From 1b769c3988c3396ac4e977a41bb7243082f126e1 Mon Sep 17 00:00:00 2001 From: julian laplace Date: Tue, 22 Jul 2025 13:30:15 +0200 Subject: copy --- index.html | 4 ++-- 1 file changed, 2 insertions(+), 2 deletions(-) diff --git a/index.html b/index.html index 811227a..944cae1 100644 --- a/index.html +++ b/index.html @@ -660,10 +660,10 @@ In the Lambdoma, Barbara Hero also sees the image of Georg Cantor's transfinite set of rational numbers ℚ, which Cantor proved countably - infinite. Consider that while there are infinitely many natural + infinite. Consider that although there are infinitely many natural numbers, we may count our way up to each one, starting from 1. Similarly, we can count the cells in a Lambdoma in a snake-like - pattern starting from 1:1, and thus map all of the rationals to the + pattern starting from 1:1, moving outward diagonally, and thus map all of the rationals to the natural numbers. Though there are infinitely many rational numbers, by their nature they are discrete, countable, and not completely dense. Between any two rational numbers, there lies an uncountable continuity -- cgit v1.2.3-70-g09d2