What are Irrational Numbers?

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....

Examples of Irrational Numbers

Pi (π): Pi is a famous number that tells us how a circle’s size relates to its width around the edge. No matter how many numbers after the decimal point you calculate, pi will never stop or start repeating. Square root of 2 (√2): The length of the diagonal of a square with sides of one unit length is represented by this number, which is irrational. This is a famous example that shows some numbers can’t be written as simple fractions....

Uses / Applications of Irrational Numbers

Irrational numbers are very important in many real-life situations, even though they might seem strange some of their applications include:...

Real-Life Applications of Irrational Numbers Explained

In Mathematics and Geometry...

Conclusion: Real-Life Applications of Irrational Numbers

Irrational numbers have a big effect on the world, affecting things like how secure codes are and how beautiful designs can be done. Their unique properties make them very important tools for many different areas like math, geometry, architecture, physics, engineering, cryptography, and chaos theory....

Applications of Irrational Numbers – FAQs

Define Irrational Numbers....