Okay, so I am actually working on this one for homework. Recursive solutions implement - or use - a base case against which the need to continue is determined. Now, you might say, "What on Earth does that mean?" Well, in laymen's terms, it means we can simplify our code (and, in the real world, save our software some overhead) - about which I will explain, later. Now, a part of the issue is understanding some basic math, namely, a negative plus a negative is a negative or minus a positive ( -1 + -1 = -2) depending upon the math teacher to whom you speak (we'll see that come into play in the code, below).
Now, there is some debate to be had, here. About which I will write, later.
Here is my code:
public static int multiply(int a, int b)
if (a == 0)
else if (a < 0) // Here, we only test to see whether the first param.
// is a negative
return -b + multiply(a + 1, b); // Here, remember, neg. + neg. is a neg.
} // so we force b to be negative.
result = result + b;
return multiply(Math.abs(a - 1), b);
Notice there are a two things done differently, here:
The code above does not test the second parameter to see whether the second parameter is negative (
a < 0) because of the mathematical principle in the first paragraph (see bold text in first paragraph). Essentially, if I know I am multiplying (y) by a negative number (-n), I know I am taking -n and adding it together y number of times; therefore, if the multiplicand or multiplier is negative, I know I can take either of the numbers, make the number negative, and add the number to itself over and over again, e.g. -3 * 7 could be written (-3) + (-3) + (-3) + (-3)... etc. OR (-7) + (-7) + (-7)
NOW HERE IS WHAT'S UP FOR DEBATE: That above code does not test to see whether the second number (
int b) is
0, i.e. multiplying by
0. Why? Well, that's personal choice (sort of). The debate here must weigh the relative significance of something: the overhead for each choice (of either running an equals-zero test or not). If we do test to see if one side is zero, each time the recursive call to multiply is made, the code must evaluate the expression; however, if we do not test for equals zero, then the code adds a bunch of zeros together n number of times. In reality, both methods "weigh" the same - so, to save memory, I leave out the code.