First, when we think of whole numbers, we often think of a unit that extends across the number line and it’s a little lonely self, it sits there as a unit. And we consider that to be counting units. As discussed when dealing with infinity, it gets more difficult to look at the nature of counting, because we are really extrapolating out of infinity whole number units. In fact, the whole number units are just fractions. For example, if I write the numbers 1234, I can underline each one and place the number one underneath it. This creates a fraction, the fraction results in exactly the same as the number one. What does this tell us? This tells us that whole numbers can be expressed as fractions. If I flip the equation over, as it were, and over to place 1234 And a line and above that place a one what we find is that we have the reciprocal value of the whole number, ie the number that exists between zero and one.
So, for example, we call power if we make a power we are taking two equal quantities and multiplying it together. If those two quantities fall within the reciprocal space, they will not even be reiterate any kind of calculation, it will never move beyond the one. This is what we call the infinity. And what it shows us is that basically this infinity of one stems from the nature of whole number fractions which and whole numbers, which is purely denoted by whether the number one is above or below the whole number line