What is another word for perfect number?

Pronunciation: [pˈɜːfɛkt nˈʌmbə] (IPA)

A "perfect number" is a fascinating mathematical concept that refers to a positive integer. It is the sum of its proper divisors, excluding the number itself. While the term "perfect number" is widely used and recognized, there are a few alternative expressions that convey the same idea. One of them is "complete number", as it signifies the notion of totality achieved when the sum of a number's divisors equals the number itself. Another synonym is "whole number", which emphasizes the idea of a number being complete and lacking nothing. Lastly, the term "excellent number" can also be used to describe a perfect number, highlighting its exceptional nature within the realm of mathematics.

What are the opposite words for perfect number?

There are actually no antonyms for the term "perfect number." This is because a perfect number is a mathematical term that refers to numbers that are equal to the sum of their divisors, except for themselves. An antonym is a word that means the opposite of another word, and in this case, there is no opposite of perfection. However, if we were to look at synonyms, then we could say that an imperfect number could be called a deficient number, which are numbers that are less than the sum of their divisors, or an abundant number, which are numbers that are greater than the sum of their divisors. While they are not exact antonyms, these terms can be used to describe numbers that are not perfect.

What are the antonyms for Perfect number?

Famous quotes with Perfect number

  • The bodies of which the world is composed are solids, and therefore have three dimensions. Now, three is the most perfect number,—it is the first of numbers, for of we do not speak as a number, of we say both, but is the first number of which we say . Moreover, it has a beginning, a middle, and an end.
    Aristotle
  • It has the very commendable aim of contributing towards stressing the cultural side of mathematics. ...there appears the widespread interchange of the definitions of excessive and defective numbers. ...it is stated that Euclid contended that every perfect number is of the form 2(2 -1). It is true that Euclid proved that such numbers are perfect whenever 2 - 1 is a prime number but there seems to be no evidence to support the statement that he contended that no other such numbers exist. ...it is stated that the arithmetization of mathematics began with Weierstrass in the sixties of the last century. The fact that this movement is much older was recently emphasized by H. Wieleitner... it is stated that the of Diophantus and the of Fibonacci meant whole numbers, and... we find the statement that in the pre-Vieta period they were committed to natural numbers as the exclusive field for all arithmetic operations. On the contrary, operations with common fractions appear on some of the most ancient mathematical records.
    Tobias Dantzig

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