# Check if number is prime number

I would just like to ask if this is a correct way of checking if number is prime or not? because I read that 0 and 1 are NOT a prime number.

``````int num1;

Console.WriteLine("Accept number:");
if (num1 == 0 || num1 == 1)
{
Console.WriteLine(num1 + " is not prime number");
}
else
{
for (int a = 2; a <= num1 / 2; a++)
{
if (num1 % a == 0)
{
Console.WriteLine(num1 + " is not prime number");
return;
}

}
Console.WriteLine(num1 + " is a prime number");
}
``````
-
Yes, a prime number is defined to be greater than one. –  Matthew Watson Apr 1 '13 at 12:10
`would just like to ask if this is a correct way of checking` - yes. Maybe you wanted to ask if it is a efficient way of checking? –  Ilya Ivanov Apr 1 '13 at 12:10
so is it efficient then?? –  user1954418 Apr 1 '13 at 12:12
Nope. Trivially, you can start `a` at 3 and increment it by 2 instead of 1 (and handle 2 being prime as a special case). But see here: en.wikipedia.org/wiki/Sieve_of_Eratosthenes –  Matthew Watson Apr 1 '13 at 12:17
@MatthewWatson A sieve is good if one wants to generate all the primes up to some limit, but to check whether one number is prime, it's useless. –  Daniel Fischer Apr 1 '13 at 19:48

``````int num1;

Console.WriteLine("Accept number:");
if(isPrime(num1))
{
Console.WriteLine("It is prime");
}
else
{
Console.WriteLine("It is not prime");
}

public static boolean isPrime(int number)
{
int boundary = Math.Floor(Math.Sqrt(number));

if (number == 1) return false;
if (number == 2) return true;

for (int i = 2; i <= boundary; ++i)  {
if (number % i == 0)  return false;
}

return true;
}
``````

I changed `number / 2` to `Math.Sqrt(number)` because from in wikipedia, they said:

This routine consists of dividing n by each integer m that is greater than 1 and less than or equal to the square root of n. If the result of any of these divisions is an integer, then n is not a prime, otherwise it is a prime. Indeed, if n = a*b is composite (with a and b ≠ 1) then one of the factors a or b is necessarily at most square root of n

-
Good solution. Note though that you are recalculating the square root every time through the loop. –  Eric Lippert Apr 1 '13 at 14:49
Also, why the ceiling instead of the floor? –  Eric Lippert Apr 1 '13 at 14:50
Consider three cases. If the number is actually prime then it doesn't matter when you stop at the ceiling or the floor; either way you are going to deduce correctly that it is prime. Now suppose that it is composite and a perfect square. Then the ceiling and the floor are equal, so again, it doesn't matter which you choose because they are the same. Now suppose that it is composite and not a perfect square. Then it has a factor that is less than its square root, so the floor is correct. No matter which of these three cases we're in, you can take the floor. –  Eric Lippert Apr 1 '13 at 15:25
Note that this argument requires that my second claim is true: that for every perfect square, the ceiling and floor of the square root are equal. If Math.Sqrt ever says that the square root of 10000 is 99.9999999999999 instead of 100.0000000000000, my claim is wrong and you should use the ceiling. Are there any cases where my claim is wrong? –  Eric Lippert Apr 1 '13 at 15:27
So lets think about other ways that your algorithm is inefficient. Suppose you are checking a large prime. You check to see if it is divisible by 2 first. It isn't. Then you check 3. It isn't. Then you check 4. Why are you checking 4? If it is divisible by 4 then it must have already been divisible by 2. You then check 5. Then 6. Again, why check 6? It can only be divisible by 6 if it is divisible by 2 and 3, which you've already checked. –  Eric Lippert Apr 1 '13 at 15:35

