Antonyms for prime numbers refer to integers that are not prime, meaning they can be divided by numbers other than 1 and themselves. In mathematics, a prime number is a natural number greater than 1 that cannot be formed by multiplying two smaller natural numbers. Therefore, antonyms for prime numbers are composite numbers that can be divided evenly by numbers other than 1 and themselves.
Unlike prime numbers that have only two factors, 1 and the number itself, composite numbers have multiple factors aside from 1 and the number itself. This property makes them distinct from prime numbers in the realm of number theory. Antonyms for prime numbers play a crucial role in various mathematical applications and calculations, providing a contrast to the unique characteristics of prime numbers.
Understanding antonyms for prime numbers is essential for establishing a comprehensive grasp of number theory and arithmetic. By recognizing the distinctions between prime and composite numbers, mathematicians and students can deepen their understanding of fundamental mathematical concepts. Exploring the properties and relationships of antonyms for prime numbers contributes to a broader comprehension of the diverse nature of integers within the field of mathematics.
35 Antonyms for PRIME NUMBER With Sentences
Here’s a complete list of opposite for prime number. Practice and let us know if you have any questions regarding PRIME NUMBER antonyms.
| Antonym | Sentence with Prime Number | Sentence with Antonym |
|---|---|---|
| Composite | A prime number is divisible only by 1 and itself. | A composite number has factors other than 1 and itself. |
| Even | 2 is the only even prime number. | All prime numbers other than 2 are odd. |
| Divisible | A prime number cannot be evenly divided by any other number. | An antonym of a prime number is a number that can be evenly divided by other numbers. |
| Non-prime | 3, 5, and 7 are examples of prime numbers. | 6, 9, and 12 are examples of non-prime numbers. |
| Multiply | The property of multiplying two prime numbers results in another prime number. | The property of multiplying two non-prime numbers results in a composite number. |
| Unitary | The simplest form of a number is a prime number. | The complex form of a number is a unitary number. |
| Reducible | A prime number is not reducible to simpler factors. | A reducible number can be factored into smaller components. |
| Incomposite | A prime number is an incomposite number and cannot be factored. | An incomposite number can be broken down into its factors. |
| Partite | Prime numbers are indivisible and do not have multiple parts. | Partite numbers have multiple factors and can be divided into parts. |
| Fractional | Prime numbers cannot be represented as a fraction. | Fractional numbers can be expressed as a ratio of two integers. |
| Evenly | Prime numbers do not divide evenly into other numbers. | Non-prime numbers divide evenly into various factors. |
| Amicable | Prime numbers do not have any amicable pairs. | Non-prime numbers can be part of amicable pairs. |
| Primeless | The set of natural numbers contains both prime and composite numbers. | The set of natural numbers also includes primeless numbers. |
| Recomposable | Prime numbers cannot be recomposed from simpler factors. | Recomposable numbers can be broken down into distinct components. |
| Multiplicative | The product of prime numbers is also a prime number. | The multiplication of non-prime numbers may result in a composite number. |
| Uniform | Prime numbers are uniformly indivisible into smaller parts. | Uniform numbers can be evenly divided into equal segments. |
| Soluble | Prime numbers are unsolvable in terms of further factorization. | Soluble numbers can be broken down into multiple factors. |
| Simplified | A prime number is a simplified form that cannot be further reduced. | A non-prime number may need to be simplified by factorization. |
| Independent | A prime number is independent of factors other than 1 and itself. | An independent number can be influenced by various factors. |
| Sole | 2 is the sole even prime number. | There are multiple odd non-prime numbers. |
| Unbroken | A prime number remains unbroken in its indivisible form. | An unbroken number can be divided into multiple parts. |
| Disconnected | Prime numbers are disconnected from further factorization. | Disconnected numbers can be fractioned into distinct components. |
| Fragmented | Prime numbers are not fragmented into smaller parts. | Fragmented numbers are divided into multiple fragments. |
| Dissectible | A prime number is indivisible and not dissectible into smaller parts. | A dissectible number can be separated into distinct sections. |
| Unitary | A unitary number is the opposite of a prime number. | A prime number is not a unitary number. |
| Surd | Prime numbers are not surd numbers with irrational roots. | Non-prime numbers may include surd numbers with irrational roots. |
| Fraction | Prime numbers are whole numbers and not fractions. | Fractions consist of non-whole numbers and are not prime. |
| Integral | Prime numbers are indivisible integers. | Integrals can be composed of components and are not prime. |
| Unsimple | Prime numbers are the simplest form of integers. | Unsimple numbers can be complex and are not prime. |
Final Thoughts about Antonyms of PRIME NUMBER
In mathematics, prime numbers are numbers that are only divisible by 1 and themselves. On the other hand, composite numbers have multiple factors besides 1 and the number itself. By identifying the antonyms for prime numbers, such as composite numbers, divisible numbers, and non-prime numbers, we can better understand the fundamental principles of number theory. Recognizing these distinctions can aid in various mathematical calculations, including factorization, prime factorization, and determining the uniqueness of a number’s factorization. Understanding the opposites of prime numbers enriches our comprehension of number properties and helps us tackle different mathematical problems with confidence and clarity.