Difference between revisions of "Neighborhoods in π"
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| β | * [http://mathonline.wikidot.com/the-real-line-and-the-epsilon-neighbourhood-of-a-real-number The Real Line and The Epsilon Neighbourhood of a Real Number | + | Content obtained and/or adapted from: |
| Β | + | * [http://mathonline.wikidot.com/the-real-line-and-the-epsilon-neighbourhood-of-a-real-number The Real Line and The Epsilon Neighbourhood of a Real Number, mathonline.wikidot.com] under a CC BY-SA license | |
Latest revision as of 15:02, 6 November 2021
The Real Number Line
One way to represent the real numbers is on the real number line as depicted below.
File:Real number line for Algebra book.svg
Real number line
We will now state the important geometric representation of the absolute value with respect to the real number line.
| Definition: If and are real numbers, then we say that the distance from to the origin is the absolute value of , . We say that the distance between and is the absolute value of their difference, namely . |
For example consider the numbers and . There is a distance of in between these numbers because .
Epsilon Neighbourhood of a Real Number
| Definition: Let be a real number and let . The -neighbourhood of the number is the set denoted . Alternatively we can define .
File:Epsilon Umgebung.svg -neighbourhood around () expressed on the real number line
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For example, consider the point , and let . Then .
We will now look at a simple theorem regarding the epsilon-neighbourhood of a real number.
| Theorem 1: Let be a real number. If , then . |
- Proof of Theorem 1: Suppose that for some , , . We know that then if and only if and therefore .
Licensing
Content obtained and/or adapted from:
- The Real Line and The Epsilon Neighbourhood of a Real Number, mathonline.wikidot.com under a CC BY-SA license