University of Sistan and BaluchestanIranian Journal of Fuzzy Systems1735-065414220170429SOME RESULTS OF MOMENTS OF UNCERTAIN RANDOM VARIABLES121313110.22111/ijfs.2017.3131ENHamedAhmadzadeDepartment of Statistics, University of Sistan and Baluchestan,
Zahedan, IranYuhongShengCollege of Mathematical and System Sciences, Xinjiang University,
Urumqi 830046, ChinaFatemehHassantabar DarziDepartment of Statistics, University of Sistan and
Baluchestan, Zahedan, IranJournal Article20151022Chance theory is a mathematical methodology for dealing with indeterminate<br />phenomena including uncertainty and randomness.<br />Consequently, uncertain random variable is developed to describe the phenomena which involve<br />uncertainty and randomness.<br />Thus, uncertain random variable is a fundamental concept in chance theory.<br />This paper provides some practical quantities to describe uncertain random variable.<br />The typical one is the expected value, which is the uncertain version of the<br />center of gravity of a physical body.<br />Mathematically, expectations are integrals with respect to chance distributions<br />or chance measures.<br />In fact, expected values measure the center of gravity of a distribution; they are<br />measures of location. In order to describe a distribution in brief terms there<br />exist additional measures, such as the variance which measures the dispersion<br />or spread, and moments.<br />For calculating the moments of uncertain random variable, some formulas are provided through chance distribution and inverse chance distribution. The main results are explained by using several examples.https://ijfs.usb.ac.ir/article_3131_182175d48ed3270d60a18b815e0a7196.pdf