# How to convert a decimal base (10) to a negabinary base (-2)?

I want to write a program to convert from decimal to negabinary.

I cannot figure out how to convert from decimal to negabinary.

I have no idea about how to find the rule and how it works.

Example: `7(base10)-->11011(base-2)`

I just know it is `7 = (-2)^0*1 + (-2)^1*1 + (-2)^2*0 + (-2)^3*1 + (-2)^4*1`.

The algorithm is described in http://en.wikipedia.org/wiki/Negative_base#Calculation. Basically, you just pick the remainder as the positive base case and make sure the remainder is nonnegative and minimal.

`````` 7 = -3*-2 + 1  (least significant digit)
-3 =  2*-2 + 1
2 = -1*-2 + 0
-1 =  1*-2 + 1
1 =  0*-2 + 1  (most significant digit)
``````
``````def neg2dec(arr):
n = 0
for i, num in enumerate(arr[::-1]):
n+= ((-2)**i)*num
return n

def dec2neg(num):
if num == 0:
digits = ['0']
else:
digits = []
while num != 0:
num, remainder = divmod(num, -2)
if remainder < 0:
num, remainder = num + 1, remainder + 2
digits.append(str(remainder))
return ''.join(digits[::-1])
``````

Just my two cents (C#):

``````public static int[] negaBynary(int value)
{
List<int> result = new List<int> ();

while (value != 0)
{
int remainder = value % -2;
value = value / -2;

if (remainder < 0)
{
remainder += 2;
value += 1;
}

Console.WriteLine (remainder);
}

return result.ToArray();
}
``````

There is a method (attributed to Librik/Szudzik/Schröppel) that is much more efficient:

``````uint64_t negabinary(int64_t num) {
}
``````

The conversion method and its reverse are described in more detail in this answer.

Here is some code that solves it and display the math behind it. Some code taken from "Birender Singh"

``````#https://onlinegdb.com/xR1E5Cj7L
def neg2dec(arr):
n = 0
for i, num in enumerate(arr[::-1]):
n+= ((-2)**i)*num
return n

def dec2neg(num):
oldNum = num
if num == 0:
digits = ['0']
else:
digits = []
while num != 0:
num, remainder = divmod(num, -10)
if remainder < 0:
num, remainder = num + 1, remainder + 10
print(str(oldNum) + " = " + str(num) + " * -10 + " + str(remainder))
oldNum = num
digits.append(str(remainder))
return ''.join(digits[::-1])

print(dec2neg(-8374932))
``````

Output:

``````-8374932 = 837494 * -10 + 8
837494 = -83749 * -10 + 4
-83749 = 8375 * -10 + 1
8375 = -837 * -10 + 5
-837 = 84 * -10 + 3
84 = -8 * -10 + 4
-8 = 1 * -10 + 2
1 = 0 * -10 + 1
12435148
``````