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A user can enter 0 or 1 which gets appended to a starting number which is 0.

Each time the user adds a digit, the program should tell if the whole number is divisible by 5 or not.

Example:

  1. First number is 0.
  2. User enters '1' - complete number is '1' - the answer is no.
  3. User enters '0' - complete number is '10' - the answer is no.
  4. User enters '1' - complete number is '101' - the answer is yes.

I know the answer has something to do with the last remainder and keeping the last remainder, but I can't find the exact calculation or the logic or the mathematics to do it.

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Did you try to think about a way? Or just tried to find the solution? –  Kiril Kirov Apr 17 '13 at 10:54
    
Got this question on Avaya interview –  Alex Apr 17 '13 at 10:54
    
I'd just divide the number by 5 and check for a remainder. –  Hot Licks Apr 17 '13 at 10:59
1  
(Seems to me that this is a pointless question for a programming test.) –  Hot Licks Apr 17 '13 at 11:03
    
That's easy. Now answer the same question if the user enters bits in reverse, from the most significant to the least significant. –  n.m. Apr 17 '13 at 11:37

3 Answers 3

up vote 1 down vote accepted
int old_x = 0,new_x;
    while(1)
    {
    scanf("%d",new_x);
    new_x= ((old_x<<1)|new_x);
    old_x = new_x ;
    new_x = new_x%5;
    if(!new_x)
    {
    printf("divisible by 5)
    old_x = 0;
    }
    else
    printf("not divisible by 5)
}
share|improve this answer
    
modified the code which will work for infinite number of bits –  user2247801 Apr 17 '13 at 11:16
    
old_x is always zero, you never change it. –  Suma Apr 17 '13 at 11:20
    
Thanks suma, i have updated the old_x value now –  user2247801 Apr 17 '13 at 11:23

In pseudocode:

remainder=0
while true {
    remainder = remainder % 5
    if remainder = 0
        print "divisbile"
    else
        print "nondivisible"

    remainder = (remainder<<1) + inputBit
}

Explanation: if a number is divisible by 5 a multiple of that number is also divisible by 5, so that part is of no interest. Since your expansion can be modeled as a multiplication by two and an addition, this can be applied to your problem. Now all you do is to multiply the remainder and add the input and check if it is divisble.

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@user2247801: Have you tried it? –  n.m. Apr 17 '13 at 11:38
1  
@user2247801 : 101 is divisble by 5 => remainder is 0, user enters 1 remainder becomes 1 and is not divisible by 5. if you check 1101binary = 11 decimal is not divisible by 5. Isn't this what you are looking for? –  ted Apr 17 '13 at 11:56
    
In the case of user input power of 2 (100000000...) you potentially need an infinite remainder length. –  Alex Apr 17 '13 at 13:07
    
@Alex: nope it is modulo => once the power of 2 never becomes greater than 5 (actually it does, but the maximum the mumber will be is 9. Assume the user has put in 100 (4) and now enters 1: remainder now is 1001 (9), 9%5 (read: 9 modulo 5) is 4 and the remainder 100 (4) is stored. Rad up on modulo here –  ted Apr 17 '13 at 13:17
2  
This works because any number x can be expressed as x=5k+r (where k an interger and r the remainder. by adding a bit i to the end of x, it gives: x' =2(5k+r)+i which can be expressed as: x'=10k+(2r+i) so the preoblem of determining if x' is divisible by 5 get's simplified to determining if (2r+i) is divisible by 5. We drop the 10k from the equation, and always know that if our number exceeds 5, we can alwasys write it as 5k+r and drop the k. –  Lefteris E Apr 17 '13 at 14:22

The trick is that to know that if a number is divisible by 5 you only need to know the last decimal digit of the number. If it ends with 5 or 0 then it's divisible by 5. if it doesn't end with 5 or zero it needs an extra amount, which i call remainder to get there. Now given that you have the remainder you can reverse-engineer the last digit of the number. Then shift the last digit by 2 and add the new number the user types (d). Depening on d, you get the new last digit of the number. With that you can again see what newremainder must be added to get to the next multiple of 5.

enter image description here

int newRemainder[2][5] = {{0,2,4,1,3},{4,1,3,0,2}};
int remainder = 0;
int d;

while(1){
   scanf("%d", &d);
   remainder = newRemainder[d][remainder];
   if (remainder ==0) printf("multiple");
}
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How will it work in the case of b1000000...etc? –  Alex Apr 17 '13 at 12:40
    
It will work with an infinite number of digits, since i only need the digit the user currently enters to get to the next state. –  Lefteris E Apr 17 '13 at 13:19

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