If I were to ask a person to name a number which comes between 1 and 3, everyone from a three-year-old child to a white-bearded great-grandfather is likely to respond by saying, “2.” If I rephrase the question to ask about a number between 1 and 2, then the young child might be confused, but a fourth-grader might be able to respond with 
. We have to extend our understanding of what we mean by “number” to include some concepts which are not quite so intuitive. That is to say, in between the Integers, there are other numbers which are known as Rational numbers. In fact, given any Integer, 
, there are an infinite number of Rational numbers which are greater than and yet less than any other Integer which is greater than .
There are numbers in between the Rational numbers, too. We can define some number, 
, which is not equal to any Rational number. There are Rational numbers which are greater than , and those which are less than , but somehow our number squeezes itself into a gap in between the Rational numbers. In order to find such a number, we need to further extend our understanding of “number” to include the Real numbers. This should all be very familiar to the average high-school student.
Now, what happens if we extend this idea one step further? Are there more numbers which are in between the Real numbers?
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Abraham Robinson,
Archimedes,
Aristotle,
calculus,
hyperreals,
Infinitesimal,
Infinity,
Leibniz,
mathematics,
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non-standard analysis,
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Boxing Pythagoras 