I am trying to numerically integrate a function in Haskell using the trapezoidal rule, returning an anti-derivative which takes arguments a, b, for the endpoints of the interval to be integrated.
integrate :: (Float -> Float) -> (Float -> Float -> Float) integrate f = \ a b -> d * sum [ f (a + d*k) | k <- [0..n] ] - d/2.0 * (f a + f b) where d = (b - a) / n n = 1000
In the above, I use
n - for the number of subintervals d - for the width of each subinterval
This almost works, except for the bound arguments a,b in the lambda. I get the error message:
Not in scope: `b' Not in scope: `a'
I can understand that the scope of a,b is restricted to just that lambda expression, but is there a workaround in Haskell so that I don't have to write (b-a)/n for each occurrence of d in the above?