There is challenge on code wars to calculate how many times you have to multiply a Long's individual integers against each other before it becomes a single digit. for example
39 -> 3 * 9 = 27 -> 2 * 7 = 14 -> 1 * 4 = 4 // answer is 3
Here is one of the posted solutions -
class Persist {
public static int persistence(long n) {
int times = 0;
while (n >= 10) {
n = Long.toString(n).chars().reduce(1, (r, i) -> r * (i - '0'));
times++;
}
return times;
}
}
I am very confused by the "(i - '0')" portion of the code. I just learned yesterday that Java's chars() method returns an IntStream which represent the chars so immediately using the reduce makes sense to me. But then it substracts a character which throws me off because it seems to apply that it is working with chars, but then how are they being multiplied together?
I copied the above code and then deleted the character subtraction so that is was a simple reduce statement that I understood, aka
n = Long.toString(n).chars().reduce(1, (r, i) -> r * i);
and then ran the debugger. The very first loop calculated 3 * 9 as 2907. Where does that answer come from? My best guess is that it has to do with character encoding but then why does subtracting the char '0' fix it?
'0'
is decimal48
,'1'
is decimal49
. So'0' - '0'
equals 0,'1' - '0'
equals 1 and so on. It basically turns the character into its digit counterpartSystem.out.println((int)'0');