Answer:
W cannot form a vector space.
Step-by-step explanation:
Given set is,
[tex][tex]W=\big{\Big[p,q,r,s\Big]^t : -p+3q=5s,p=2s-3r\big}[/tex]\{[p,q,r,s] : -p+3q=5s,p=2s-3r\}[/tex]
where [tex][p,q,r,s]^t[/tex] is a column vector.
To show W is a vector space or not, taking two equations as,
[tex]-p+3q+(0\times r)-5s=0\hfill (1)[/tex]
[tex]p+(0\times q)+3r-2s=0\hfill (2)[/tex]
Adding (1) and (2) we get,
[tex]3q+(0\times r)-5s=0[/tex]
[tex](0\times q)+3r-2s=0[/tex]
Solving,
[tex]\frac{q}{15}=\frac{r}{6}=\frac{s}{9}=k[/tex]
where k is constant.
Gives, q=15k, r=6k, s=9k. Substitute this in (2) we get p=0.
Since we cannot get p=q=r=s=0, given system is not linearly independent. Rather there is no zero vector [(p,q,r,s)=(0,0,0,0)] in the systen so there is no additive identity and W will not form a vector space.
