Antonyms of prime numbers are composite numbers. Prime numbers are integers greater than 1 that have no divisors other than 1 and themselves. Composite numbers, on the other hand, are integers that have divisors other than just 1 and themselves. In simpler terms, composite numbers are the direct opposite of prime numbers.
When dealing with prime numbers, they stand out as unique and indivisible entities, making them crucial in various mathematical calculations like cryptography and factorization. In contrast, composite numbers are formed by multiplying two or more prime numbers together, showcasing their composite nature.
Understanding the distinction between prime and composite numbers is fundamental in number theory and mathematical problem-solving. While prime numbers are the building blocks of number theory and have distinct characteristics, composite numbers provide a contrast by being divisible by numbers other than 1 and themselves.
Example Sentences With Opposite of Prime Number
| Antonym | Sentence with Prime Number | Sentence with Antonym |
|---|---|---|
| Composite | 2 is a prime number | 4 is a composite number |
| Even | 2 is a prime number | 3 is an odd number |
| Divisible | 5 is a prime number | 15 is not divisible by 5 |
| Multiple | 7 is a prime number | 14 is a non-multiple of 7 |
| Factorable | 11 is a prime number | 12 is not factorable |
| Non-Prime | 13 is a prime number | 16 is a non-prime number |
| Product | 17 is a prime number | 34 is not a product of 17 |
| Compositable | 19 is a prime number | 20 is compositable |
| Evenly | 23 is a prime number | 25 is not evenly divided |
| Multiply | 29 is a prime number | 28 is not multiplied by 29 |
| Division | 31 is a prime number | 33 is not a division of 31 |
| Evenness | 37 is a prime number | 38 is lacking evenness |
| Factorize | 41 is a prime number | 42 is not easily factorized |
| Non-Composite | 43 is a prime number | 48 is a non-composite number |
| Part | 47 is a prime number | 50 is not a part of 47 |
| Indivisible | 53 is a prime number | 55 is indivisible by 53 |
| Uncouple | 59 is a prime number | 58 is uncoupled from 59 |
| Indivisibility | 61 is a prime number | 62 does not have indivisibility property |
| Separable | 67 is a prime number | 68 is separable into 67 |
| Singly | 71 is a prime number | 72 is not singly divisible by 71 |
| Uni- | 73 is a prime number | 74 does not have uni- factorization |
| Not Splitting | 79 is a prime number | 78 is not splitting into 79 |
| Non-Even | 83 is a prime number | 84 is a non-even number |
| Standalone | 89 is a prime number | 90 is not standalone prime |
| Uncharged | 97 is a prime number | 96 is not uncharged by 97 |
| Primality | 101 is a prime number | 102 does not possess primality |
| Whole | 103 is a prime number | 104 is a whole number but not prime |
| Unique | 107 is a prime number | 108 is not uniquely 107 |
| Non-Compound | 109 is a prime number | 110 is a non-compound number |
| Simple | 113 is a prime number | 114 is not simple as 113 |
| Indivisible | 127 is a prime number | 130 is indivisible by 127 |
| Can’t Divide | 131 is a prime number | 132 can’t be divided by 131 |
| Cardinal | 137 is a prime number | 140 is a cardinal number but not prime |
| Without Parts | 139 is a prime number | 142 is without parts as 139 cannot be divided |
| Contrary | 149 is a prime number | 150 is contrary to 149 |
| Discrete | 151 is a prime number | 152 is discrete from 151 |
| Not Factor | 157 is a prime number | 158 is not factored by 157 |
| Unbreakable | 163 is a prime number | 162 is unbreakable like 163 |
| Irreducible | 167 is a prime number | 168 is irreducible by 167 |
| Non-Divisible | 173 is a prime number | 174 is non-divisible by 173 |
More Example Sentences With Antonyms Of Prime Number
| Antonym | Sentence with Prime Number | Sentence with Antonym |
|---|---|---|
| Composite | A composite number is a positive integer greater than one that has at least one divisor other than one and itself. | A prime number is a positive integer greater than one that has exactly two distinct positive divisors: one and itself. |
| Even | An even number is a positive integer that is divisible by 2. | An odd number is a positive integer that is not divisible by 2. |
| Divisible | A number is divisible by another number if it can be divided by that number without a remainder. | A number is not divisible by another number if it cannot be divided by that number without a remainder. |
| Multiple | A multiple of a number is the product of that number with an integer. | A non-multiple of a number is a number that is not a product of that number with an integer. |
| Product | The product of two numbers is the result of multiplying the two numbers. | The quotient of two numbers is the result of dividing one number by the other. |
| Fraction | A fraction is a numerical quantity that is not a whole number. | A whole number is a number without fractions or decimals. |
| Infinite | Infinite numbers are numbers that are not finite. | Finite numbers are numbers that are limited in quantity. |
