Find the counter-example of the statement "Every natural number is either prime or composite''.

Open in App

Solution

Counter-example of the given statement
Reasons why $1$ is not a prime:
A prime number is a positive integer that has no factors except $1$ and itself.
It is also a requirement that $1$ and “itself” must not be same. But in the case of $1$ , it is same and thus $1$ is not a prime.
The fundamental theorem of arithmetic states that every integer can be uniquely written as a product of prime factors.
Including $1$ as a prime breaks this theorem as there will be infinte number of ways to represent a number. Example: $2 = 2 \times 1 = 2 \times 1 \times 1 = 2 \times 1^{84654}$
Thus, $1$ is not a prime number.
Reason why $1$ is not a composite:
A composite number is a positive integer that is divisible by other positive integers in addition to $1$ and itself.
But $1$ is not divisible by any other positive integer.
Thus, $1$ is not a composite number.
Therefore, the statement “The number $1$ is neither a prime nor a composite” is a counter-example of the given statement.

Suggest Corrections

Similar questions

State whether the following statement is True or False.

Every natural number is either prime or composite

A \cup B

A \cap B

A

B

A die is thrown once. Find the probability of getting a number that is either composite or prime.

Join BYJU'S Learning Program