# Inverting a list of numbers and skip others [closed]

Given a list and a number k, invert first k elements and leave next k elements. Repeat this throughout the list. By inverting I mean, changing the sign of the number.

This was an Interview question at Amazon, that I cam across on a website, and I was trying to approach it just by thinking on how to solve it, sure I would also like to know the fastest algorithm for solving it and your ideas.

I thought about partitioning the array into the K-Steps, then invert, skip. Then merge the arrays like in merge sorting.

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## closed as off-topic by stefan, Mat, EdChum, Steve Barnes, gltsOct 5 '13 at 17:47

This question appears to be off-topic. The users who voted to close gave this specific reason:

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What invert mean?? – hasan83 Oct 5 '13 at 13:35
change the sign of the number – Ahmed Saleh Oct 5 '13 at 13:36
@iccthedral what other approaches to solve it :) ? in better complexity ? – Ahmed Saleh Oct 5 '13 at 13:37

``````for (int i=0;i<size;i+=k*2)
for (int j=0;j<k&&i+j<size;j++)
arr[i+j]=-arr[i+j];
``````

if you are sure that array size is multiple of 2 * k or equal to x * 2 * k - k, then:

``````for (int i=0;i<size;i+=k*2)
for (int j=0;j<k;j++)
arr[i+j]=-arr[i+j];
``````
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Do think that there is simpler than this? – hasan83 Oct 5 '13 at 13:40
Why multiplication rather than unary negation? – pjs Oct 5 '13 at 13:41
I have verified this solution and it works. – Maxime Oct 5 '13 at 13:42
Like this one ? – hasan83 Oct 5 '13 at 13:43
This is a brute force solution, I would like to get a better complexity. – Ahmed Saleh Oct 5 '13 at 13:44

Complexity of hasan's solution:

Because you said you think that hasan's solution is O(N^2), I'd like to explain why you are wrong. So, he has suggested:

``````for (int i=0; i < size; i+=k*2)
for (int j=0; j < k && i+j < size; j++)
arr[i+j] = -arr[i+j];
``````

The number of iterations for the first loop is `size / (k * 2)` and the number of iterations for the second loop is `k`. Hense, the total number of iterations is `size / 2`. Which is also the number of elements in the array that should be modified. You can't do better than that.

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You can do better than that. The complexity is O(1) on a quantum computer. – abo-abo Oct 5 '13 at 14:21
I assumed a Von Neumann machine or similar :). You can also do better with a FPGA and a fixed size. – Maxime Oct 5 '13 at 17:20