# How to find all taxicab numbers less than N?

A taxicab number is an integer that can be expressed as the sum of two cubes of integers in two different ways: `a^3+b^3 = c^3+d^3`. Design an algorithm to find all taxicab numbers with a, b, c, and d less than N.

Please give both the space and time complexity in terms of N. I could do it in `o(N^2.logN)` time with `O(N^2)` space.

Best algorithm I've found so far:

Form all pairs: `N^2`
Sort the sum: `N^2 logN`
Find duplicates less than N

But this takes `N^2` space. Can we do better?

-
Did you try something? –  mishadoff Sep 3 '12 at 7:25
why all the downvotes ? looks like a totally legit question for SO! –  alfasin Sep 3 '12 at 7:32
@alfasin "Hi give me the codes plz" is an automatic downvote from me. –  Deestan Sep 3 '12 at 7:33
It can be done in `O(n^2)` space & average time, using a `HashMap:Sum->List<Pair>` (a hash map that its keys are the sums, and the values are pairs for this sums) –  amit Sep 3 '12 at 8:24

The time complexity of the algorithm can't be less than O(N2) in any case, since you might print up to O(N2) taxicab numbers.

To reduce space usage you could, in theory, use the suggestion mentioned here: little link. Basically, the idea is that first you try all possible pairs a, b and find the solution to this:

a = 1 − (p − 3 * q)(p2 + 3 * q2)

b = −1 + (p + 3 * q)(p2 + 3q2)

Then you can find the appropriate c, d pair using:

c = (p + 3 * q) - (p2 + 3 * q2)

d = -(p - 3 * q) + (p2 + 3 * q2)

and check whether they are both less than N. The issue here is that solving that system of equations might get a bit messy (by 'a bit' I mean very tedious).

The O(N2) space solution is much simpler, and it'd probably be efficient enough since anything of quadratic time complexity that can run in reasonable time limits will probably be fine with quadratic space usage.

I hope that helped!

-