# How to implement subtraction using only loop and increment

This is an interview question. We have only two constructs

1. `loop(a)` means loop for a times.
2. `increment(a)` increments a.

Thus to implement a+b one could write

``````loop(a) {inc(b)}
return b;
``````

The question is how to implement a-b.

-
Nope. I have tagged interview-questions. –  Neal Mar 14 '12 at 11:26
I think it's impossible; you need a negate or a decrement function –  Gabriel Llamas Mar 14 '12 at 12:20
Presumably you have some comparison functions available also, yes? If your only constructs really are loop and increment I think it's impossible, but with branching you could make it work. –  John L Mar 14 '12 at 12:57
I agree the question isn't completely defined. I assume comparison has to be there, no? Besides how do you intend to do it with branching? Is it different from the one I proposed? –  Neal Mar 14 '12 at 13:34

``````a = 10
b = 8
result = 0

loop(b) {
last = 0
times = 0;
loop(a) {
last = times
times = inc(times)
}
result = a = last
}

result is 2
``````

Js eg;

``````var a = 10;
var b = 8;
var result;

for (var _b = 0; _b < b; _b++) {
var last = 0, times = 0, loopa = 0;
for (var _a = 0; _a < a; _a++) {
last = times;
times = inc(times);
}
result = a = last;
}

function inc(i) {
return i + 1;
}

print(result) // 2
``````
-
if a = 2 it prints 0. You need a negate function. –  Gabriel Llamas Mar 14 '12 at 12:45
Aye it will floor negative numbers, but its as close as you can get I think given that there is no negation allowed –  Alex K. Mar 14 '12 at 12:52
Even though doesnt work for negative numbers , it still is pretty cool. Upvote and accept :) –  Neal Mar 14 '12 at 18:49

I think if break from loop is allowed, a-b can be done in this way:

``````c=0;
loop(a) {
if (a==b) break;
inc(c);
inc(b);
}
return c;
``````

Ofcourse assuming a>b.

-
but, again, you can only use loop() and inc(). You can't use == operator. –  Gabriel Llamas Mar 14 '12 at 14:18

depends if this Numeric architecture is known:

you can take advantage of the "Two Compliment" mechanism of the x86/x64 architecture,

for example, if the signed numbering scheme is cyclic like.

``````f(0 < x < 32768)     = x
f(32769 < x < 65535) = x - 65536
``````

Then you can use:

``````dec(a)
{
loop(65535 [= 2^16-1]) { inc(a) }
}
``````

.

solving the riddel as

``````(a-b)
{
loop(b) { dec(a) }
}
``````

Depending on the Signed scheme the addition Constant can change, same for short, long, large integer types.

Hope this is good :) Best of luck.

-

We're a looking for x, so that a-b = x. In other words a = b+x

Pseudocode

int x = 0

WHILE (x <= a) do {

if (b+x == a) BREAK // satisfies a-b = x

x++

}

-
``````RESET B
INC B
LOOP A
{
INC D
LOOP B
{
RESET D
}
}
``````
-