Typos

2023-12-09 18:17:22 -08:00
parent a5362a2eb9
commit 6a5e02a8ac
27 changed files with 36 additions and 33 deletions
--- a/Advanced/Euler's
+++ b/Advanced/Euler's
@ -99,7 +99,7 @@ Show that if a sequence $a_n$ has a limit, that limit is unique. \par

 	Let $N = \max(N_A, N_B)$. \par
 	Then, $|a_n - A| + |a_n - B| < 2\epsilon\ \forall n > N$, \par
-	which can be writen as $|a_n - A| + |B - a_n| < 2\epsilon\ \forall n > N$. \par
+	which can be written as $|a_n - A| + |B - a_n| < 2\epsilon\ \forall n > N$. \par

 	By the triangle inequality, we have \par
 	$|a_n - A + B - a_n| \leq |a_n - A| + |B - a_n|$, \par