Known for thousands of years, hundreds of proofs of the Pythagorean theorem have been published, including one by U.S. President James Garfield. Here I animate three of my favorites. Each shows that the sum of the squares of the lengths of the legs of a right triangle equals the square of the length of its hypotenuse,

a^2+b^2=c^2.

Without loss of generally, assume a \le b < c. You may need to click or tap the figures to trigger the animations.

Shuffle

Quadruplicate the triangle, and arrange the copies along the edges of a square so they bound a rotated square of area c^2 (colored cyan in the animation below). Shuffle the triangles to form two rectangles that bound two smaller squares of size a^2 and b^2. Since shuffling does not change the exposed (cyan) area, a^2+b^2=c^2

Rescale

Triplicate the triangle, rescale one copy by the hypotenuse length c, a second by the leg length a, and a third by the leg length b. Flip the leg triangles and join all 3 copies to form a rectangle with opposite sides of length a^2+b^2=c^2.

Unfold

Guided by a perpendicular from the right angle to the hypotenuse, unfold the triangle so the original is surrounded by 3 similar triangles. The sum of the areas of the unfolded leg triangles equals the area of the unfolded hypotenuse triangle, and since the areas are proportional to the those of the corresponding squares, a^2+b^2=c^2.

Since childhood I have been fascinated by M. C. Escher‘s extraordinary graphics. Escher once wrote, “I never feel quite at home among my artist colleagues; what they are striving for, first and foremost is “beauty” … I guess the thing I mainly strive after is wonder … .”

In 1945 Escher produced a lithograph called “Balcony“, of buildings overlooking a Malta harbor, whose center is enlarged four times compared to its edges to emphasize a single balcony. Working without computers, Escher accomplished the inflation by first manually constructing a blowup of a square grid.

Later he imagined “a cyclic expansion or bulge, without beginning or end”. The result was his amazing 1956 lithograph “Print Gallery“, one of his favorite prints, and one of two that I have on the walls beside me as I write this. A young man in a print gallery gazes up at a print of a Malta harbor town, and as we follow his gaze rightward the scene enlarges until we see a woman looking out a window above the entrance to the print gallery containing the man — who is simultaneously inside and outside it!

Like the circular bulge of “Balcony”, Escher accomplished the cyclic bulge of “Print Gallery” by first transforming a grid of squares, intuitively ensuring that right angles were mapped to right angles. The transformed squares became very small near the print’s center, and Escher left that part blank.

In 2003, mathematicians B. de Smit and H. W. Lenstra Jr. published a refinement and extension of “Print Gallery” that filled the center with an infinite regress of rotated and scaled down copies of itself. Using complex variables

z = x + i y = r e^{i \theta} \in \mathbb{C},

and noting that moving 256 units in the original square grid corresponded to moving 22.6 units and rotating 158° in the cyclic bulge, they defined the conformal mapping

h(z) = z^\alpha = \exp(\alpha \log z)

by

h^{-1}(256)\approx 22.6\, e^{-i\, 158^\circ},

which has the principle branch solution

\alpha \approx 1.33\,e^{-i\,41.4^\circ}.

Working with artists and a computer programmer, they then created the final figure below, which would likely have pleased Escher.

Conformal map underlying the cyclic bulge (and inward spiral) of Escher’s “Print Gallery” depends on the complex constant \alpha in the exponent.

Escher’s “Print Gallery” as refined and extended by de Smit and Lenstra. The observer is both inside and outside the print!

Introduction

The Euler-Napier-Bernoulli constant e =2.71828\ldots is not just irrational, it is transcendental, as first proved by Charles Hermite in 1873. Inspired by the work of Mathologer (Burkard Polster with Marty Ross), here I offer an elementary proof of e‘s transcendence. As warmup, I first present a well-known proof of its irrationality while hinting at the proof of its transcendence.

e is irrational

The infinite series expansion of the exponential function

e^x = 1 + x + \frac{x^2}{2!} + \frac{x^3}{3!} + \cdots + \frac{x^m}{m!} + \cdots

implies the Euler-Napier-Bernoulli constant

e = 1 + 1 + \frac{1}{2!} + \frac{1}{3!} + \cdots + \frac{1}{m!} + \cdots .

By way of contradiction, assume e can be written as a root of the linear polynomial

be-a = 0

for positive integers a,b \in \mathbb{Z}^+ or, equivalently, that e is the rational number

e = \frac{a}{b}.

