Introduction

1,2,3,4,5,6 ½, 1/3, ¼, 1/5 1/6 that can increase to an endless bound we call infinitity. We have learned these common numbers since we have been in grade school.
These numbers and expressions represent a series of numbers that come from different sets that are referred to as the set of rational numbers and as the set of integers.
We use these numbers in a variety of ways through the principles we have discovered in mathematics that can represent the world around us and make sense of them.
We have discovered that these different sets of numbers can inter-mix and work with one another through different operations of addition, subtraction, division,
and multiplication. We have found that these different sets of numbers have similar rules that they follow so we can manipulate these numbers and abstractions through these
operations. We may not realize that these different classifications of numbers may or may not follow the rules and laws we have come to know such
as the distributive, cumulative, and associate properties. We have found in math that these numbers can work in similar ways as long as they follow these laws
or properties.

On this webpage you will discover what these properties are, what they can do and or explain, as well to see the applicitive use in our life around us.
These different sets of numbers or elements with the same addition and multiplication properties are called rings. Not the kind of rings that Beyonce sings about
in her popular song “Single ladies”, but rings are sets of numbers with similar properties as we know about with our experience with whole numbers or integers.