Here's a good example. I'm dropping the code in here just in case the site goes down one day.

``````using System;

class Program
{
static void Main()
{
//
// Write prime numbers between 0 and 100.
//
Console.WriteLine("--- Primes between 0 and 100 ---");
for (int i = 0; i < 100; i++)
{
bool prime = PrimeTool.IsPrime(i);
if (prime)
{
Console.Write("Prime: ");
Console.WriteLine(i);
}
}
//
// Write prime numbers between 10000 and 10100
//
Console.WriteLine("--- Primes between 10000 and 10100 ---");
for (int i = 10000; i < 10100; i++)
{
if (PrimeTool.IsPrime(i))
{
Console.Write("Prime: ");
Console.WriteLine(i);
}
}
}
}
``````

Here is the class that contains the `IsPrime` method:

``````using System;

public static class PrimeTool
{
public static bool IsPrime(int candidate)
{
// Test whether the parameter is a prime number.
if ((candidate & 1) == 0)
{
if (candidate == 2)
{
return true;
}
else
{
return false;
}
}
// Note:
// ... This version was changed to test the square.
// ... Original version tested against the square root.
// ... Also we exclude 1 at the end.
for (int i = 3; (i * i) <= candidate; i += 2)
{
if ((candidate % i) == 0)
{
return false;
}
}
return candidate != 1;
}
}
``````
-

using Soner code :

run until `i` is equal to `Math.Ceiling(Math.Sqrt(number))` that is the trick

``````boolean isPrime(int number)
{

if (number == 1) return false;
if (number == 2) return true;

for (int i = 2; i <= Math.Ceiling(Math.Sqrt(number)); ++i)  {
if (number % i == 0)  return false;
}

return true;

}
``````
-
+1 . . . for efficiency! –  AppDeveloper Apr 1 '13 at 12:17
Why did you wrote `Math.Sqrt(number)+1` ? –  Soner Gönül Apr 1 '13 at 12:29
@SonerGönül just to be safe. you can use `Math.Ceiling(Math.Sqrt(number))` –  0x90 Apr 1 '13 at 12:34
`i < Math.Ceiling(Math.Sqrt(number))` is the wrong condition. That will declare squares of primes as prime (unless `Math.Sqrt()` returns a slightly too large value). –  Daniel Fischer Apr 1 '13 at 19:53
@DanielFischer why is it wrong ? –  0x90 Apr 1 '13 at 19:59

Based on @Micheal's answer, but checks for negative numbers and computes the square incrementally

``````    public static bool IsPrime( int candidate ) {
if ( candidate % 2 <= 0 ) {
return candidate == 2;
}
int power2 = 9;
for ( int divisor = 3; power2 <= candidate; divisor += 2 ) {
if ( candidate % divisor == 0 )
return false;
power2 += divisor * 4 + 4;
}
return true;
}
``````
-

Here's a nice way of doing that.

``````    static bool IsPrime(int n)
{
if (n > 1)
{
return Enumerable.Range(1, n).Where(x => n%x == 0)
.SequenceEqual(new[] {1, n});
}

return false;
}
``````

And a quick way of writing your program will be:

``````        for (;;)
{
Console.Write("Accept number: ");
if (IsPrime(n))
{
Console.WriteLine("{0} is a prime number",n);
}
else
{
Console.WriteLine("{0} is not a prime number",n);
}
}
``````
-

Your code is looking good. But Your code was not a proper way .Try this code

`````` class Program
{
static void Main(string[] args)
{
int _number;
Console.WriteLine("Enter number to check whether it is Prime Number or Not:");
Program _obj = new Program();
if (_obj.IsPrime(_number))
{
Console.WriteLine("Is a Prime Number");
}
else
{
Console.WriteLine("It is Not a Prime Number");
}
}
// Find given number is Prime or Not
private bool IsPrime(int _prime)
{
int _count;
for (_count = 2; _count <= (_prime / 2); _count++)
{
if (_prime % _count == 0)
{
return false;
}
}
return true;
}
}
``````

Result:

165 is not a Prime Number.

11 is a Prime Number.

-
`_obj.IsPrime(_number)` No, no, no. `IsPrime` does not use any internal state, there is no reason to make it depend on an object. It should be a free-standing function, or the best approximation to that available, a `static` function [call it method if you prefer]. –  Daniel Fischer Apr 1 '13 at 19:58