Given P={p_{1},...,p_{n}} of different points which define n^{2} lines, write an algorithm that finds the line which has the lowest slope (smallest absolute value) with O(n lgn) worst time complexity.
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Sort the points based on their y position (n log n time using any number of well known algorithms). Go through the list in order, from 0 to n  1, comparing each point pairs' slopes with whatever you've discovered is the lowest slope so far. (that's n time). Overall, that would be O(n log n). In pseudocode:



Theorem:
Proof (by contradiction):
With this theorem, you can clearly use @Zshazz's algorithm to find the correct pairbecause they will be nearest neighborsin 

