Question
29. Non-terminating and non-repeating decimal - IRRATIONAL
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GPT 3.5
An irrational number is a number that cannot be expressed as an exact fraction or ratio of two integers. It is a non-terminating and non-repeating decimal. Some examples of irrational numbers include:
1. √2 (approx. 1.41421356...)
2. π (approx. 3.14159265...)
3. e (approx. 2.71828182...)
4. √5 (approx. 2.23606797...)
5. φ (golden ratio, approx. 1.61803399...)
These numbers go on indefinitely without a pattern or repetition in their decimal representation. They cannot be written as a fraction or a finite decimal.
1. √2 (approx. 1.41421356...)
2. π (approx. 3.14159265...)
3. e (approx. 2.71828182...)
4. √5 (approx. 2.23606797...)
5. φ (golden ratio, approx. 1.61803399...)
These numbers go on indefinitely without a pattern or repetition in their decimal representation. They cannot be written as a fraction or a finite decimal.