The art of Pi (π), Phi (φ) and e

the art

Numbers are a lot of fun. They can start conversations—the interesting number paradox is a party favourite. Of course, in the wrong company they can just as easily end conversations.

The art here represents my attempt at transforming famous numbers in mathematics into pretty visual forms. This work is 99% art and 1% data visualization. Because the digits in the numbers are essentially random (as far as we know), the essence of the art is based on randomness.

In a few cases, the art reveals an interesting and unexpected observation. For example, the sequence 999999 in π at digit 762 appears significantly earlier than expected by chance. Or that if you calculate π to 13,099,586 digits you will find love, as encoded by 1114214 in the scheme a=0, b=1, c=2...

Keep in mind that because the digits are random and never terminating, they have the property that they contain all observations about numbers within them. In fact, because the digits go on forever, you'll eventually find π within π.

the numbers

Of these three transcendental numbers, π is the most well known. It is the ratio of a circle's circumference to its diameter (d = πr).

The Golden Ratio (φ) is the attractive proportion of values a and b (a > b) that satisfy (a+b)/a = a/b, which solves to a/b = (1+√5)/2.

▲ The numbers π, φ and e nearly form a right-angled triangle.

The last of the three numbers, e is Euler's number and also known as the base of the natural logarithm. It, too, can be defined geometrically—it is the unique real number, e, for which the function f(x)=e^x has a tangent of slope 1 at x=0. Like π, e appears throughout mathematics. For example, e is central in the expression for the normal distribution as well as the definition of entropy. And if you've ever heard of someone talking about log plots ... well, there's e again!

π 
φ
e 

= 3.141592653589793238462643...
= 1.618033988749894848204586...
= 2.718281828459045235360287...

did you see something special?

These three numbers have the curious property that they are almost Pythagorean. In other words, if they are made into sides of a triangle, the triangle is nearly a right-angled triangle (89.1°).

Did you notice how in the 12th decimal point all three numbers have the same digit—9? This accidental similarity generates its own number—the Accidental Similarity Number (ASN).

methods

perl, SVG, Illustrator

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▲ March 14th is π day. Celebrate with this post-modern poster. (...more, BUY ARTWORK)

Happy Pi Day!

Hug π on March 14th and celebrate Pi Day.

Those who favour τ will have to postpone celebrations until July 26th (τ = 2 π).

If you're not into details, you may opt to party on July 22nd, which is π approximation day (π ≈ 22/7).

The posters were inspired by the beautiful AIDS posters by Elena Miska.

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▲ The 4ness of π. Shown here are the first 2,000 4’s in pi. Each digit is formatted based on its 4-ness, which is a measure of how similar its neighbours are to 4. (...more, BUY ARTWORK)

4ness of Pi (π)

A concept created for this visualization, the iness of a number measures how close each of its digits is to a given number, i.

The iness is calculated for each digit from the average of the relative difference between i and the digit's neighbours.

The 4ness of Pi (π) is a specific case of an iness, for i=4.

Thanks to Lance Bailey for suggesting how to measure iness.

example

In the sequence of Pi (π) 3.1415 the neighbours of the 4 are 3, 1, 1 and 5. The relative distances to 4 are -1, -3, -1 and 1. The average, which is the 4ness, of this digit (which is also a 4, coincidentally) is -1.5. The 4ness of each of the other digits is computed identically.

In the iness posters, the 4ness is mapped onto a color and the standard deviation of the differences onto a size.

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▲ The accidental similarity number for π, φ and e created from the first 1,000,000 digits of each number. (...more, BUY ARTWORK)

accidental similarity number

The accidental similarity number is a kind of overlap between numbers. I came up with this concept after creating typographical art about the 4ness of Pi (π).

example

To construct this number for Pi (π), Phi (φ) and e we first write the numbers on top of each other and then identify positions for which the numbers have the same digit.

3.141 … 3589793 … 7067982 … 7019385 … 
1.618 … 8749894 … 1137484 … 5959395 … 
2.718 … 8459045 … 6427427 … 6279434 … 

These digits are then used to create the accidental similarity number. In thise case,

asn(π,φ,e) = 0.979 …

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▲ Circos art depicting π, φ and e. (...more, BUY ARTWORK)

Circos numerical art

Numerology is bogus, but art based on numbers is pretty, in a random non-metaphysical way.

These depictions were generated using my Circos software by Cristian Ilies Vasile and myself.