given `f = @(x,y) [something with a scalar result]`

, what's the best way that I can compute a lookup matrix A such that A(x,y) == f(x,y) for any x,y within a particular range and domain?

Let's say a function called `lookupTable(f,range,domain)`

did what I want. Then `lookupTable(@(x,y) x * y, 12, 12)`

would yield a matrix containing the multiplication table from 1*1=1 to 12*12=144.

Or let's say I want a 6x6 matrix with all zeros except for a one in row 3, column 5. Instead of literally writing in that matrix, or creating an all-zero matrix and then modifying it, I could write `lookupTable(@(x,y) x==3&&y==5, 6, 6)`