I want a function
+++ that adds two mathematical vectors.
I could implement vectors as
[x, y, z] and use:
(+++) :: (Num a) => [a] -> [a] -> [a] (+++) = zipWith (+)
And thus accomodate any n-dimensional vector (so this would work for
[x, y] too).
Or I could implement vectors as
(x, y, z) and use:
type Triple a = (a, a, a) merge :: (a -> b -> c) -> Triple a -> Triple b -> Triple c merge f (a, b, c) (x, y, z) = (f a x, f b y, f c z) (+++) :: (Num a) => Triple a -> Triple a -> Triple a (+++) = merge (+)
Of course this is slightly more complex but it when I implement all the other vector functions, that is irrelevant (50 lines instead of 40).
The problem with the list approach is that I can add a 2D vector with a 3D vector. In that case,
zipWith would simply chop off the 3D vector's
z component. While that might make sense (more likely it should expand the 2D vector to
[x, y, 0]), for other functions I'm thinking it could be problematic to have either happen silently. The problem with the tuple approach is it limits the vector to 3 components.
Intuitively, I would think that it would make more sense to represent vectors as
(x, y, z), since a mathematical vector has a fixed number of components and it doesn't really make sense to cons (prepend) a component to a vector.
On the other hand, although it's very unlikely that I will need anything other than 3D vectors, it doesn't seem quite right to limit it to that.
I guess what I want is functions that take two lists of equal length, or better, functions that operate on tuples of arbitrary size.
Any suggestions, in terms of practicality, scalability, elegance, etc.?