# Minimum number of transformation required to equalize an array [closed]

Given an array of n positive elements (including 0). We are allowed to perform only one transformation which is to increment each element of the list except one. What are the minimum number of transformation required to equalize this list?

For example, `n = 3`, and the array being `1,2,3`. We need 3 such transformation as:

`2,3,3 --> 3,3,4 --> 4,4,4`.

For `n = 4` and the list being `1,3,2,4` the minimum number of transformation required is 6

Which is the best approach to solve this?

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It looks like you are not "allowed" to incremenent n-1 elements but "required" to, am I right? Otherwise the first transformation could be 1,2,3 -> 2,3,3 -> 3,3,3? –  fge Jan 1 '13 at 12:09
@fge: If you decide to apply the transformation. You have to increment every element but one. –  user1940943 Jan 1 '13 at 12:12
It is just that I misread the original wording: I thought you could increase up to n-1 elements. –  fge Jan 1 '13 at 12:14
Isn't this the exact same question as the Minimum Number of Moves question in CodeChef's January Challenge? –  kullalok Jan 1 '13 at 17:13

## closed as not a real question by Brooks Moses, competent_tech, The Shift Exchange, hochl, GravitonJan 3 '13 at 3:52

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You do not actually need to show the transformations but find the total number of such transformations required.

Incrementing all but one element is essentially the same as decreasing one element(for the purpose of equalizing all elements).

strategy: decrease all non-minimal elements until they equal the minimal element.

for eg. If the elements are {x1, x2, x3, x4...... xn} the number of transformations will be

``````let min = min{x1 .. xn}
for(int x : arr){
// decrement x until x == m
}
``````

Total number of transformations

``````sum(k = 1 to n)x(k)−n*min{x1,…,xn}
``````

Sample run :

``````For array = {1,2,3}
sum(k=1 to n) x(k) = (1 + 2 + 3) = 6
n = 3
min = 1
num_transformations = 6 - 3*1 = 3 transformations
``````
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It's much easier to argue about this if you realize that your transformation is the same as subtracting 1 from one element and as a last step add n to each element where n is the number of transformation. e.g 1,2,3->1,2,2->1,1,2->1,1,1 and finally 4,4,4

And this of course means that you need (with a the array, a_i the i'th element, m the smallest element in the array) sum_i(a_i - m) transformations.

``````m=min(a)