06-240/Classnotes For Thursday, September 21: Difference between revisions

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==Scan of Lecture Notes==
A force has a direction and a magnitude.


* PDF file by [[User:Alla]]: [[Media:MAT_Lect004.pdf|Week 2 Lecture 2 notes]]
==<center><u>'''Force Vectors'''</u></center>==
* PDF file by [[User:Gokmen]]: [[Media:06-240-Lecture-21-september.pdf|Week 2 Lecture 2 notes]]
#<math>\mbox{There is a special force vector called 0.}</math>

#<math>\mbox{They can be added.}</math>
==Scan of Tutorial notes==
#<math>\mbox{They can be multiplied by any scalar.}</math>

* PDF file by [[User:Alla]]: [[Media:MAT_Tut002.pdf|Week 2 Tutorial notes]]
* PDF file by [[User:Gokmen]]: [[Media:06-240-tutorial-21-september.pdf|Week 2 Tutorial notes]]

==Force Vectors==
A force has a direction and a magnitude.
# There is a special force vector called 0.
# They can be added.
# They can be multiplied by any scalar.


====''Properties''====
====''Properties''====


<math>\mbox{(convention: }x,y,z\mbox{ }\mbox{ are vectors; }a,b,c\mbox{ }\mbox{ are scalars)}</math>
(convention: <math>x,y,z</math> are vectors; <math>a,b,c</math> are scalars)
#<math> x+y=y+x \ </math>
#<math> x+y=y+x </math>
#<math> x+(y+z)=(x+y)+z \ </math>
#<math> x+(y+z)=(x+y)+z \ </math>
#<math> x+0=x \ </math>
#<math> x+0=x \ </math>
Line 74: Line 83:
<math> (f+g)(t)=f(t)+g(t)\ for\ any\ t\in S </math> <br/>
<math> (f+g)(t)=f(t)+g(t)\ for\ any\ t\in S </math> <br/>
<math> (af)(t)=a\cdot f(t)\ </math>
<math> (af)(t)=a\cdot f(t)\ </math>

====''Scan of Lecture Notes''====

* PDF file by [[User:Alla]]: [[Media:MAT_Lect004.pdf|Week 2 Lecture 2 notes]]

==<center><u>'''Scan of Tutorial notes'''</u></center>==

* PDF file by [[User:Alla]]: [[Media:MAT_Tut002.pdf|Week 2 Tutorial notes]]

Latest revision as of 06:42, 11 July 2007

Scan of Lecture Notes

Scan of Tutorial notes

Force Vectors

A force has a direction and a magnitude.

  1. There is a special force vector called 0.
  2. They can be added.
  3. They can be multiplied by any scalar.

Properties

(convention: are vectors; are scalars)

Definition

Let F be a field "of scalars". A vector space over F is a set V, of "vectors", along with two operations


9.

Examples

Ex.1.







Ex.2.





Ex.3. form a vector space over .
Ex.4.
Ex.5. is a vector space over .
Ex.6.