# Number of different solutions of xy+yz+ xz = N

I have been trying to solve a problem on spoj. Here is the link to the problem.

http://www.spoj.pl/problems/TAP2012B/

From what I have interpreted, I need to find the number of solutions of the equation xy+yz+xz = N where n is given to us. x>=y>=z z can be zero. But x and y cannot. I tried doing solving this via implementing 3 for loops (bad approach). It is giving the right answer but it is too slow. Also, other people have solved it in almost no time (0.00) So I am sure there is a very different approach to this problem. For N = 20, the number of different solutions is 5 : (6,2,1) (5,4,0) (10,2,0) (4,2,2,) (20,1,0)

-
On my machine, it runs 5 seconds for N=10000. It is python implementation. Is it slow or O.K? –  ondav Jul 4 at 11:27
My example runs 0.12 s. for 9747 and I still think it has optimizational potential. –  akalenuk Jul 4 at 11:45
Very well! +1 on your solution. –  ondav Jul 4 at 12:15

You are approaching towards the right direction there will be 3 nested loops but try to reduce the no. of times the loop operates.... Follow the question and conditions carefully.....

-

Maybe there is some brillian solution built on number-theory. But simply rethinking the task can reduce algorithm complexity as well.

For instance, we don't need a third loop as we can calculate z as (N - x*y)/(x+y). And we don't have to run y all the way to x every time, as we know, that z is not negative, therefore N >= xy.

N = 9747
for x in range(1, N+1):
max_y = min( N / x, x)
for y in range(1, max_y+1):
if (N - x*y) % (x+y) == 0:
z = (N - x*y) / (x+y)
if z <= y:
print x,y,z
-
z can be 0. thus N >= xy. –  ondav Jul 4 at 11:42
Yes, you are right. –  akalenuk Jul 4 at 11:47

You are obviously learning, so it would have had been better if you would do everything yourself, but you now have a great solution from akalenuk, and I hope that you will learn a few things from it as well.

If you are learning python at the same time, I will give you an equivalent solution to akalenuk's, but this time with list comprehension which is a very useful mechanism:

N = 10000

print [(x, y, z)
for x in range(1, N+1)
for y in range(1, min( N/x, x) + 1 )
for z in [ (N - x*y) / (x+y) ]
if (N - x*y) % (x+y) == 0
if z <= y]

The point is in pruning the solution space. The code above is already quite optimised. You might start with something like:

N = 10000

print [(x, y, z)
for x in range(1, N+1)
for y in range(1, x+1 )
for z in range(y+1)
if N == x*y + y*z + x*z]

This would run quite long. So, the first point of optimization may be adding the condition on y:

N = 10000

print [(x, y, z)
for x in range(1, N+1)
for y in range(1, x+1 )
if x*y <= N
for z in range(y+1)
if N == x*y + y*z + x*z]

This already cuts down the time considerably, as for non-promising y the z-loop is not run at all. Then, you notice that you may actually replace that if-statement by explicit computation of maximum y, as akalenuk did:

N = 10000

print [(x, y, z)
for x in range(1, N+1)
for y in range(1, min(x, N/x) +1)
for z in range(y+1)
if N == x*y + y*z + x*z]

This will again speed it up.

As you are learning, I recommend you try all these, and your own, time it, and learn from it. I also recommend to try and time different, similar solutions

-