Math Musings: Number Systems: We Need Them

in #steempress6 years ago (edited)
Numbers systems allow our society to communicate and possess the power to place the world around us in a perspective we may easily understand.

We need number systems. They provide a means to communicate, understand and differentiate. Too vague you say? Alright, how about this: we want to understand the very society in which we live. Let us explore our country in two ways, one using only the natural or counting numbers, next, employing the use of rational numbers or fractions.


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Natural Numbers


Consider the natural numbers (or counting numbers) when discussing some of the facts from the United States of America as suggested by the US census Bureau, uscensus.gov. Here is a snapshot of our country:

  • There were 37 million people who lived below the poverty level, while there were 2 million 500 thousand millionaires, 40 of them in our Senate, and 371 billionaires, who amassed $1 trillion 100 billion dollars.
  • The federal debt was over 8 trillion dollars.
  • There were 34 million 200 thousand foreign born citizens, 18 million 100 thousand of them from Latin America.
  • Since 1973, there were approximately 30 to 40 million abortions performed.
  • The population of our country was over 294 million by year’s end.
The numbers are staggering, but do you understand the implication of the numbers? That is, do you have a context, so you may visualize the relative sizes of these numbers? To place a ‘spin’ on the state of the country, we must put the numbers in some sort of context we can comprehend. This means, we will use the concept of a ratio to see if we may see what the numbers indicate. We will rewrite the statistics above by focusing on the very last point, the population of the country, so that we may come to terms with each demographic as a part of a whole.

Consider the rational numbers (or fractions) when discussing some of the facts from. Consider those numbers that described:
  • While over 1 in 8 people lived below the poverty level, less than 1 in 117 people were millionaires, but yet 2 out of 5 Senators were millionaires. The 371 billionaires could have given every citizen in this country $3,000 and still would have had over 2.2 million dollars to divvy up among themselves.
  • The federal debt amounted to over $27,000 that each of us owed.
  • Over 1 in 9 citizens were born in another country, and over half of the foreign born citizens were born in Latin America.
  • Since 1973, we aborted roughly 1 in 8, assuming of course every aborted child had lived.
Which paragraph gives you a better idea of the state of our country? By using ratios, the concept of a part of a whole, we can place large and small numbers in a context we can visualize. The interpretation of the visualization is left for the reader of course, but the numbers and ratios are precise and indisputable.

Real Numbers

Each real number represents a distinct point on a number line. The set of real numbers may be divided into a collection of different subsets or classifications of numbers such as numbers that can be written as a ratio of two integers and those numbers who can not be written as a ratio of two integers.

The set of real numbers is: the set of all numbers distinctly represented on the real number line.

Real Numbers contain all of the following sets of numbers:

  • Irrational numbers are the numbers on the real number line that are non-terminating decimals like pi. For example, pi may be represented as 3.14159265358979323846 2643383279 50288419716939937510 ... , well, you get the picture.
Nested Subsets of Real Numbers
  • All natural numbers are whole numbers.
  • All whole numbers are integers.
  • All intergers are ratonal numbers and.

Rational Numbers and Irrational Numbers

All the Real Numbers are made up two discrete and mutually exclusive groups, the Rational Numbers and the Irrational Numbers.
  • Natural or counting Numbers is the set of numbers, one, two three and so on … . The set appears as {1, 2, 3, … }
  • Whole Numbers include the counting numbers but also includes zero. The set appears as {0, 1, 2, 3, … }
  • Integers may be thought of as the positive and negative counting numbers to include zero. The set appears as {…, -3, -2, -1, 0, 1, 2, 3, … }
  • Rational numbers are the numbers which may be represented as fractions or terminating or repeating decimals. An example would be 2/9 = 0.2222…