Neutrosophic Statistics is an extension ofStatistics is the most generalInterval Statistics, whiles the most general form of statistics (Third version)Plithogenic

In this paper we prove that Neutrosophic Statistics is an extension of therepresentations, etc.), it allows the reductionWhile Interval Statistics onlyarguments by Woodall et al. [1]. We show that not all indeterminacies (uncertainties) may be represented byintervals. We redirect the authors to the Plithogenic Probability and Plithogenic Statistics that are the most generalforms Probability and Interval Statistics as subclasses).deals with indeterminacy that can be represented by intervals. And we respond to theof MultiVariate Probability and MultiVariate Statistics respectively (including, of course, the Impreciselity and Interval Statistics as subclasses).Interval Statistics, since it may deal with alltypes of indeterminacies (with respect to the data, inferential procedures, probability distributions, graphicalof indeterminacy, and it uses the neutrosophic probability that is moregeneral than imprecise and classical probabilities, andhas more detailed corresponding probability density functions.intervals. Also, in some applications, we should better use hesitant sets (that have less indeterminacy) instead ofWe redirect the authors to the Plithogenic Probability and Plithogenic Statistics that are the most general