drainagesystem 2026-4-20:19:7:15

2026-04-20 19:07:15 -07:00
parent 7bb5d5d762
commit ada462624e
17 changed files with 178 additions and 37 deletions
--- a/Algebra/.obsidian/graph.json
+++ b/Algebra/.obsidian/graph.json
@@ -13,10 +13,10 @@
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--- a/Algebra/.obsidian/workspace.json
+++ b/Algebra/.obsidian/workspace.json
@@ -146,6 +146,20 @@
          {
            "id": "aa4d19e672f564d3",
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+            "state": {
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+              "state": {
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+                "mode": "source",
+                "source": false
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+              "icon": "lucide-file",
+              "title": "Null Vector"
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@@ -163,12 +177,12 @@
            "state": {
              "type": "markdown",
              "state": {
-                "file": "Maximally Linearly Independent.md",
+                "file": "Orthogonal Projections.md",
                "mode": "source",
                "source": false
              },
              "icon": "lucide-file",
-              "title": "Maximally Linearly Independent"
+              "title": "Orthogonal Projections"
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          {
@@ -177,12 +191,12 @@
            "state": {
              "type": "markdown",
              "state": {
-                "file": "Minimal Generating.md",
+                "file": "Cosine Similarity.md",
                "mode": "source",
                "source": false
              },
              "icon": "lucide-file",
-              "title": "Minimal Generating"
+              "title": "Cosine Similarity"
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          {
@@ -191,12 +205,12 @@
            "state": {
              "type": "markdown",
              "state": {
-                "file": "Span.md",
+                "file": "Gram-Schmidt orthogonalization process.md",
                "mode": "source",
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              },
              "icon": "lucide-file",
-              "title": "Span"
+              "title": "Gram-Schmidt orthogonalization process"
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          {
@@ -205,12 +219,54 @@
            "state": {
              "type": "markdown",
              "state": {
-                "file": "Non-Trivial.md",
+                "file": "Inner Products.md",
                "mode": "source",
                "source": false
              },
              "icon": "lucide-file",
-              "title": "Non-Trivial"
+              "title": "Inner Products"
+            }
+          },
+          {
+            "id": "9639dd8dbd93ff0c",
+            "type": "leaf",
+            "state": {
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+              "state": {
+                "file": "Inner Products.md",
+                "mode": "preview",
+                "source": false
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+              "icon": "lucide-file",
+              "title": "Inner Products"
+            }
+          },
+          {
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+            "type": "leaf",
+            "state": {
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+              "state": {
+                "file": "Matrix Multiplication.md",
+                "mode": "source",
+                "source": false
+              },
+              "icon": "lucide-file",
+              "title": "Matrix Multiplication"
+            }
+          },
+          {
+            "id": "bc3c73f8a18068c0",
+            "type": "leaf",
+            "state": {
+              "type": "markdown",
+              "state": {
+                "file": "Matricies.md",
+                "mode": "source",
+                "source": false
+              },
+              "icon": "lucide-file",
+              "title": "Matricies"
            }
          },
          {
@@ -219,16 +275,78 @@
            "state": {
              "type": "markdown",
              "state": {
-                "file": "Vector Set.md",
+                "file": "Bi-linearity.md",
                "mode": "source",
                "source": false
              },
              "icon": "lucide-file",
