# obtain a number by addition or subtraction of consecutive natural numbers

I am trying to write a function using which I can obtain any natural number in minimum steps. Where I am allowed to add or subtract natural numbers starting from 1. There the conditions are :

1. Use a number only once

2. You are allowed to perform only addition and subtraction.

3. You are not allowed to escape any digit

4. Find the value of the integer which has a maximum value to obtain that number.

eg : If I my desired number is 4 then it is obtained as -1+2+3 here answer is 3. In a similar manner if I want 6 then 1+2+3 here answer is 3. For 10= 1+2+3+4 ans is 4.
what I have so far :

What I have so far:

``````public void step() {
int n = (int)Math.sqrt(position * 2);
k = (position - (((n + 1) * n) / 2));
l = ((((n + 1) * (n + 2)) / 2) - position);
System.out.println(k + " " + l);
System.out.println(n);
p = (l > k ? k : l);
r = (l > k ? n : n + 1);
System.out.println(p + " " + r);
if (k == 0) {
result = n;
} else {
result = r + (2 * p);
} System.out.println("__________" + result + "__________");
}
``````
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Have you tried anything? –  Subhrajyoti Majumder Aug 19 '13 at 7:05
hmmm what kind of homework is this! –  Multithreader Aug 19 '13 at 7:06
We'll help you with specific programming problems, but you need to go write a procedure for solving the logic problem yourself. –  chrylis Aug 19 '13 at 7:07
yes my code is `public void step() { int n = (int)Math.sqrt(position * 2); k = (position - (((n + 1) * n) / 2)); l = ((((n + 1) * (n + 2)) / 2) - position); System.out.println(k + " " + l); System.out.println(n); p = (l > k ? k : l); r = (l > k ? n : n + 1); System.out.println(p + " " + r); if (k == 0) { result = n; } else { result = r + (2 * p); } System.out.println("__________" + result + "__________"); }` but this is not proper it needs some recursive function I guess. –  kamal_prd Aug 19 '13 at 7:08
If you can only use numbers starting from 1 how come in the first example you used -1? –  Joni Aug 19 '13 at 7:08

Ok, lets do it in this way. Consider following `binary tree`. now you can find sum from each path and take every path with `sum=your number(let's say 4)`. now you can get the maximum value from those. Try to come up with implementation of this. I can help you further, If you try some thing.

``````      0
/  \
-1   1
/  \  / \
-2  2 -2  2
``````
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## The solution is :

``````for n=1: = 1
for n=2: = 1+2 => 1+2+3 => 1-2+3
for n=3: = 1+2
for n=4: = 1+2+3 => -1+2+3
for n=5: = 1+2+3 => 1+2+3+4-5
for n=6: = 1+2+3
for n=7: = 1+2+3+4=>1+2+3+4+5=>1+2+3-4+5
for any n, first calculate the S(k)=1+2+3+...+k
``````

where S(k)>n and x=S(k)-n is an even number. Then go flip the + of x/2 to -.

``````S(k) = (1+k)*k/2 > n
=> k*k + k -2n > 0
=> k > (-1 + sqrt(1+8n))/2
``````

eg, n=7, k > 3.2, then k=4, S(4) = 10, 10-7=3, it's odd, so k=5, S(5)=15, x=15-7=8, 8/2=4, flip the sign of 4, we got 1+2+3-4+5 = 7

in some cases, Sk-n is odd, but S(k+1)-n is also odd, in this case, we need to use S(k+2). The code is as follow :

``````public void step() {
k = (int)Math.ceil(((-1 + Math.sqrt(1 + 8 * n)) / 2));
int Sk = (1 + k) * k / 2;
if ((Sk - n) % 2 != 0) {
k++;
Sk = (1 + k) * k / 2;
if ((Sk - n) % 2 != 0) {
k++;
Sk = (1 + k) * k / 2;
}
}
int i = (Sk - n) / 2;
System.out.println("maximum number is : " + k + "the number with -ve sign is : " + i);
}
``````
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