06-240/Classnotes For Tuesday, September 12: Difference between revisions
From Drorbn
Jump to navigationJump to search
No edit summary |
No edit summary |
||
(13 intermediate revisions by 7 users not shown) | |||
Line 1: | Line 1: | ||
{{06-240/Navigation}} |
{{06-240/Navigation}} |
||
* PDF notes by [[User:Harbansb]]: [[Media:06-240-0912.pdf]]. |
* PDF notes by [[User:Harbansb]]: [[Media:06-240-0912.pdf|September 12 Notes]]. |
||
* If I have made an error in my notes, or you would like the editable OpenOffice file, feel free to e-mail me at harbansb@msn.com. |
|||
* [http://www.yousendit.com/transfer.php?action=download&ufid=38FF36BF7ED1E1BA September 12 Notes] for re-uploading, please email at jeff.matskin@utoronto.ca |
|||
* PDF notes by [[User:Alla]]: [[Media:MAT_Lect001.pdf|Week 1 Lecture 1 notes]] |
|||
* Below are a couple of lemmata critical to the derivation we did in class - the Professor left this little work to the students: |
|||
::[[Image:Edit1.jpg|200px]] [[Image:Edit2.jpg|200px]] |
|||
=Notes= |
|||
==The Real Numbers== |
|||
The Real Numbers are a set (denoted by <math>\mathbb{R}</math>) along with two binary operations: + (plus) and · (times) and two special elements: 0 (zero) and 1 (one), such that the following laws hold true: |
|||
<math>\mathbb{R}1</math>: <math>\forall a, b\in \mathbb{R}</math> we have <math>a+b=b+a</math> and <math>a\cdot b=b\cdot a</math> (The Commutative Laws) |
|||
<math>\mathbb{R}2</math>: <math>\forall a, b, c\in \mathbb{R}</math> we have <math>(a+b)+c=a+(b+c)</math> and <math>(a\cdot b)\cdot c=a\cdot (b\cdot c)</math> (The Associative Laws) |
|||
<math>\mathbb{R}3</math>: <math>0</math> is an additive unit and <math>1</math> is a multiplicative unit (The Existence of Units/Identities) |
|||
<math>\mathbb{R}4</math>: <math>\forall a\in \mathbb{R} \ \exists b\in \mathbb{R} \mbox{ s.t.} \ a+b=0</math> |
|||
This is incomplete. |
Latest revision as of 17:13, 11 July 2007
|
- PDF notes by User:Harbansb: September 12 Notes.
- If I have made an error in my notes, or you would like the editable OpenOffice file, feel free to e-mail me at harbansb@msn.com.
- September 12 Notes for re-uploading, please email at jeff.matskin@utoronto.ca
- PDF notes by User:Alla: Week 1 Lecture 1 notes
- Below are a couple of lemmata critical to the derivation we did in class - the Professor left this little work to the students:
Notes
The Real Numbers
The Real Numbers are a set (denoted by ) along with two binary operations: + (plus) and · (times) and two special elements: 0 (zero) and 1 (one), such that the following laws hold true:
: we have and (The Commutative Laws)
: we have and (The Associative Laws)
: is an additive unit and is a multiplicative unit (The Existence of Units/Identities)
:
This is incomplete.