Is 9463 a prime number? What are the divisors of 9463?

## Is 9463 a prime number?

Yes, 9463 is a prime number.

Indeed, the definition of a prime numbers is to have only two distinct positive divisors, 1 and itself. A number is a divisor of another number when the remainder of Euclid’s division of the second one by the first one is zero. Concerning the number 9463, the only two divisors are 1 and 9463. Therefore 9463 is a prime number.

As a consequence, 9463 is only a multiple of 1 and 9463.

Since 9463 is a prime number, 9463 is also a deficient number, that is to say 9463 is a natural integer that is strictly larger than the sum of its proper divisors, i.e., the divisors of 9463 without 9463 itself (that is 1, by definition!).

## Parity of 9463

9463 is an odd number, because it is not evenly divisible by 2.

## Is 9463 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 9463 is about 97.278.

Thus, the square root of 9463 is not an integer, and therefore 9463 is not a square number.

Anyway, 9463 is a prime number, and a prime number cannot be a perfect square.

## What is the square number of 9463?

The square of a number (here 9463) is the result of the product of this number (9463) by itself (i.e., 9463 × 9463); the square of 9463 is sometimes called "raising 9463 to the power 2", or "9463 squared".

The square of 9463 is 89 548 369 because 9463 × 9463 = 94632 = 89 548 369.

As a consequence, 9463 is the square root of 89 548 369.

## Number of digits of 9463

9463 is a number with 4 digits.

## What are the multiples of 9463?

The multiples of 9463 are all integers evenly divisible by 9463, that is all numbers such that the remainder of the division by 9463 is zero. There are infinitely many multiples of 9463. The smallest multiples of 9463 are:

• 0: indeed, 0 is divisible by any natural number, and it is thus a multiple of 9463 too, since 0 × 9463 = 0
• 9463: indeed, 9463 is a multiple of itself, since 9463 is evenly divisible by 9463 (we have 9463 / 9463 = 1, so the remainder of this division is indeed zero)
• 18 926: indeed, 18 926 = 9463 × 2
• 28 389: indeed, 28 389 = 9463 × 3
• 37 852: indeed, 37 852 = 9463 × 4
• 47 315: indeed, 47 315 = 9463 × 5
• etc.

## Nearest numbers from 9463

Find out whether some integer is a prime number