14-240/Classnotes for Monday September 15

Definition:

           Subtraction: if ${\displaystyle a,b\in F,a-b=a+(-b)}$.
           Division: if ${\displaystyle a,b\in F,a/b=a*b^{-1}}$.

Theorem:

        8. For every ${\displaystyle a}$ belongs to F , ${\displaystyle a*0=0}$.
                   proof of 8: By F3 , ${\displaystyle a*0=a*(0+0)}$;
                               By F5 , ${\displaystyle a*(0+0)=a*0+a*0}$;
                               By F3 , ${\displaystyle a*0=0+a*0}$;
                               By Thm P1 ,${\displaystyle 0=a*0}$.
       
        9. There not exists ${\displaystyle b}$ belongs to F s.t. ${\displaystyle 0*b=1}$;
           For every ${\displaystyle b}$ belongs to F s.t. ${\displaystyle 0*b}$is not equal to ${\displaystyle 1}$.
                   proof of 9: By F3 , ${\displaystyle 0*b=0}$is not equal to ${\displaystyle 1}$.
       
       10. ${\displaystyle (-a)*b=a*(-b)=-(a*b)}$.
     
       11. ${\displaystyle (-a)*(-b)=a*b}$.
      
       12. ${\displaystyle a*b=0iffa=0orb=0}$.
                   proof of 12: <= : By P8 , if ${\displaystyle a=0}$ , then ${\displaystyle a*b=0*b=0}$;
                                     By P8 , if ${\displaystyle b=0}$ , then ${\displaystyle a*b=a*0=0}$.
                                => : Assume ${\displaystyle a*b=0}$ , if a = 0 we have done;
                                     Otherwise , by P8 , ${\displaystyle a}$ is not equal to ${\displaystyle 0}$and we have ${\displaystyle a*b=0=a*0}$;  
                                                 by cancellation (P2) , ${\displaystyle b=0}$.
       

${\displaystyle (a+b)*(a-b)=a^{2}-b^{2}}$.

        proof: By F5 , ${\displaystyle (a+b)*(a-b)=a*(a+(-b))+b*(a+(-b))=a*a+a*(-b)+b*a+(-b)*b=a^{2}-b^{2}}$

Theorem :

        There exists !(unique) iota ${\displaystyle \iota :\mathbb {Z} \rightarrow F}$  s.t.
              1. ${\displaystyle \iota (0)=0,\iota (1)=1}$;
              2. For every ${\displaystyle m,n}$ belong to ${\displaystyle Z}$ , ${\displaystyle \iota (m+n)=\iota (m)+\iota (n)}$;
              3. For every ${\displaystyle m,n}$ belong to ${\displaystyle Z}$ , ${\displaystyle \iota (m*n)=\iota (m)*\iota (n)}$.

        iota(2) = iota(1+1) = iota(1) + iota(1) = 1 + 1;
        iota(3) = iota(2+1) = iota(2) + iota(1) = iota(2) + 1; 
        ......                                                                          
     
        In F2 , ${\displaystyle 27---->iota(27)=iota(26+1)=iota(26)+iota(1)=iota(26)+1=iota(13*2)+1=iota(2)*iota(13)+1=(1+1)*iota(13)+1=0*iota(13)+1=1}$