# logarithmic complexity represented with loop?

as far as I got it linear complexity can be represented as simple loop and quadratic complexity can be represented as nested loop. How can the cubic and logarithmic complexity be represented?

Thanks!

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A simple loop can have logarithmic complexity, e.g.

``````for (i = 1; i <= N; i *= 2)
...
``````

As others have already answered, a triple nested loop will have cubic complexity.

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Since cubic is O(n^3), it would be three nested loops.

Logarithmic is not so straightforward and usually requires a recursive relation. For example, MergeSort is O(n*log(n)) because it forms a recursion tree of height log(n) and each level requires an O(n) merging operation.

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Cubic complexity - two nested loops:

``````foreach
foreach
foreach
// actions
end
end
end
``````

Logarithm complexity example - binary search.

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• Cubic - three nested loops
• Logarithmic - the idea that on each loop cycle you are splitting input data set by parts (or somehow makes it smaller) and in the next cycle process shortened data set, so basically complexity does not growth significantly whilst input data set growth. For instance take a look at the BinarySearch algorithm or any an other Divide and conquer algorithm.
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O(n^3) can be represented by 3 nested loop.

O(log n) is represented by a loop which each iteration, the amount of data that need to be processed is reduced by half.

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