-              "title": "Vector Set"
+              "title": "Bi-linearity"
+            }
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+          {
+            "id": "d5d74d65f58ce956",
+            "type": "leaf",
+            "state": {
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+              "state": {
+                "file": "Linear Transformation.md",
+                "mode": "source",
+                "source": false
+              },
+              "icon": "lucide-file",
+              "title": "Linear Transformation"
+            }
+          },
+          {
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+            "type": "leaf",
+            "state": {
+              "type": "graph",
+              "state": {},
+              "icon": "lucide-git-fork",
+              "title": "Graph view"
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+            "type": "leaf",
+            "state": {
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+              "state": {
+                "file": "Surjective Transformations.md",
+                "mode": "source",
+                "source": false
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+              "icon": "lucide-file",
+              "title": "Surjective Transformations"
+            }
+          },
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+            "type": "leaf",
+            "state": {
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+              "state": {
+                "file": "Injective Transformations.md",
+                "mode": "source",
+                "source": false
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+              "icon": "lucide-file",
+              "title": "Injective Transformations"
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@@ -389,32 +507,37 @@
      "github-sync:Sync with Remote": false
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-  "active": "aa4d19e672f564d3",
+  "active": "40d18dc580226ba0",
  "lastOpenFiles": [
-    "Null Vector.md",
-    "P-Norms.md",
+    "Bijective Transformations.md",
+    "Injective Transformations.md",
+    "Surjective Transformations.md",
    "Span.md",
-    "Pasted image 20260211175349.png",
-    "Orthogonal Projections.md",
-    "Inner Products.md",
-    "Basis.md",
+    "Subspaces.md",
+    "Matrix Multiplication.md",
+    "Linear Transformation.md",
+    "Transformation.md",
    "Vectors.md",
-    "Generating Set.md",
-    "Supremum Norm.md",
-    "Normed Spaces.md",
-    "Norm.md",
-    "Magnitude.md",
+    "Pasted image 20260420174553.png",
+    "Matrices.md",
+    "Bi-linearity.md",
+    "Basis.md",
+    "Vector Set.md",
+    "Inner Products.md",
+    "Inner Product Spaces.md",
+    "Gram-Schmidt orthogonalization process.md",
+    "Orthogonal Projections.md",
+    "Linear Dependency.md",
+    "Cosine Similarity.md",
    "Cardinality.md",
    "Dimensionality.md",
-    "Vector Set.md",
-    "Maximally Linearly Independent.md",
-    "Vector Spaces.md",
-    "Subspaces.md",
-    "Minimal Generating.md",
-    "Linear Dependency.md",
-    "Linear Combinations.md",
+    "Generating Set.md",
    "Non-Trivial.md",
-    "Sets.md",
-    "Welcome.md"
+    "Orthogonality.md",
+    "Untitled.canvas",
+    "Untitled.base",
+    "Minimal Generating.md",
+    "P-Norms.md",
+    "Pasted image 20260211175349.png"
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 }
--- a/Algebra/Bi-linearity.md
+++ b/Algebra/Bi-linearity.md
@@ -0,0 +1,3 @@
+A property of 2D functions that says both axes are linear no matter what.
+
+%%related to [[Vectors]]%%
--- a/Transformations.md
+++ b/Transformations.md
@@ -0,0 +1 @@
+Bijective transformations are both [[Surjective Transformations|Surjective]] and [[Injective Transformations|Injective]].
--- a/Algebra/Cosine
+++ b/Algebra/Cosine
@@ -0,0 +1 @@
+The cosine similarity is a way to measure the similarity of [[Vectors]]. It is defined as: $$cos(𝐱,𝐲)=\Biggl \langle\frac{𝐱}{‖𝐱‖},\frac{𝐲}{‖𝐲‖} \Biggr \rangle$$
--- a/Algebra/Gram-Schmidt
+++ b/Algebra/Gram-Schmidt
@@ -0,0 +1 @@
+A process that takes a [[Linear Dependency|Linearly Independent]] [[Basis]] and creates an [[Orthogonality|Orthogonal]] [[Basis]] that produces the same [[Vector Spaces|Vector Space]] as the original [[Basis]].
--- a/Transformations.md
+++ b/Transformations.md
@@ -0,0 +1 @@
+Injective [[Transformation|Transformations]] are a type of transformation that distinctly maps between [[Vector Spaces]].
