Home
Archaeology
Astronomy
Biology
Books
Business
Chemistry
Coins
Computers
Conservation
Cooking
Earth Science
Farming
Economics
Finance
Games
Geography
Health Science
History by Date
Hobbies
Law
Mathematics
Medicine
Military Technology
Movies
Music
People
Pharmacology
Philosophy
Physics
Psychology
Religion
Science History
Technology
Sports
Television
Video
Visual Art
Privacy
Contact Us



Vector space example 1

Example I:
Let V be the set of all n-tuples, [v1,v2,v3,...,vn] where vi, for i={1,2,3,...n} is a member of R={real numbers}. Let the field be R, as well.
Define Vector Addition:
For all v, w, in V, define v+w=[v1+w1,v2+w2,v3+w3,...,vn+wn].
Define Scalar Multiplication:
For all a in F and v in V, a*v=[a*v1,a*v2,a*v3,...,a*vn]. Then V is a Vector Space over R.
Proof:
  • 1. If v,w, in V then v+w=[v1+w1,v2+w2,v3+w3,...,vn+wn]. But for all vi, wi, where 
        i={1,2,3,...,n}, vi+wi is in R, since R is a field.  Therefore, for all u,v in V, v+w is    
        in V.
2. If u,v,w in V then u+(v+w)= [u1,u2,u3,...,un]+ [v1+w1,v2+w2,v3+w3,...,vn+wn]= 
        [u1+(v1+w1),u2+(v2+w2),u3+(v3+w3),...,un+(vn+wn)]. But for all ui,vi,wi, where 
        i={1,2,3,...,n}, ui+(vi+wi)=(ui+vi)+wi, since ui,vi,wi in R and R is a field.
        Therefore, u+(v+w)=(u+v)+w, for all u,v,w in V.
3. Since R is a field there exists an additive identity in R, say, 0. Consider 
         [0,0,0,...,0]. Then 0 is in V. But then for all v in V, 0+v= 
         [v1+0,v2+0,v3+0,...,vn+0]=
         [v1,v2,v3,...,vn] since vi in R for all i={1,2,3,...,n}, and 0+vi=vi for all 
         vi where i={1,2,3,...,n}, since R is a field.
4. Since R is a field, there exists for every a in R and element -a in R such that 
        a+(-a)=0. For  v in V=[v1,v2,v3,...,vn],  Consider -v=[-v1,-v2,-v3,...,-vn].
        -v is in R and v+(-v)=[v1+(-v1),v2+(v2),v3+v3+(-v3),...,v+(-vn)]=0, since
        vi+(-vi)=0 for all i={1,2,3,..,n} since R is a field.
5. Since R is a field, for a,b in R a+b=b+a. Then 
        v+w=[v1+w1,v2+w2,v3+w3,...,vn+wn]= [w1+v1,w2+v2,w3+v3,...,wn+vn]
        =w+v, since for each i={1,2,3,...,n} vi+wi=wi+vi, since R is a field.
6. Since R is a field, if a,b in R a*b in R. Then a*v=[a*v1,a*v2,a*v3,...,a*vn]. 
        Then a*vi for i={1,2,3,...,n} is in R. Therefore, a*v in V.
7. Since R is a field, R has a multiplicative identity 1, such that 1*a=a for all 
        a in R.  Then for v in V, 1*v=[1*v1,1*v2,1*v3,...,1*vn]=
        [v1,v2,v3,...,vn]=v, since for all vi, for i={1,2,3,...,n}, 1*vi=*vi.
8. Since R is a field for a,b,c in R a*(b+c)=a*b+a*c. Then for v in V 
        a*(v+w)=a*[v1+w1,v2+w2,v3+w3,...,vn+wn]=
        [a*(v1+w1),a*(v2+w2),a*(v3+w3),...,a*(vn+wn)]=
        [a*v1+aw1,a*v2+a*w2,a*v3+a*w3,...,a*vn+a*wn]=
        a*[v1,v2,v3,...,vn]+a*[w1,w2,w3,...,,wn]=a*v+a*w.
9. Since R is a field, for a,b,c in R a*(b*c)=(a*b)*c. 
        Then a*(b*v)=a*[b*v1,b*v2,b*v3,...,b*vn]=
        [(a*b)v1,(a*b)v2,(a*b)v3,...,(a*b)vn]=(a*b)*v.
10. Since R is a field, for a,b,c in R, (a+b)*c=a*b+a*c. 
        Then (a+b)v=(a+b)[v1,v2,v3,...,vn]=[(a+b)v1,(a+b)v2,(a+b)v3,...,(a+b)vn]=
        [a*v+b*v1,a*v2+a*v2,a*v3+b*v3,...,a*vn+b*n]=[a*v1,a*v2,a*v3,...,a*vn]+
        [b*v1,b*v2,b*v3,...,b*vn]=a*v+b*v.

This vector space is denoted Rn.

See also : Vector space
Copyright 2004. All rights reserved.