dc.description.abstract |
The need for the distribution of combination of random variables arises in many areas of
the sciences and engineering. In this thesis, the distributions of two different combination
of Gaussian random variables will be investigated. It is established that such expressions
can be represented in their most general form as the sum of chi-square and the product
of two normal random variables. The distribution of the product of two normal random
variables studied by some authors in the literature in different ways. The first expression
assumed two independent and identical random variables with zero mean and the same
variance. The second one assumed two dependent random variables with zero mean,
same variance, and with a specific correlation coefficient. Closed forms of the probability
density function and cumulative distribution function will be derived, as well as some
statistical properties such as mean, variance, moments, moment generating function,
and order statistics will be studied. All derivation ascertained by using Monte Carlo
simulation. Additionally, method of moment estimation and the maximum likelihood
estimation will be used to estimate the parameter of the derived distribution. Simulation
study carried out using R software. Finally, a practical application well be presented. |
en_US |