# What is the time complexity of below algorithm [duplicate]

Given a sorted array, determine if it contains a given number x: Instead of using binary search i.e. dividing array into two parts.
If I divide the array into three parts and recursively find the element in these three parts. So what would be the time complexity or the order(in terms of size n of the array) of this algorithm

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lets we remove C++ and Java tags it is not related to language.. –  Grijesh Chauhan Sep 29 at 6:58
Why are you posting the same question again? You should paste the code to get the right answer. –  Juned Ahsan Sep 29 at 6:58
Which same question –  notsogeek Sep 29 at 7:00
@notsogeek Did you read m-way tree?? and do you have any idea why binary seach dome in `log2(n)`. –  Grijesh Chauhan Sep 29 at 7:01
Do you mean m-ary tree ? If yes but than I am not able to figure out the worst case complexity. –  notsogeek Sep 29 at 7:03

## marked as duplicate by Don Roby, UmNyobe, Henk Holterman, Bill the Lizard♦Sep 29 at 12:58

The complexity will be the same as binary search.

The original binary search consist of two phases. First a constant number of steps onto the original array, then a recursive call on a array of half size. Thus complexity can be expressed as

``````T(n) = C1 + T(n/2)
``````

If you divide in three parts, you perform more comparisons and conditional tests, but still a constant time operation on the array of size n, then you call recursively on a array of size n/3. Which means

``````T(n) = C2 + T(N/3)
``````

Both functions evaluate to `Theta(log n)`.

You can generalize. What if i divide in `k` parts. The complexity is

``````f(n) = Ck + f(n/k)
``````

which result in

``````f(n) = Ck log(n)/log(k) + Dk
``````

As k increases, you get a bigger logerithm divisor, but the constants Ck and Dk also increases, as you perform more operations before jumping into the sub array. Think about the case where `n=k`

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And what would be the worst case –  notsogeek Sep 29 at 7:25
So is Ck proportional to k ? –  notsogeek Sep 29 at 7:27
yes it is. Think about how many comparisons in binary search compared to the one of your exercise.write the pseudocode, it will help –  UmNyobe Sep 29 at 7:28
So hence would binary Search be more fast than search which divide array into k (k>2) parts ? –  notsogeek Sep 29 at 7:36
its better to code and compare. –  UmNyobe Sep 29 at 7:38
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