Use b as a cutoff to separate e‘s infinite series expansion into a \color{blue}\text{large body} large body and a \color{red}\text{small tail}

\frac{a}{b} = e = \color{blue} 1 + 1 + \frac{1}{2!} + \frac{1}{3!} + \cdots + \frac{1}{b!} \color{red}+ \frac{\delta}{b!}\color{black},

where

\begin{aligned}0 < \delta &= \frac{b!}{(b+1)!} + \frac{b!}{(b+2)!} + \frac{b!}{(b+3)!} + \cdots \\&= \frac{1}{b+1} + \frac{1}{(b+1)(b+2)} + \frac{1}{(b+1)(b+2)(b+3)} + \cdots \\&< \frac{1}{b+1} + \frac{1}{(b+1)^2} + \frac{1}{(b+1)^3} + \cdots \\&= \frac{1/(b+1)}{1-1/(b+1)} = \frac{1}{b} \le 1\end{aligned}

using the sum formula for an infinite geometric series. But

\frac{a}{b} = e = \frac{b!\left(1 + 1 + \frac{1}{2!} + \frac{1}{3!} + \cdots + \frac{1}{b!}\right) + \delta}{b!} \color{red} = \frac{N^\prime + \delta}{N}

and so

a\color{red}N\color{black}-b\color{red}N^\prime\color{black}-b\color{red}\delta\color{black}=0

and

a(b-1)!-b!\left(1 + 1 + \frac{1}{2!} + \frac{1}{3!} + \cdots + \frac{1}{b!}\right)-\delta = 0,

which is impossible, as all terms are integers accept 0 < \delta <1. Hence e is not the root of a linear polynomial with integer coefficients and, equivalently, is an irrational number.

e is transcendental

First consider the polynomial

f(x) = \color{red}x^{p-1}\color{black}(x-1)^p(x-2)^p \cdots (x-n)^p,

where n > 1 and p is a large prime. As |x-m|\le n on the interval x\in [0,n], it is bounded by

|f| \le \color{red}n^{p-1}\color{black}n^p n^p \cdots n^p = n^{np+p-1},

and its expansion begins

\begin{aligned}f(x) &= (-1)^p(-2)^p\cdots (-n)^p \color{red}x^{p-1}\color{black} + \mathcal{O}(x^{p})\\&= (-1)^{np}(n!)^p \color{red}x^{p-1}\color{black} + \mathcal{O}(x^{p}).\end{aligned}

Use the factorial integral

\int_0^\infty \hspace{-0.8em}\text{d}x \,e^{-x} x^m = m!

to expand powers of e like

e^m = \frac{ \int_0^\infty \hspace{-0.4em}\text{d}x \,e^{m-x} f(x)}{ \int_0^\infty \hspace{-0.4em}\text{d}x \,e^{-x} f(x)} \color{red}=\ \frac{N_m + \delta_m}{N}\color{black},

where

\begin{aligned}N &=\frac{1}{(p-1)!} \int_0^\infty \hspace{-0.8em}\text{d}x \,e^{-x} f(x)\\&= (-1)^{np}(n!)^p + M p,\end{aligned}

where M \in \mathbb{Z} and so N \in \mathbb{Z}, and if p > n then N\neq 0, as p divides the second term but not the first,

\begin{aligned}N_m &=\frac{1}{(p-1)!} \int_m^\infty \hspace{-0.8em}\text{d}x \,e^{m-x} f(x)\\&= \frac{1}{(p-1)!} \int_0^\infty \hspace{-0.8em}\text{d}y \,e^{-y} f(y+m) = M^\prime p,\end{aligned}

where M^\prime \in \mathbb{Z}, as f(y+m) has a factor of y^p enabling the integral to absorb the denominator, and

\begin{aligned}\delta_m &=\frac{1}{(p-1)!}\int_0^m \hspace{-0.8em}\text{d}x \,e^{m-x}f(x)\\&\le \frac{1}{(p-1)!} \color{red}e^m\int_0^\infty \hspace{-0.8em}\text{d}x \,e^{-x}\color{blue} n^{np+p-1}\color{black}\\&=\frac{1}{(p-1)!} \color{red}e^m\color{blue}\frac{n^{(n+1)p}}{n}\color{black}\\&\le \frac{1}{(p-1)!} \color{red}e^n\color{blue} n^{(n+1)p}\color{black} = \frac{c\,d^p}{(p-1)!} \rightarrow 0,\end{aligned}

as p\rightarrow \infty, where c = e^n and d = n^{n+1}>1.

Now, by way of contradiction, assume e can be written as a root of the polynomial

a_n e^n+a_{n-1}e^{n-1}+\cdots+a_0 = 0

of lowest degree with a_m\in\mathbb{Z}, for m=1,\ldots,n, and a_0\neq 0. Replace powers of e to get

a_n \left(\frac{N_n+\delta_n}{N}\right)+a_{n-1}\left(\frac{N_{n-1}+\delta_{n-1}}{N}\right)+\cdots+a_0 = 0

and so

a_0 \color{red}N\color{black}+(a_1 \color{red}N_1\color{black} + \cdots + a_n \color{red}N_n\color{black}) + (a_1 \color{red}\delta_1\color{black} + \cdots + a_n\color{red}\delta_n\color{black}) = 0,

which is impossible, as the N and N_m terms are integers but the \delta_m terms are arbitrarily small. (For large enough p >|a_0| and p >n, p does not divide a_0 N but does divide N_m, and the integer parts cannot vanish.) Hence e is not the root of a polynomial with integer coefficients and, therefore, is a transcendental number.