PlanetMath (more info)
 Math for the people, by the people.
Encyclopedia | Requests | Forums | Docs | Wiki | Random | RSS  
Login
create new user
name:
pass:
forget your password?
Main Menu
sections
Encyclopædia
Papers
Books
Expositions

meta
Requests (204)
Orphanage
Unclass'd
Unproven (490)
Corrections (6)
Classification

talkback
Polls
Forums
Feedback
Bug Reports

downloads
Snapshots
PM Book

information
News
Docs
Wiki
ChangeLog
TODO List
Legalese
About
Owner confidence rating: High Entry average rating: Very high
[parent] minus one times an element is the additive inverse in a ring (Theorem)
Lemma 1   Let $ R$ be a ring (with unity $ 1$) and let $ a$ be an element of $ R$. Then
$\displaystyle (-1)\cdot a = -a$
where $ -1$ is the additive inverse of $ 1$ and $ -a$ is the additive inverse of $ a$.
Proof. Note that for any $ a$ in $ R$ there exists a unique “$ -a$” by the uniqueness of additive inverse in a ring. We check that $ (-1)\cdot a$ equals the additive inverse of $ a$.
$\displaystyle a+(-1)\cdot a$ $\displaystyle =$ $\displaystyle 1\cdot a + (-1)\cdot a,$    by the definition of $\displaystyle 1$  
  $\displaystyle =$ $\displaystyle (1+ (-1))\cdot a,$    by the distributive law  
  $\displaystyle =$ $\displaystyle 0\cdot a,$    by the definition of $\displaystyle -1$  
  $\displaystyle =$ $\displaystyle 0,$    as a result of the properties of zero  

Hence $ (-1)\cdot a$ is “an” additive inverse for $ a$, and by uniqueness $ (-1)\cdot a = -a$, the additive inverse of $ a$. Analogously, we can prove that $ a\cdot (-1) = -a$ as well. $ \qedsymbol$



"minus one times an element is the additive inverse in a ring" is owned by alozano.
(view preamble)

View style:

See Also: zero times an element is zero in a ring

Other names:  $(-1)\cdot a= -a$

This object's parent.

Attachments:
law of signs under multiplication in a ring (Derivation) by alozano
Log in to rate this entry.
(view current ratings)

Cross-references: uniqueness of additive inverse in a ring, inverse, additive, unity, ring
There is 1 reference to this entry.

This is version 6 of minus one times an element is the additive inverse in a ring, born on 2004-03-09, modified 2005-11-24.
Object id is 5674, canonical name is 1cdotAA.
Accessed 3428 times total.

Classification:
AMS MSC13-00 (Commutative rings and algebras :: General reference works )
 16-00 (Associative rings and algebras :: General reference works )
 20-00 (Group theory and generalizations :: General reference works )
Pending Errata and Addenda
None.
[ View all 3 ]
Discussion
Style: Expand: Order:
forum policy

No messages.

Interact
post | correct | update request | prove | add result | add corollary | add example | add (any)