12-240/Classnotes for Thursday September 13: Difference between revisions

DBN: Classes: 2012-13: 12-240 / Navigation Additions to this web site no longer count towards good deed points. # Week of... Notes and Links 1 Sep 10 About This Class, Tuesday, Thursday 2 Sep 17 HW1, Tuesday, Thursday, HW1 Solutions 3 Sep 24 HW2, Tuesday, Class Photo, Thursday 4 Oct 1 HW3, Tuesday, Thursday 5 Oct 8 HW4, Tuesday, Thursday 6 Oct 15 Tuesday, Thursday 7 Oct 22 HW5, Tuesday, Term Test was on Thursday. HW5 Solutions 8 Oct 29 Why LinAlg?, HW6, Tuesday, Thursday, Nov 4 is the last day to drop this class 9 Nov 5 Tuesday, Thursday 10 Nov 12 Monday-Tuesday is UofT November break, HW7, Thursday 11 Nov 19 HW8, Tuesday,Thursday 12 Nov 26 HW9, Tuesday , Thursday 13 Dec 3 Tuesday UofT Fall Semester ends Wednesday F Dec 10 The Final Exam (time, place, style, office hours times) Register of Good Deeds Add your name / see who's in!

In the second day of the class, the professor continues on the definition of a field.

Definition of a field

Combined with a part from the first class, we have a complete definition as follow:

A field is a set "F' with two binary operations +,x defind on it, and two special elements 0 ≠ 1 such that

F1: commutative law

${\displaystyle \forall \!\,}$ a, b ${\displaystyle \in \!\,}$ F: a+b=b+a and a.b=b.a

F2: associative law

${\displaystyle \forall \!\,}$ a, b, c ${\displaystyle \in \!\,}$ F: (a+b)+c=a+(b+c) and (a.b).c= a.(b.c)

F3: the existence of identity elements

${\displaystyle \forall \!\,}$ a ${\displaystyle \in \!\,}$ F, a+o=a and a.1=a

F4: existence of inverses

${\displaystyle \forall \!\,}$ a ${\displaystyle \in \!\,}$ F ,${\displaystyle \exists \!\,}$ c, d ${\displaystyle \in \!\ }$ F such that a+c=o and a.d=1

F5: contributive law

${\displaystyle \forall \!\,}$ a, b, c ${\displaystyle \in \!\,}$ F, a.(b+c)=a.b + a.c

Significance

F5 It makes sense to define an operation

-: F -> F called "negation"

For a ${\displaystyle \in \!\,}$ F define -a to be equal that b ${\displaystyle \in \!\,}$ F for which a+b=0, i.e, a+(-a)=0

  Ex: F(5)={0,1,2,3,4}, +,x

Question: What is(-3)? Answer: -3=2

Lecture Notes, upload by Starash

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