how to find a number X, if we move the last digit to the first, will equal double X

"Move the last digit to the first" means: 12345 --> 51234

Someone tell me there must be an answer. I thought it should be very simple, but I just can not find any X even with coding. Anybody help?

``````public static void main(String[] args) {
for(int i=10; s<99999; i++){
if(2*i==convertInt(i)){
System.out.println(i);
}
}
}

private static int convertInt(int i) {
String s = i+"";
int index = s.length()-1;
String newS = s.charAt(index) + s.substring(0, index);
return Integer.parseInt(newS);
}
``````
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Well maybe there isn't an `x` less than 99999 for which that works - that doesn't mean there is no answer. –  arshajii Dec 31 '12 at 20:04
What is "s" in your for loop? –  Majid L Dec 31 '12 at 20:11
yes, that could be the only reason why I can not find that number, I used to make i a long number, the performance become very bad and still find nothing. I hope someone can solve this problem with elegant way. –  user1146450 Dec 31 '12 at 20:14
In fact the numbers for which this works are quite large (one is 105263157894736842). The brute force approach is unlikely to work. –  arshajii Dec 31 '12 at 20:15
Googling the value given by @A.R.S. gives some interesting results. Namely en.wikipedia.org/wiki/Parasitic_number –  Jan Dvorak Dec 31 '12 at 20:18

``````Let's start with the number without the two. Call it n.

If you multiply this by 10 and add 2 you would have your first number:
10n + 2

Doubling this you'd have:
20n + 4

This should be equivalent to taking n and putting a two in the front.
n + 2 * 10^d

Here d represents the number of digits.
20n + 4 = n + 2* 10^d

19n + 4 = 2 * 10^d
n = (2 * 10^d - 4) / 19

If you try values of d = 1, 2, 3, etc. you eventually get to n = 17 that gives you an integer result:
n = (2 * 10^17 - 4) / 19
n = (200000000000000000 - 4) / 19
n = 199999999999999996 / 19
n = 10526315789473684

Just put a 2 at the end and you have your answer:

105263157894736842
x 2
---------------------------------
210526315789473684

Edit: I just read Joseph's method and I like it better.

2 / 2 = 1 remainder 0 (carry down 1 to the next division)
1 / 2 = 0 remainder 1 (carry down 10 to the next division)
10 / 2 = 5 remainder 0 (carry down 5 to the next division)
5 / 2 = 2 remainder 1 (carry down 12 to the next division)
12 / 2 = 6 remainder 0 (carry down 6 to the next division)
6 / 2 = 3 remainder 0 (carry down 3 to the next division)
3 / 2 = 1 remainder 1 (carry down 11 to the next division)
11 / 2 = 5 remainder 1 (carry down 15 to the next division)
15 / 2 = 7 remainder 1 (carry down 17 to the next division)
17 / 2 = 8 remainder 1 (carry down 18 to the next division)
18 / 2 = 9 remainder 0 (carry down 9 to the next division)
9 / 2 = 4 remainder 1 (carry down 14 to the next division)
14 / 2 = 7 remainder 0 (carry down 7 to the next division)
7 / 2 = 3 remainder 1 (carry down 13 to the next division)
13 / 2 = 6 remainder 1 (carry down 16 to the next division)
16 / 2 = 8 remainder 0 (carry down 8 to the next division)
8 / 2 = 4 remainder 0 (carry down 4 to the next division)
4 / 2 = 2 remainder 0

You can stop here because you have gotten to a 2. Now read the digits going down:
105263157894736842

Note: technically you could repeat the process and get a larger number, but it would just be this sequence of digits repeated, e.g.:
105263157894736842 105263157894736842

One final note:
You could even do this the other direction and it might be easier:
The lowest digit is 2. If you double this, you get 4.
..42
Then double the 4:
..842
Then double the 8 (remember the carry):
..(1)6842
Then double the 6 and add the carry (13), that gets you another carry:
..(1)36842
Double the 3 and add the carry (7)
..736842
Double the 7 (remember the carry)
..(1)4736842
Double the 4 and add the carry (9)
..94736842
Double the 9 and remember the carry
..(1)894736842
Double the 8 and add the carry (17), remember the new carry:
..(1)7894736842
etc.
..(1)57894736842
..(1)157894736842
..3157894736842
..63157894736842
..(1)263157894736842
..5263157894736842
..(1)05263157894736842
Now when you double you get back to the digit 2 so you are done:

105263157894736842
``````
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I used this function:

``````public static boolean isMultiple(int x) {
String g = String.valueOf(x);
g = g.substring(g.length()-1) + g.substring(0, g.length()-1);
int y = Integer.parseInt(g);
if(y == x * 2) return true;
return false;
}
``````

In this loop:

``````int x = 10;
while(!isMultiple(x)) {
System.out.println(x + ", " + isMultiple(x));
x++;
}
``````

And I have gotten no true value up to 650 million. I have a strong feeling this isn't actually possible. My guess is that no number will work for this, but I'm going to leave this running. I'll edit this if I find one.

Edit: It seems there are numbers like this. See above.

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@A.R.S. Just found a number: 105263157894736842. I suggest you stop running this linear search. –  irrelephant Dec 31 '12 at 20:18
en.wikipedia.org/wiki/Parasitic_number lists one: 105263157894736842 –  Jan Dvorak Dec 31 '12 at 20:19
Oh, huh. That's an interesting number. Good to know, thanks! [edited] –  Emrakul Dec 31 '12 at 20:19
In `isMultiple`, you can just `return Integer.parseInt(String.valueOf(x % 10) + (x / 10)) == x*2` to avoid the substring calls. This may let you get a little higher in the loop but still nowhere close to the actual value. –  arshajii Dec 31 '12 at 20:27
That wikipedia link also gives an elegant way of finding such a number... –  rcook Dec 31 '12 at 20:51

Somebody much smarter than me figured out the mathematical equation for this question:

Parasitic Number Equation

...which gives you a good way to code a non-brute force approach.

(where n = number of digits, and a = offset)

``````txtResult.Text = string.Empty;
for (int n = 2; n <= 100; n++)
{
if (((ulong)(Math.Pow(10, n)) - 2) % 19 == 0)
{
for (ulong a = 1; a <= 9; a++)
{
var omgwut = (ulong)((decimal)Math.Pow(10, n+1) / 19m) * a;

txtResult.Text = string.Format("{0}, {1}", omgwut.ToString(), txtResult.Text);
}
}
}
``````

Which ultimately gets you these results:

``````473684210526315789,
421052631578947368,
368421052631578947,
315789473684210526,
263157894736842105,
210526315789473684,
157894736842105263,
105263157894736842,
52631578947368421
``````

I've decided that the person who posited this question to you is a sadist. :)

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