I need to make an algorithm that will find the smallest number divisible by 4 whose sum of digits is equal to a given number x.
Thanks for the ideas!
I need to make an algorithm that will find the smallest number divisible by 4 whose sum of digits is equal to a given number x. Thanks for the ideas! 

closed as offtopic by Wooble, Jim, brasofilo, Daniel Fischer, Andrew Barber Jul 20 '13 at 1:17This question appears to be offtopic. The users who voted to close gave this specific reason:



If the specified sum of digits
Here is the output of the program, with the first line showing results for 1 to 9, the second line 10 to 18, the third line 19 to 27, etc.






X = the target sum Note that 100 is divisible by 4. This implies that only the last 2 digits of a number determine divisibility by 4. First, let's determine Next, try to determine the last 2 digits. The goal is to, firstly, generate the maximum sum for these two digits such that
If this equation cannot be satisfied (which will only happen if Now we have the last 2 digits. From here, we, either:
such that the remaining digits satisfies an equation almost identical to the above. And we're done. 


A few pointers to put you on your way:
With these tips, you should be able to come up with a very fast algorithm. If you have a very difficult time coming up with an algorithm, comment, but make sure you attempt it first. 


You can go through the multiples of 4 staring from 0, and check if the sum of digits is equal to x. Something like this:
where 

