Q: Are prime numbers more or less common than perfect squares?

Write your answer...

Submit

Related questions

squares of prime numbers

Numbers can't be divided by multiples. They get divided by factors. Factors go into numbers, numbers go into multiples.

No - prime numbers are numbers that can only be divided by 1 and itself. 25 and 49 are examples of perfect squares 5*5 = 25 and 7*7=49

Those would be the squares of prime numbers: 22, 32, 52, etc.

The squares of all prime numbers less than 10.The squares of all prime numbers less than 10.The squares of all prime numbers less than 10.The squares of all prime numbers less than 10.

There are two prime numbers with squares between 100 and 300. These prime numbers are 11 and 13. (112 = 121 and 132 = 169.)

Perfect squares are positive. A smallest negative number doesn't exist. The four smallest prime numbers are 2, 3, 5 and 7. The smallest perfect square would have to be 2^2 x 3^2 x 5^2 x 7^2 or 44,100

The squares of prime numbers greater than 10.

Squares of prime numbers

squares of prime numbers

squares of prime numbers

squares of prime numbers

Yes, numbers can have common prime factors.

Prime squares

They are squares of prime numbers.

They really are not

9631. The sequence consists of the prime numbers which, when their digits are reversed, are perfect squares.

No, all prime numbers are deficient.

Prime numbers have two factors. The sum of their proper divisors is always 1.

88

Prime squares

Prime squares

Squares of prime numbers.

The only numbers which have exactly three factors are perfect squares of prime numbers. That only gives us two results: 5^2 = 25 7^2 = 49 The squares of any other prime numbers are either too small or too large to have two digits. (The next smaller prime number is 3, and the next larger prime number is 11.)

Squares of prime numbers have exactly three factors.

Study guides