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I'm trying to find an algorithm which, given two natural numbers n,m (m<=n), let A=[1,...n][1...m] whose elements are natural numbers. If we know that all A's elements are ascendingly sorted for each column and each row, meaning:

A[i,j] < A[i,j+1]

and

A[i,j] < A[i+1,j]

the algorithm needed should return the positions (X,Y) for which the value K is found. Additionally, I need to find it's complexity, but that can be calculated by its algorithm. Is this problem solved? Which algorithm would that be?

marked as duplicate by Dukeling algorithm May 20 '17 at 17:31

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  • Are the rows and columns sorted or strictly ascending? – harold May 20 '17 at 16:31
  • The question says both. It confused me since it can be sorted without being ascending. I suppose having them ascending would match the indications above. So, not just sorted. – Zap May 20 '17 at 16:49
  • Ok let's go with that, it's more useful than merely sorted. – harold May 20 '17 at 16:56