Identifying which Algorithm is which and explaining the running times

For a given problem with input size n, Algorithms A,B,C are executed. In terms of running time, one of the algorithms is O(n), one O(nlogn) and one O(n^2). Some measured running times of these algorithms are given below

``````                            Input Size
512         1024            2048

A        70          134             262
B        135         517             2053
C        42          86              182
``````

Identify which algorithm is which and explain the observed running times. Which algorithm would you select for different values of n

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Homework help: en.wikipedia.org/wiki/… –  Lazarus Sep 11 '10 at 7:54

Look at the quotients of the input sizes and the computing times.

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Graph the performance of the three algorithms - the time complexity will then become obvious.

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Make sure you understand the terms `nlogn`, `n^2` and `n`. Consider plotting this functions to understand the relationship between input and their output. The answer will be obvious if you understand these relationships.

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This is what their plot would look like

Now if you understand what time complexity implies and how the graphs of n, n2 and nlogn would look like, it shouldn't be difficult.

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Graph A : nlogn Graph B : n2 Graph C : n –  Gayan Liyanage Sep 11 '10 at 12:06
you sure about A? –  Lazer Sep 11 '10 at 12:22
Well I think my answer is confirmed by science.slc.edu/~jmarshall/courses/2002/spring/cs50/BigO/… right..?? –  Gayan Liyanage Sep 11 '10 at 12:37
It looks like A follows the input pretty linearly, while C just jumps ahead, suggesting a multiplier to n. –  Lazer Sep 11 '10 at 12:54

Often times, I have found that the easiest way to compare complexities was to "normalize" the results.

``````Input Size:      1       2      4
Algorithm A:     1      1.91   3.74
Algorithm C:     1      2.04   4.33
Algorithm B:     1      3.82  15.21
``````

This table is simply obtained by divising each line by its minimum (the first element in this case).

I have then re-ordered the lines from the slow-growing one to the fast-growing one: can you guess the complexity of each of the algorithms ?

PS: the cheat sheet for `n log n`, just to verify the approximations

``````Input Size       Time
n                n log n
2*n              2 * n * (log n + log 2)
4*n              4 * n * (log n + 2 * log 2)
``````
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This question leaves me surprised: that there are teachers who ask such kind of bogus and misleading questions.

1) Did the question really talk about O(n), O(nlogn), O(n^2) when they really mean Theta(n), Theta(nlogn) and Theta(n^2)?

2)

Just three data points (or 9 total) is not sufficient to distinguish which is which.

We can choose the appropriate constants so that A,B,C could be any of the three we want.

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