--- a/Algebra/Inner
+++ b/Algebra/Inner
@@ -0,0 +1 @@
+Inner Product Spaces are [[Vector Spaces]] that have an [[Inner Products|Inner Product]]
--- a/Algebra/Inner
+++ b/Algebra/Inner
@@ -1,3 +1,4 @@
 The inner product is a operation that takes in two [[Vectors]] and outputs a number
 where the inner product can be defined like this: $⟨𝐱, 𝐲⟩ =∑^𝑛_{𝑖=1}𝑥_𝑖𝑦_𝑖$
 inner products have the unique property that if two vectors are orthogonal from each other that their inner product is 0.
+(This process is also know as a dot product)
--- a/Transformation.md
+++ b/Transformation.md
@@ -0,0 +1 @@
+A [[Transformation]] is linear if the transformation can be expressed like this: $𝑓(𝑎𝐱 + 𝑏𝐲) = 𝑎𝑓 (𝐱) + 𝑏𝑓 (𝐲)$
--- a/Algebra/Matrices.md
+++ b/Algebra/Matrices.md
@@ -0,0 +1 @@
+Matrices are a multidimensional array of numbers that can be operated on.
--- a/Multiplication.md
+++ b/Multiplication.md
@@ -0,0 +1,2 @@
+Matrix multiplication is an operation on two [[Matrices]] where each row of the first matrix is scaled and summed up by the second.
+![[Pasted image 20260420174553.png]]
--- a/Algebra/Orthogonality.md
+++ b/Algebra/Orthogonality.md
@@ -0,0 +1 @@
+A property of a [[Basis]] that says all elements are orthogonal.
--- a/20260420174553.png
+++ b/20260420174553.png
--- a/Transformations.md
+++ b/Transformations.md
@@ -0,0 +1 @@
+Surjective [[Transformation|Transformations]] are transformations that map one [[Vector Spaces|Vector Space]] onto another but are lossy and can include repeats. 
--- a/Algebra/Transformation.md
+++ b/Algebra/Transformation.md
@@ -0,0 +1 @@
+An operation on [[Vectors]] or [[Matrices]] 
--- a/Algebra/Vectors.md
+++ b/Algebra/Vectors.md
@@ -2,3 +2,5 @@
 Vectors are a finite list of values

 They can also be contained in [[Vector Set]]
+
+(Can also be thought of as a 1 dimensional [[Matrices|Matrix]])
				`@@ -0,0 +1 @@`
				`Bijective transformations are both [[Surjective Transformations\|Surjective]] and [[Injective Transformations\|Injective]].`
				`@@ -0,0 +1 @@`
				`The cosine similarity is a way to measure the similarity of [[Vectors]]. It is defined as: $$cos(𝐱,𝐲)=\Biggl \langle\frac{𝐱}{‖𝐱‖},\frac{𝐲}{‖𝐲‖} \Biggr \rangle$$`
				`@@ -0,0 +1 @@`
				`A process that takes a [[Linear Dependency\|Linearly Independent]] [[Basis]] and creates an [[Orthogonality\|Orthogonal]] [[Basis]] that produces the same [[Vector Spaces\|Vector Space]] as the original [[Basis]].`
				`@@ -0,0 +1 @@`
				`Injective [[Transformation\|Transformations]] are a type of transformation that distinctly maps between [[Vector Spaces]].`
				`@@ -0,0 +1 @@`
				`Inner Product Spaces are [[Vector Spaces]] that have an [[Inner Products\|Inner Product]]`
				`@@ -0,0 +1 @@`
				`A [[Transformation]] is linear if the transformation can be expressed like this: $𝑓(𝑎𝐱 + 𝑏𝐲) = 𝑎𝑓 (𝐱) + 𝑏𝑓 (𝐲)$`
				`@@ -0,0 +1 @@`
				`Matrices are a multidimensional array of numbers that can be operated on.`
				`@@ -0,0 +1 @@`
				`A property of a [[Basis]] that says all elements are orthogonal.`
				`@@ -0,0 +1 @@`
				`Surjective [[Transformation\|Transformations]] are transformations that map one [[Vector Spaces\|Vector Space]] onto another but are lossy and can include repeats.`
				`@@ -0,0 +1 @@`
				`An operation on [[Vectors]] or [[Matrices]]`