INTRODUCING 5 - days-a-week problem solving session for Math Olympiad and ISI Entrance. Learn More

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[et_pb_column type="4_4"][et_pb_text admin_label="Text"]### How does this sound?

**The numbers 18 and 30 together looks like a chair. **

#### Let's start discovering by playing a game.

#### Let's draw for number 6.

#### Let's draw for some other number say 30.

#### Beautiful right!

#### Actually, it shows that to build this shape the requirement of the line segments is as important as the prime numbers to build the number.

#### Exercise: Prove from the rules of the game that the numbers on the line segment always correspond to prime numbers.

#### Exercise: Prove that the numbers corresponding to the parallel lines always have the same prime number on it.

The Natural Geometry of Natural Numbers is something that is never advertised, rarely talked about. Just feel how they feel!

Let's revise some ideas and concepts to understand the natural numbers more deeply.

We know by **Unique Prime Factorization Theorem** that every natural number can be uniquely represented by the product of primes.

So, a natural number is entirely known by the primes and their powers dividing it.

Also if you think carefully the entire information of a natural number is also entirely contained in the set of all of its divisors as every natural number has a unique set of divisors apart from itself.

We will discover the geometry of a natural number by adding lines between these divisors to form some shape and we call that the natural geometry corresponding to the number.

Take a natural number **n** and all its divisors including itself.

Consider two divisors **a** < **b** of **n**. Now **draw a line segment** between **a** and **b** based on the following rules:

**a**divides**b**.- There is no divisor
**c**of**n,**such that**a**<**c**<**b**and**a**divides**c**and**c**divides**b**.

Also write the number \(\frac{b}{a}\) over the line segment joining **a** and **b**.

Now, whatever shape we get, we call it the natural geometry of that particular number. Here we call that **6 has a natural geometry of a square or a rectangle**. I prefer to call it a square because we all love symmetry.

What about all the numbers? Isn't interesting to know the geometry of all the natural numbers?

Observe this carefully, 30 has a complicated structure if seen in two dimensions but its natural geometrical structure is actually like a cube right?

The red numbers denote the divisors and the black numbers denote the numbers to be written on the line segment.

Have you observed something interesting?

**The numbers on the line segments are always primes.**

Did you observe this?

**In the pictures above, the parallel lines have the same prime number on it.**

Actually each prime number corresponds to a different direction. If you draw it perpendicularly we get the natural geometry of the number.

Let's observe the geometry of other numbers.

Try to draw the geometry of the number 210. It will look like the following:

Obviously, this is not the natural geometry as shown. But neither we can visualize it. The number 210 lies in four dimensions. If you try to discover this structure, you will find that it has four different directions corresponding to four different primes dividing it. Also, you will see that it is actually a four-dimensional cube, which is called a tesseract. What you see above is a two dimensional projection of the tesseract, we call it a graph.

*A person acquainted with graph theory can understand that the graph of a number is always k- regular where k is the number of primes dividing the number.*

Now it's time for you to discover more about the geometry of all the numbers.

I leave some exercises to help you along the way.

**Exercise**: Show that the natural geometry of \(p^k\) is a long straight line consisting of k small straight lines, where p is a prime number and k is a natural number.

**Exercise**: Show that all the numbers of the form \(p.q\) where p and q are two distinct prime numbers always have the natural geometry of a square.

**Exercise**: Show that all the numbers of the form \(p.q.r\) where p, q and r are three distinct prime numbers always have the natural geometry of a cube.

**Research Exercise**: Find the natural geometry of the numbers of the form \(p^2.q\) where p and q are two distinct prime numbers. Also, try to generalize and predict the geometry of \(p^k.q\) where k is any natural number.

**Research Exercise**: Find the natural geometry of \(p^a.q^b.r^c\) where p,

q, and r are three distinct prime numbers and a,b and c are natural numbers.

Let's end with the discussion with the geometry of {18, 30}. First let us define what I mean by it.

We define the natural geometry of two natural numbers quite naturally as a natural extension from that of a single number.

Take two natural numbers a and b. Consider the divisors of both a and b and follow the rules of the game on the set of divisors of both a and b. The shape that we get is called the natural geometry of {a, b}.

You can try it yourself and find out that the natural geometry of {18, 30} looks like the following:

Sit on this chair, grab a cup of coffee and set off to discover.

The numbers are eagerly waiting for your comments. ðŸ™‚

Please mention your observations and ideas and the proofs of the exercises in the comments section. Also think about what type of different shapes can we get from the numbers.

[/et_pb_text][/et_pb_column] [/et_pb_row] [/et_pb_section]Also visit: Thousand Flowers Program

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