vault backup: 2025-01-07 18:34:44

2025-01-07 18:34:44 -07:00 · 2025-01-07 18:34:44 -07:00 · d9aeb6320a
commit d9aeb6320a
parent 236165cdd2
2 changed files with 8 additions and 29 deletions
--- a/.obsidian/plugins/obsidian-git/data.json
+++ b/.obsidian/plugins/obsidian-git/data.json
@ -1,27 +0,0 @@
-{
-  "commitMessage": "vault backup: {{date}}",
-  "autoCommitMessage": "vault backup: {{date}}",
-  "commitDateFormat": "YYYY-MM-DD HH:mm:ss",
-  "autoSaveInterval": 5,
-  "autoPushInterval": 0,
-  "autoPullInterval": 5,
-  "autoPullOnBoot": true,
-  "disablePush": false,
-  "pullBeforePush": true,
-  "disablePopups": false,
-  "listChangedFilesInMessageBody": false,
-  "showStatusBar": true,
-  "updateSubmodules": false,
-  "syncMethod": "merge",
-  "customMessageOnAutoBackup": false,
-  "autoBackupAfterFileChange": false,
-  "treeStructure": false,
-  "refreshSourceControl": true,
-  "basePath": "",
-  "differentIntervalCommitAndPush": false,
-  "changedFilesInStatusBar": false,
-  "showedMobileNotice": true,
-  "refreshSourceControlTimer": 7000,
-  "showBranchStatusBar": true,
-  "setLastSaveToLastCommit": false
-}
--- a/education/math/MATH1210
+++ b/education/math/MATH1210
@ -9,13 +9,19 @@ Every mathematical function can be thought of as a set of ordered pairs, or an i
 	- $f(2.1) = 9.61$
 	- $f(2.01) = 9.061$
 	- $f(2.0001) = 9.0006$
-	We can note that the smaller the distance of the input value $x$ to $2$, the smaller the distance of the output to $9$. This is most commonly described in the terms "As $x$ approaches $2$, $f(x)$ approaches $9$. $ \rarrow$"
+	We can note that the smaller the distance of the input value $x$ to $2$, the smaller the distance of the output to $9$. This is most commonly described in the terms "As $x$ approaches $2$, $f(x)$ approaches $9$", or "As $x \to 2$, $f(x) \to 9$."
+
+Limits are valuable because they can be used to describe a point on a graph, even if that point is not present.
+# Standard Notation
+The standard notation for a limit is:
+$$ \lim_{x \to a} f(x) = L $$
+- As $x$ approaches $a$, the output of $f(x)$ draws closer to $L$.
 # Definitions

 | Term                  | Definition                                                                    |
 | --------------------- | ----------------------------------------------------------------------------- |
 | Well behaved function | A function that is continuous, has a single value, and is defined everywhere. |
-|                       |                                                                               |
+