Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

If you are given two arrays A & B, each with n positive numbers and the equation:

x^8 = y^6 + x^2y^2 + 10

Design an algorithm that runs in nlog(n) time that finds an x in A and a y in B such that the previous equation holds.

First thing to do, is sort both arrays as we want to use binary search later, but the problem is the term

x^2y^2

which can't be separated on different sides of the equation? Or am I going down the wrong path here? Any ideas?

share|improve this question

1 Answer 1

up vote 4 down vote accepted

First thing to notice is that both x and y have even power. That means, when you are sorting you should sort by absolute value (which is still nlogn).

Then, go through each element of array1 and perform a binary search on array 2. You should be able to perform binary search because the function is monotonically increasing. This step is nlogn.

I can elaborate more, if you did not understand my answer.

Let me know :)

share|improve this answer
    
o all are positive numbers, then ignore the first point. –  faisal Apr 21 '13 at 6:16
    
Even powers don't affect the asymptotic complexity of the algorithm. You can ignore the fact that they're even. –  Alexey Frunze Apr 21 '13 at 6:17
    
Originally I thought the arrays can have negative numbers, in that case even power is important to make my suggestion work. –  faisal Apr 21 '13 at 6:19
    
say there is a equation you want to verify x^2=4 and you have [-2,-1,0,1,3] you cannot perform a binary search unless you sort the array like this [0,1,-1,-2,3]. But if the equation is like x^3=-8 then you can perform the binary search with the original array. That's how power matters. The function needs to be monotonic. Hope it makes sense. –  faisal Apr 21 '13 at 6:25

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.