Neutrosophic Structures in Statistical General Mathematical Functions

Abstract

The neutrosophic  structures are very much  relevant, vey essential and of course highly applicable to statistical and general mathematical concepts and structures. In practice.  Sets in neutrosophic statistics are used, instead of crisp numbers in classical statistics. In addition, the neutrosophic concepts are undoubtedly very much applicable to a host of important mathematical ideals and concepts such as the transcendental functions and identities. In Classical Statistics all data are determined and this makes a very clear and vivid distinctions between neutrosophic statistics and classical statistics. In many cases, when indeterminacy is zero, neutrosophic statistics coincides with classical statistics. In many cases the neutrosophic can be used as a means for measuring the indeterminate data.  Neutrosophic Data is the data that contains some forms of indeterminacy in this paper, efforts are intensified as much as possible to examine to some extent, the usefulness as well as the applicability of the concepts of neutrosophism in general mathematical functions and most especially in the area of problem solving.