Real number: Difference between revisions

Calculus is based in the system of real numbers and their properties.

Classification

Real numbers are classified as rational numbers (denoted by ${\displaystyle Q}$), integers (${\displaystyle Z}$), whole numbers (${\displaystyle W}$), natural numbers, and irrational numbers. In order of inclusion, non-irrational real numbers can be ordered as follows:

${\displaystyle N\subseteq W\subseteq Z\subseteq Q}$

Properties

Distributive Property

${\displaystyle a.(b+c)=a.b+a.c}$

Commutative property of addition

${\displaystyle a+b=b+a}$

Commutative property of multiplication

${\displaystyle a.(b.c)=(a.b).c}$

Aditive identity property

${\displaystyle a+0=a}$

Multiplicative identiy property

${\displaystyle a.1=a}$

Multiplicative identity property

${\displaystyle a.1=a}$

Additive inverse property

${\displaystyle a+(-a)=0}$

Multiplicative inverse property

${\displaystyle a.{\frac {1}{a}}=1}$ where ${\displaystyle a\neq 0}$

Zero property of multiplication

${\displaystyle a.0=0}$

Closure property of addition

${\displaystyle a+b}$ is a real number

Closure property of multiplication

${\displaystyle a.b}$ is a real number

Addition property of equality

If ${\displaystyle a=b}$, then ${\displaystyle a+c=b+c}$

Substitution property

If ${\displaystyle a=b}$, then ${\displaystyle a}$ may be substituted for ${\displaystyle b}$ or conversely

Reflexive (or identity) property of equality

${\displaystyle a=a}$

Symmetric property of equality

If ${\displaystyle a=b}$, then ${\displaystyle b=a}$

Transitive property of equality

If ${\displaystyle a=b}$ and ${\displaystyle b=c}$, then ${\displaystyle a=c}$

Law of trichotomy

Exactly one of the following holds: ${\displaystyle a<b,a=b,a>b}$