How would you divide a number by 3 without using *
, /
, +
, 
, %
, operators?
The number may be signed or unsigned.

Quite amused none answered with a generic division:
The bitwise addition has already been given in one of the answers so skipping it. 





All answers are probably not that what the interviewer liked to hear: My answer:



It seems no one mentioned the division criterion for 3 represented in binary  sum of even digits should equal the sum of odd digits (similar to criterion of 11 in decimal). There are solutions using this trick under Check if a number is divisible by 3. I suppose that this is the possible duplicate that Michael Burr's edit mentioned. 


Where InputValue is the number to divide by 3






Why don't we just apply the definition studied at College? The result maybe inefficient but clear, as the multiplication is just a recursive subtraction and subtraction is an addition, then the addition can be performed by a recursive xor/and logic port combination.
As someone says... first make this work. Note that algorithm should work for negative Q... 


Generally, a solution to this would be:



If you remind yourself standard school method of division and do it in binary, you will discover that in case of 3 you only divide and subtract a limited set of values (from 0 to 5 in this case). These can be treated with a switch statement to get rid of arithmetic operators.



Here it is in Python with, basically, string comparisons and a state machine.



Good 'ol



if we consider



3 in base 2 is 11. So just do long division (like in middle school) in base 2 by 11. It is even easier in base 2 than base 10. For each bit position starting with most significant: Decide if prefix is less than 11. If it is output 0. If it is not output 1, and then substitute prefix bits for appropriate change. There are only three cases:
All other prefixes are unreachable. Repeat until lowest bit position and you're done. 


Well you could think of using a graph/tree like structure to solve the problem. Basically generate as many vertices as the number that is to be divided by 3. Then keep pairing each unpaired vertex with two other vertices. Rough pseudocode:
This can obviously be optimized and the complexity depends on how big you number is, but it shoud work providing you can do ++ and . It's as good as counting only cooler. 


Using a Linux shell script:



I would use this code to divide all positive, non float numbers. Basically you want to align the divisor bits to the left to match the dividend bits. For each segment of the dividend (size of divisor) you want to check to make sure if the the segment of dividend is greater than the divisor then you want to Shift Left and then OR in the first registrar. This concept was originally created in 2004 (standford I believe), Here is a C version which uses that concept. Note: (I modified it a bit)
Example Usage:



Here's a method my Grandfather taught me when I was a child. It requires + and / operators but it makes calculations easy. Add the individual digits together and then see if its a multiple of 3. But this method works for numbers above 12. Example: 36, 3+6=9 which is a multiple of 3. 42, 4+2=6 which is a multiple of 3. 


This will work ...
Just substitute '14' and '3' with your numbers. 


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