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Highlight of the number Seven.                                    

 There are many interpretations for the number Seven.

 

Now we are about to see an evaluation of the number Seven never imagined before. I am proud to place the Seven in Highlight with no fairy tales or children's stories.

 

The highlight of the number Seven will be demonstrated with the numbers themselves and, logically, with geometry.

 

There are many beliefs that tell of the Seven as a magical figure.

Some examples:

Seven deadly sins.

Seven days of the week.

In the Seventh day the Creator rested.

 

Some cultures say Cats have Seven lives.

In the Seventh lie you will be spotted.

A corpse will not stink if buried Seven hand spans deep.

 

First question:

How can we possibly evaluate the numbers by using the numbers themselves?

 

 

It looks difficult at first, but it isn’t, especially when we place a potential in each one of them.

 

 

Before placing the potential, let’s inquire what would be the best potential to make the numbers different from each other.

 

Once, I was thinking to myself how I could possibly relate the numbers to each other.

Then I thought I should put an integer to be divided by the quantity of the evaluated number.

 

 

Putting a whole something to be divided in pieces. And therefore analyze each part according to the number that divided it.

 

I thought, I should take a pie in the shape of cheese and start dividing it by the numbers.

 

 

 

 

 

Ok. Then, let’s go, if I use the number 2, I shall divide it in halves, as shown in the figure.

 

 

For the number 3, the figure would be like this:

 

 

For the number 4, like this:

 

We have pieces of different shapes.

 

Each piece has its own geometrical characteristics according to the used number.

 

We find their differences in their geometrical shapes.

 

Now we have to turn those pieces into numbers to evaluate their sizes.

 

 

 

Once the single-digit numbers go from zero to 9, and they are the ones that we are interested in, we have that series:

                 0, 1, 2, 3, 4, 5, 6, 7, 8, 9.

 

 

 

How can we possibly divide something by zero?

 

 

With the number 1 it is possible, only that the fraction, that is, the piece, would be the cheese itself. As shown in the figure:

 

 

Geometrically, I could not see the fraction resulting from a division by the number zero! If someone will ever have a representative figure, please let me know. I will be grateful.

 

For awhile, let’s presume such a fraction is infinitely large as explained by mathematics.

“A number divided by zero is an infinite number”.

 

 

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