What are Irrational Numbers?
Irrational numbers are numbers that can be represented in p/q form. These numbers can not be written as simple fractions, no matter how big the top or bottom numbers are. Their decimal representation goes on forever without repeating, i.e. they are non-terminating and non-recurring decimals.
Real-Life Applications of Irrational Number
Applications of Irrational Numbers : Irrational numbers are a subset of real numbers and are numbers that can not be represented in p/q form. Irrational numbers are very useful in real life. There are many real-life uses and applications of irrational numbers including math, geometry, architecture, physics, engineering, cryptography, and chaos theory.
In this article, we will explore the significance of irrational numbers and their applications in real life.
Table of Content
- What are Irrational Numbers?
- Examples of Irrational Numbers
- Uses / Applications of Irrational Numbers
- Real-Life Applications of Irrational Numbers Explained
- In Mathematics and Geometry
- In Architecture and Design
- In Physics and Engineering
- In Cryptography and Cybersecurity
- In Chaos Theory and Fractals