From 2a0eb1adc2af42be618ff616c1e3c72cf636d069 Mon Sep 17 00:00:00 2001 From: =?UTF-8?q?Sven=20Sch=C3=B6nherr?= Date: Wed, 25 Jun 1997 16:18:06 +0000 Subject: [PATCH] typo fixed --- .../Optimisation/Optimisation_ref/Min_circle_2_traits.tex | 2 +- .../basic/Optimisation/Optimisation_ref/Min_circle_2_traits.tex | 2 +- 2 files changed, 2 insertions(+), 2 deletions(-) diff --git a/Packages/Min_circle_2/doc_tex/Optimisation/Optimisation_ref/Min_circle_2_traits.tex b/Packages/Min_circle_2/doc_tex/Optimisation/Optimisation_ref/Min_circle_2_traits.tex index 05bedcca44c..beccb595c52 100644 --- a/Packages/Min_circle_2/doc_tex/Optimisation/Optimisation_ref/Min_circle_2_traits.tex +++ b/Packages/Min_circle_2/doc_tex/Optimisation/Optimisation_ref/Min_circle_2_traits.tex @@ -103,7 +103,7 @@ The following predicate is only needed, if the member function \ccDefinition An object of the class \ccClassName\ is a circle in two-dimensional -euclidean plane $\E_2$. Its boundary splits the plane into a bounded +Euclidean plane $\E_2$. Its boundary splits the plane into a bounded and an unbounded side. By definition, an empty \ccClassName\ has no boundary and no bounded side, i.e.\ its unbounded side equals the whole plane $\E_2$. A \ccClassName\ containing exactly one point~$p$ diff --git a/Packages/Min_circle_2/doc_tex/basic/Optimisation/Optimisation_ref/Min_circle_2_traits.tex b/Packages/Min_circle_2/doc_tex/basic/Optimisation/Optimisation_ref/Min_circle_2_traits.tex index 05bedcca44c..beccb595c52 100644 --- a/Packages/Min_circle_2/doc_tex/basic/Optimisation/Optimisation_ref/Min_circle_2_traits.tex +++ b/Packages/Min_circle_2/doc_tex/basic/Optimisation/Optimisation_ref/Min_circle_2_traits.tex @@ -103,7 +103,7 @@ The following predicate is only needed, if the member function \ccDefinition An object of the class \ccClassName\ is a circle in two-dimensional -euclidean plane $\E_2$. Its boundary splits the plane into a bounded +Euclidean plane $\E_2$. Its boundary splits the plane into a bounded and an unbounded side. By definition, an empty \ccClassName\ has no boundary and no bounded side, i.e.\ its unbounded side equals the whole plane $\E_2$. A \ccClassName\ containing exactly one point~$p$