x)={e^{-{x^2/2}}\over \sqrt{2\pi}}</math>. |
||
Lamun [[variabel acak]] ''X'' |
Lamun [[variabel acak]] ''X'' dibérékeun sarta distribusina kaasup kana fungsi probabiliti densiti ''f''(''x''), mangka [[nilai ekspektasi]] ''X'' (lamun éta aya) bisa diitung ku |
||
:<math>\operatorname{E}(X)=\int_{-\infty}^\infty x\,f(x)\,dx</math> |
:<math>\operatorname{E}(X)=\int_{-\infty}^\infty x\,f(x)\,dx</math> |
||
| Baris ka-18: | Baris ka-18: | ||
Not every probability distribution has a density function: the distributions of [[discrete random variable]]s do not; nor does the [[Cantor distribution]], even though it has no discrete component, i.e., does not assign positive probability to any individual point. |
Not every probability distribution has a density function: the distributions of [[discrete random variable]]s do not; nor does the [[Cantor distribution]], even though it has no discrete component, i.e., does not assign positive probability to any individual point. |
||
A distribution has a density function if and only if its [[cumulative distribution function]] ''F''(''x'') is [[absolute continuity|absolutely continuous]]. In this case, ''F'' is [[almost everywhere]] [[derivative|differentiable]], and its derivative can be used as probability density. If a probability distribution admits a density, then the probability of every one-point set {''a''} is zero. |
A distribution has a density function if and only if its [[cumulative distribution function]] ''F''(''x'') is [[absolute continuity|absolutely continuous]]. In this case, ''F'' is [[almost everywhere]] [[derivative|differentiable]], and its derivative can be used as probability density. If a probability distribution admits a density, then the probability of every one-point set {''a''} is zero. |
||
It is a common mistake to think of ''f''(''a'') as the probability of {''a''}, but this is incorrect; in fact, ''f''(''a'') will often be bigger than 1 - consider a random variable with a [[sebaran seragam|uniform distribution]] between 0 and 1/2. |
It is a common mistake to think of ''f''(''a'') as the probability of {''a''}, but this is incorrect; in fact, ''f''(''a'') will often be bigger than 1 - consider a random variable with a [[sebaran seragam|uniform distribution]] between 0 and 1/2. |
||
Dua densiti ''f'' jeung ''g'' for the same distribution can only differ on a set of [[Lebesgue measure]] zero. |
Dua densiti ''f'' jeung ''g'' for the same distribution can only differ on a set of [[Lebesgue measure]] zero. |
||
Tempo oge: |
Tempo oge: |
||
Révisi nurutkeun 13 Pébruari 2017 03.13
 |
Artikel ieu keur dikeureuyeuh, ditarjamahkeun tina basa Inggris. Bantuanna didagoan pikeun narjamahkeun. |
Dina matematika, probability density function dipaké keur ngagambarkeun probability distribution di watesan integrals. Lamun probability distribution ngabogaan densiti f(x), saterusna interval tak terhingga [x, x + dx] ngabogaan probabiliti f(x) dx. Probability density function bisa ogé ditempo tina versi "smoothed out" histogram: if one empirically méasures values of a variabel acak repéatedly and produces a histogram depicting relative frequencies of output ranges, then this histogram will resemble the random variable's probability density (assuming that the variable is sampled sufficiently often and the output ranges are sufficiently narrow).
Formally, a probability distribution has density f(x) if f(x) is a non-negative Lebesgue-integrable function R → R such that the probability of the interval [a, b] is given by
for any two numbers a and b. This implies that the total integral of f must be 1. Conversely, any non-negative Lebesgue-integrable function with total integral 1 is the probability density of a suitably defined probability distribution.
Contona, sebaran seragam dina interval [0,1] ngabogaan probabiliti densiti f(x) = 1 keur 0 ≤ x ≤ 1 jeung nol dimamana. Standar sebaran normal ngabogaan probabiliti densiti
- .
Lamun variabel acak X dibérékeun sarta distribusina kaasup kana fungsi probabiliti densiti f(x), mangka nilai ekspektasi X (lamun éta aya) bisa diitung ku
Not every probability distribution has a density function: the distributions of discrete random variables do not; nor does the Cantor distribution, even though it has no discrete component, i.e., does not assign positive probability to any individual point.
A distribution has a density function if and only if its cumulative distribution function F(x) is absolutely continuous. In this case, F is almost everywhere differentiable, and its derivative can be used as probability density. If a probability distribution admits a density, then the probability of every one-point set {a} is zero.
It is a common mistake to think of f(a) as the probability of {a}, but this is incorrect; in fact, f(a) will often be bigger than 1 - consider a random variable with a uniform distribution between 0 and 1/2.
Dua densiti f jeung g for the same distribution can only differ on a set of Lebesgue measure zero.
Tempo oge:
Rujukan
- Wikipédia basa Inggris, disalin ping 17 Agustus 2004.