Is 93 a prime number? What are the divisors of 93?

## Parity of 93

93 is an odd number, because it is not evenly divisible by 2.

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## Is 93 a perfect square number?

A number is a perfect square (or a square number) if its square root is an integer; that is to say, it is the product of an integer with itself. Here, the square root of 93 is about 9.644.

Thus, the square root of 93 is not an integer, and therefore 93 is not a square number.

## What is the square number of 93?

The square of a number (here 93) is the result of the product of this number (93) by itself (i.e., 93 × 93); the square of 93 is sometimes called "raising 93 to the power 2", or "93 squared".

The square of 93 is 8 649 because 93 × 93 = 932 = 8 649.

As a consequence, 93 is the square root of 8 649.

## Number of digits of 93

93 is a number with 2 digits.

## What are the multiples of 93?

The multiples of 93 are all integers evenly divisible by 93, that is all numbers such that the remainder of the division by 93 is zero. There are infinitely many multiples of 93. The smallest multiples of 93 are:

• 0: indeed, 0 is divisible by any natural number, and it is thus a multiple of 93 too, since 0 × 93 = 0
• 93: indeed, 93 is a multiple of itself, since 93 is evenly divisible by 93 (we have 93 / 93 = 1, so the remainder of this division is indeed zero)
• 186: indeed, 186 = 93 × 2
• 279: indeed, 279 = 93 × 3
• 372: indeed, 372 = 93 × 4
• 465: indeed, 465 = 93 × 5
• etc.

## How to determine whether an integer is a prime number?

To determine the primality of a number, several algorithms can be used. The most naive technique is to test all divisors strictly smaller to the number of which we want to determine the primality (here 93). First, we can eliminate all even numbers greater than 2 (and hence 4, 6, 8…). Then, we can stop this check when we reach the square root of the number of which we want to determine the primality (here the square root is about 9.644). Historically, the sieve of Eratosthenes (dating from the Greek mathematics) implements this technique in a relatively efficient manner.

More modern techniques include the sieve of Atkin, probabilistic algorithms, and the cyclotomic AKS test.

## Numbers near 93

• Preceding numbers: …91, 92
• Following numbers: 94, 95

### Nearest numbers from 93

• Preceding prime number: 89
• Following prime number: 97
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