# CodeChef Array Transform Program

Here's the Problem Statement :

Given n numbers, you can perform the following operation any number of times : Choose any subset of the numbers, none of which are 0. Decrement the numbers in the subset by 1, and increment the numbers not in the subset by K. Is it possible to perform operations such that all numbers except one of them become 0 ? Input : The first line contains the number of test cases T. 2*T lines follow, 2 for each case. The first line of a test case contains the numbers n and K. The next line contains n numbers, a_1...a_n. Output : Output T lines, one corresponding to each test case. For a test case, output "YES" if there is a sequence of operations as described, and "NO" otherwise.

``````Sample Input :
3
2 1
10 10
3 2
1 2 2
3 2
1 2 3

Sample Output :
YES
YES
NO

Constraints :
1 <= T <= 1000
2 <= n <= 100
1 <= K <= 10
0 <= a_i <= 1000
``````

& here's my code :

``````import java.util.*;

public class ArrayTransform {
public static void main(String args[]) {
Scanner sc = new Scanner(System.in);
int no_of_tests = sc.nextInt();

int size;
int a[] = new int[100];
boolean yes;
int j;
int k;
for (int i = 0; i < no_of_tests; i++) {
size = sc.nextInt();
k = sc.nextInt();
for (j = 0; j < size; j++) {
a[j] = sc.nextInt();
}
yes = is_possible(a, size, k + 1);
if (yes)
System.out.println("YES\n");
else
System.out.println("NO\n");
}
}

static boolean is_possible(int a[], int size, int k_1) {
int count = 0;
int m[] = { -1, -1 };
int mod;
for (int i = 0; i < size; i++) {
mod = a[i] % k_1;
if (m[0] != mod && m[1] != mod) {
if (m[0] == -1)
m[0] = mod;
else if (m[1] == -1)
m[1] = mod;
else
return false;
}
}
return true;
}
}
``````
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And where's the question??? – maaartinus Feb 3 '11 at 13:30
Sorry...What's wrong in my code? Why am I getting Wrong Answer? – Chester Feb 3 '11 at 13:38
What have your tried? How have you approached debugging this? What makes you think that any given answer is right or wrong? - once you know that, tracing through your logic error should be pretty routine. – Marc Gravell Feb 3 '11 at 13:48
@Chester, edit your question to actually include a question statement. Also specify what results you are expecting and what you are seeing. – jzd Feb 3 '11 at 13:52
this is my algorithm i am using for array trm : Assume a total of m operations are performed , for an element a_i 1)is either incremented by k x_i times or 2)decremented by 1 by y_i times such that x_i + y_i = m (total no. of operations) ... (1) solving for a_i + k*x_i - y_i = 0 =>a_i + (k+1)x_i - m = 0 , using result 1 => m = (k+1)x_i + a_i (2) Now m%(k+1) = a_i % (k+1) since i have to reduce n-1 numbers to zero , these n-1 numbers must give the same remainder when divided by k+1 and the number not reduced to zero can give same or some other remainder, – Chester Feb 3 '11 at 13:53

## 1 Answer

``````if (m[0] != mod && m[1] != mod)
``````

Here instead of `&&` there should be `||`. Only one of the `m`'s need to match the mod.

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