zero times an element is zero in a ring

Let $R$ be a ring with zero element $0$ (i.e. $0$ is the additive identity of $R$ ). Then for any element $a\in R$ we have $0\cdot a=a\cdot 0=0$ .

	$\displaystyle 0\cdot a$	$\displaystyle=$	$\displaystyle(0+0)\cdot a,\quad\text{ by definition of zero}$
		$\displaystyle=$	$\displaystyle 0\cdot a+0\cdot a,\quad\text{ by the distributive law}$

Thus $0\cdot a=0\cdot a+0\cdot a$ . Let $b$ be the additive inverse of $0\cdot a\in R$ . Hence:

	$\displaystyle b+0\cdot a=b+(0\cdot a+0\cdot a)$
	$\displaystyle(b+0\cdot a)=(b+0\cdot a)+0\cdot a$
	$\displaystyle 0=0+0\cdot a$
	$\displaystyle 0=0\cdot a$

as claimed. The proof of $a\cdot 0=0$ is done analogously. ∎

Title	zero times an element is zero in a ring
Canonical name	ZeroTimesAnElementIsZeroInARing
Date of creation	2013-03-22 14:13:57
Last modified on	2013-03-22 14:13:57
Owner	alozano (2414)
Last modified by	alozano (2414)
Numerical id	8
Author	alozano (2414)
Entry type	Theorem
Classification	msc 20-00
Classification	msc 16-00
Classification	msc 13-00
Synonym	$0\cdot a=0$
Related topic	1cdotAA
Related topic	AbsorbingElement