below, that pertain to the family of distribution. The study will focus on three properties of the
below, that pertain to the family of distribution. The study will focus on three properties of the
be
S(y)=1 and that 1-f(x). with this, the expenentiated generalized property of the exponential
S(y)=1 and that 1-f(x). with this, the expenentiated generalized property of the exponential
S(y)=1 and tha
Exponentiated exponential distribution is a widespread attractive generalization of the
Exponentiated exponential distribution is a widespread attractive generalization of the
Exponentiated exponentia
i.
ii.
Variance property of the exponentiated exponential distribution
To prove or know the property in details, let us take an instance of an equation. (8)
iii.
such that, x=0 Variance property of th
exponentiated exponential distribution to try and prove them. The properties have a generalized
exponentiated exponential distribution to try and prove them. The properties have a generalized
exponent
In this formula, U has a uniform U (1,0) distribution exponential (Kotz, Nadarajah, 2000): In
such a case, it is obtained that, the median has In this formula, U has a uniform U (1,0)
distribution exp
function of a quantile for the model proposed is given by the formula below.
function of a quantile for the model proposed is given by the formula below.
function of a quantile for the model proposed
distribution follows that, s(e) X=1 and that E is towards the infinity.
.
distribution follows that, s(e) X=1 and that E is towards the infinity.
.
distribution follows that, s(e) X=1 and that E is to
These results actually confirm that the further proposed distributions of the exponential has a
mode.
These results actually confirm that the further proposed distributions of the exponential has a
mo
i.
The average/median property of the exponentiated exponential distribution
ii.
The quantile function of this property is given by:
. In this case, the
corresponding The average/median property of th
i.
The mode property the exponentiated exponential distribution
The function of survival or reliability is given by the function shown below:
i.
The mode property the exponentiated exponential distrib
properties of exponentiated exponential distribution.
Proving the properties of The Exponentiated Exponential Distribution
properties of exponentiated exponential distribution.
Proving the properties
Examining the property now so that, we can go step to prove the property.
Examining the property now so that, we can go step to prove the property.
Examining the property now so that, we can go step t
This part of the paper will concentrate on three main statistical properties of the Exponentiated
Exponential Distribution This part of the paper will concentrate on three main statistical
properties
Keep in mind that the initial or the lower limit is zero (lim=0) where the upper limit of this
property is towards infinity (lim= )
Keep in mind that the initial or the lower limit is zero (lim=0) whe
generalized exponential and its inverse.
generalized exponential and its inverse.
generalized exponential and its inverse.
generalized exponential and its inverse.
generalized exponential and its inve
inverted exponential distribution that serves as a competitive model and an alternative to both the
inverted exponential distribution that serves as a competitive model and an alternative to both the
property explaining step by step on how it achieved the end result. property explaining step by
step on how it achieved the end result. property explaining step by step on how it achieved the
end resu
And that,
. This means that the first
derivative is a function of the U(x) and can be as well represented as
Since And that,
.
. This means that the
first derivative is a function of the U(x) and can
the Vx is positive and not negative, it follows that the property has an increasing function. And in
this case, the property of exponentiated exponential in that distribution is proven. the Vx is
posi
42:174189, 1998). It seems that, several mathematical properties of the distribution are not
yet42:174189, 1998). It seems that, several mathematical properties of the distribution are not
yet42:17418
known in either single or general formats. There are several properties as it will be discussed
known in either single or general formats. There are several properties as it will be discussed
known in
where the first x is zero and the second x is to infinity. The formula below is an illustration of the
where the first x is zero and the second x is to infinity. The formula below is an illustration o
and x runs to infinity. In other words, x>1, x>0. Basically, this involves lim f(x) and lim f(x)
and x runs to infinity. In other words, x>1, x>0. Basically, this involves lim f(x) and lim f(x)
and x
exponential distribution which was introduced by Kunduz and Gupta (Austin. N.
exponential distribution which was introduced by Kunduz and Gupta (Austin. N.
exponential distribution which was introduce
For one to be able to stimulate the quantities function and the median property of the
exponentiated For one to be able to stimulate the quantities function and the median property of
the exponentiate
substitute of
substitute of
substitute of
substitute of
substitute of
substitute of
substitute of
substitute of
substitute of
substitute of
substitute of
and in this case, the median proposed is given
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KOMUNITAS MAHASISWA PATI
UNIVERSITAS DIPONEGORO DAN POLITEKNIK NEGERI SEMARANG
Perumahan Graha Sapta Asri Jl. Tembalang Selatan II No. 13
Kel. Pedalangan, Banyumanik, Semarang
CP: Mustofa Wijayanto (0