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Image:15-344_Note_2.jpg|Answers of sample question |
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Image:15-344_Note_2.jpg|Answers of sample question |
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Image:15-344-Sept17-1.jpg|Class notes page 1 |
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Image:15-344-Sept17-2.jpg|Class notes page 2 |
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Image:15-344-Sept17-3.jpg|Class notes page 3 |
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== Scanned Tutorial Notes for September 17 == |
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15-344 Tutorial 1.jpg|Page 1 |
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Latest revision as of 22:18, 8 October 2015
Welcome to Math 344!
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Edits to the Math 344 web sites no longer count for the purpose of good deed points.
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#
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Week of...
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Notes and Links
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1
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Sep 14
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About This Class, Day One Handout, Tuesday, Hour 3 Handout, Thursday, Tutorial 1 Handout
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2
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Sep 21
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Tuesday, Tutorial 2 Page 1, Tutorial 2 Page 2, Thursday, HW1
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3
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Sep 28
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Tuesday, Class Photo, Tutorial 3 Page 1, Tutorial 3 Page 2, Thursday, HW2
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4
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Oct 5
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Tuesday, Drawing -cubes, Thursday, HW3
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5
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Oct 12
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Tuesday, Tutorial Handout, Thursday, HW4
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6
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Oct 19
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Tuesday, Tutorial Handout, Thursday
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7
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Oct 26
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Term Test on Tuesday, Dijkstra Handout,Thursday,HW5
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8
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Nov 2
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Tuesday, Tutorial Handout, Thursday, HW6, Sunday November 8 is the last day to drop this class
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9
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Nov 9
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Monday-Tuesday is UofT Fall Break, Thursday, HW7
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10
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Nov 16
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Tuesday, Thursday, HW8
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11
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Nov 23
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Tuesday, Thursday, HW9
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12
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Nov 30
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Tuesday, Thursday, HW10
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13
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Dec 7
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Tuesday, FibonacciFormula.pdf, semester ends on Wednesday - no class Thursday
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F
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Dec 11-22
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The Final Exam
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Register of Good Deeds
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Add your name / see who's in!
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Lecture Notes for September 17
DEFINITION 7 Isomorphism A graph is called isomorphic to a graph whenever
there exists a bijection such that we have if and
only if . means they are isomorphic to each other.
- Isomorphism does not mean two things are identical but means they are mathematically the same.
The relationship of isomorphisms:
1. Reflexive: A graph is isomorphic to itself
2. Symmetric: In other words, for every we have
3. Transitive:
CLAIM If two graphs are isomorphic, then they have:
1. same number of vertices
2. same number of edges
3. vertex degrees (valencies) are the same between the two. For example, if one graph has 3 vertices of degree 2, and 2 vertices of degree 1,
then the other graph should have the same
4. same number of subgraphs
5. same number of complements denoted by
- Complement means
DEFINITION 8 Subgraph A subgraph of a graph is a graph such that and
.
- Checking if two graphs are isomorphic is a hard problem
Scanned Lecture Note for September 17
Answers of sample question
Scanned Tutorial Notes for September 17