irrational number
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- e
- golden ratio
- number
irrational number, any real number that cannot be expressed as the quotient of two integers—that is, p/q, where p and q are both integers. For example, there is no number among integers and fractions that equals Square root of√2. A counterpart problem in measurement would be to find the length of the diagonal of a square whose side is one unit long; there is no subdivision of the unit length that will divide evenly into the length of the diagonal. (See Sidebar: Incommensurables.) It thus became necessary, early in the history of mathematics, to extend the concept of number to include irrational numbers. Irrational numbers such as π can be expressed as an infinite decimal expansion with no regularly repeating digit or group of digits. Together the irrational and rational numbers form the real numbers.
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How were irrational numbers discovered in ancient mathematics?
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Why is the square root of 2 an important irrational number in mathematics?
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What is the difference between rational and irrational numbers?
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How do mathematicians prove that π (pi) is an irrational number?
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What are some real-world applications of irrational numbers?