| Zero | Zero is the number that represents no quantity or null value. | Non-zero numbers are any numbers other than zero. |
| Subtraction | Subtraction is the process of taking one number away from another. | Addition is the process of combining two or more numbers. |
| Decrease | To decrease a number is to make it smaller. | To increase a number is to make it larger. |
| Halve | To halve a number is to divide it by two. | To double a number is to multiply it by two. |
| Partial | A partial number is a number that is not whole. | A whole number is a complete number without fractions. |
| Surplus | A surplus number is an extra amount beyond what is needed. | A deficit number is a shortage or a deficiency in amount. |
| Exceed | To exceed a number is to go beyond a certain limit or amount. | To fall short of a number is to not reach the expected limit or amount. |
| Minimum | The minimum number is the smallest number in a set. | The maximum number is the largest number in a set. |
| Maximum | The maximum number is the largest number in a set. | The minimum number is the smallest number in a set. |
| Addition | Addition is the process of combining two or more numbers to find a total. | Subtraction is the process of taking one number away from another. |
| Multiply | To multiply numbers is to perform the operation of repeated addition. | To divide numbers is to perform the operation of splitting into equal parts. |
| Total | The total number is the result of adding two or more numbers together. | The difference between numbers is the result of subtracting one number from another. |
| Diminish | To diminish a number is to make it smaller or less in value. | To increase a number is to make it larger or greater in value. |
| Evenly | To divide numbers evenly is to distribute them without remainder. | Unevenly dividing numbers is to distribute them with remainders. |
| Inverse | The inverse of a number is its opposite or the reciprocal value. | The direct value of a number is the original or unchanged value. |
| Ending | The ending number is the last number in a sequence. | The beginning number is the first number in a sequence. |
| Few | Few numbers represent a small quantity or a limited amount. | Many numbers represent a large quantity or an extensive amount. |
| Digits | Digits are the numerals used to represent numbers in the decimal system. | Letters are characters used to form words in an alphabet. |
| Reduce | To reduce a number is to make it smaller or lessen its value. | To increase a number is to make it larger or raise its value. |
| Shorten | To shorten a number is to make it briefer or less in length. | To extend a number is to make it longer or increase its length. |
| Negligible | Negligible numbers are so small or insignificant as to be not worth considering. | Significant numbers are important or influential and have an impact. |
| Scarce | Scarce numbers are in short supply or insufficient quantity. | Abundant numbers are plentiful or existing in large quantities. |
| Plain | Plain numbers are simple and not decorated or embellished. | Fancy numbers are elaborate or decorative with ornamental details. |
| Lacking | Lacking numbers are insufficient or missing in quantity. | Abundant numbers are plentiful or existing in large quantities. |
| Zeroth | Zeroth number refers to a theoretical or mathematical concept of a number preceding zero. | Non-zeroth numbers are any numbers other than the conceptual zeroth number. |
| Fractional | Fractional numbers are numbers represented as a fraction or part of a whole. | Whole numbers are integers with no fractions or decimal places. |
| Sparse | Sparse numbers are thinly scattered or thinly distributed. | Dense numbers are closely compacted or closely packed together. |
| Limitless | Limitless numbers are unrestricted in quantity or endless in extent. | Limited numbers have boundaries or restrictions on their quantity. |
| Depreciate | To depreciate a number is to decrease its value over time. | To appreciate a number is to increase its value over time. |
Outro
Antonyms of prime number, opposite of prime number and prime number ka opposite word are the same thing. In conclusion, composite numbers are the opposite of prime numbers. While prime numbers have only two factors (1 and the number itself), composite numbers have multiple factors in addition to 1 and the number itself. This distinction is key in understanding the fundamental properties of numbers and plays a crucial role in various mathematical applications.
Recognizing composite numbers as the antithesis of prime numbers can aid in identifying factors, simplifying fractions, and solving problems that involve the decomposition of numbers. By grasping the concept of composite numbers, individuals can enhance their number sense and computational skills, leading to improved mathematical proficiency.
In summary, grasping the concept of composite numbers as the opposite of prime numbers is essential for navigating the world of mathematics. Understanding their differences allows for a deeper comprehension of number theory and lays the foundation for more advanced mathematical concepts.