There are: 3 is a prime and it is the square of √3.
There are no primes that are perfect squares since, by definition, a perfect square is of the form n2 = n*n. And for n > 1 , n is a factor of n2. If n = 1, then n2 = 1 which is not a prime since it is only divisible by 1.
Prime numbers cannot be square numbers.
No, there are no prime numbers that are also square numbers. Prime numbers are only divisible by 1 and themselves, while square numbers have integer square roots. Since the square root of a prime number is not an integer, a prime number cannot be a square number.
They're not. Prime numbers and square numbers are different things.
An oxymoron. Prime numbers can't be square. Square numbers can't be prime. You can square a prime number: 3 x 3 - 32 = 9
No.
Prime numbers cannot be square numbers.
No, there are no prime numbers that are also square numbers. Prime numbers are only divisible by 1 and themselves, while square numbers have integer square roots. Since the square root of a prime number is not an integer, a prime number cannot be a square number.
They're not. Prime numbers and square numbers are different things.
An oxymoron. Prime numbers can't be square. Square numbers can't be prime. You can square a prime number: 3 x 3 - 32 = 9
There are no prime numbers that are square numbers
No.
A square number, by definition, cannot be a prime so the answer is there are no such numbers.A square number, by definition, cannot be a prime so the answer is there are no such numbers.A square number, by definition, cannot be a prime so the answer is there are no such numbers.A square number, by definition, cannot be a prime so the answer is there are no such numbers.
no, impossible.
Because square numbers have more than two factors whereas prime numbers have only two factors
Absolutely not. A square number has an integer square root, so by definition it has at least one factor. Prime numbers have no factors
None because square numbers have more than two factors
Square numbers can't be prime. They have too many factors.