Tiling the plane with pairwise non-congruent rational triangles

Question

A rational triangle is one in which all side lengths are rational numbers.

Question: Can we tile the Euclidean plane with rational triangles that are pairwise non-congruent? No further requirements on the triangles. Their perimeters are not upper or lower bounded.

The answer seems "no" but I have no proof. It is known that there is no tiling of the plane by pairwise non-congruent triangles all of same area and same perimeter (https://arxiv.org/abs/1711.04504) - not sure if that is relevant here.

Further, we can ask if the plane can be tiled by quadrangles and so forth whose sides are all rational (and if the answer is "yes", add further constraints on diagonals etc.).

Answer 1

First answer: The plane can be tiled as requested. First, we tile the plane with equilateral triangles with side lengths $1$. Now each such triangle can be tiled into two rational-sided triangles in infinitely many different ways: Choose a point on a side which dissects it into lengths $x$ and $1-x$. (Sorry, too lazy to produce a picture :-).) Then we get a tiling of the unit triangle into the two triangles of side lengths $1, x, y$ and $1, 1-x, y$, respectively, where $y^2=1-x+x^2$. Setting $x=(1-t^2)/(1+2t)$ for a rational $t$ yields $y=(1+t+t^2)/(1+2t)$. So any rational $0<t<1$ yields a tiling into two rational-sided triangles.

Second answer: There is even a solution with all sides integers! Extend the equilateral triangle with side lengths $m^2-1$ to the one with side lengths $(m+1)^2-1$. So the new piece is a trapezoid with side lengths $m^2-1$, $2m+1$, $(m+1)^2-1$, $2m+1$. Pythagoras tells us that the diagonal has integral length $m^2+m+1$. So we have an obvious inductive procedure to tile the plane. The following picture should illustrate the procedure, starting with the triangle with side lengths $3=2^2-1$:

Third answer: A minor variant to Rosie F's answer, where we arrive one step earlier at a triangle which is similar to the starting one:

Answer 2

Yes, it is possible; in fact, we can do it entirely with $5-12-13$ right triangles at different scales.

First, note that we can three triangles at scales in the ratio $5:12:13$ to form a $5\times 12$ rectangle:

Then we place scaled copies of these rectangles in (an affine transformation of) the minimal perfect squared square:

                                         

Thereafter, we can add rectangles at scales of $112, 2\cdot 112, 3\cdot 112, 5\cdot 112, 8\cdot 112, \ldots$ in a Fibonacci spiral:

                                         

All that remains is to check that no pair of the rectangle scaling factors here have a ratio of $5/12$, $5/13$, or $12/13$; this is pretty straightforward to verify.

Answer 3

The diagram below shows an alternative approach, using nested Pythagorean triangles whose right angles are all at the origin:

The nested Pythagorean triangles shown here are 5-12-13, 12-16-20 (3-4-5 enlarged by a factor of 4), 16-30-34 (8-15-17 enlarged by a factor of 2) and 30-72-78, which is similar to the starting triangle. The same process of adding three triangles to the starting 5-12-13 may be repeated (enlarged by a factor of 6 and reflected in $y=x$) on the 30-72-78, and so on indefinitely.

This fills a quadrant. The other quadrants may be filled using the same construct, rotated about the origin as needed, and enlarged by factors of (say) 7, 11 and 13. These prime enlargement factors will prevent any triangles in one quadrant being congruent to any in another.

Answer 4

This is overkill for your question, but in Carl Pomerance's paper, On a tiling problem of R. B. Eggleton (Discrete Mathematics 18 (1977), 63–70), he shows that the plane can be tiled using precisely one triangle from each congruence class of rational triangles.

You also asked about quadrangles. For a long time, it was an open question whether the plane can be tiled using exactly one $1\times 1$ square, exactly one $2\times 2$ square, exactly one $3\times 3$ square, etc. This problem was solved affirmatively by Henle and Henle, Squaring the plane, American Mathematical Monthly 115 (2008), 3–12.