I am getting the following error:

``````exercise-2-2.hs:15:49:
Couldn't match expected type `Double' with actual type `Int'
In the fourth argument of `regularPolygonHelper', namely `theta'
In the expression: regularPolygonHelper n s 0 theta r
In an equation for `regularPolygon':
regularPolygon n s
= regularPolygonHelper n s 0 theta r
where
r = s / 2.0 * (sin (pi / n))
theta = (2.0 * pi) / n
``````

in the following code:

``````data Shape = Rectangle Side Side
| RTTriangle Side Side
| Polygon [Vertex]
deriving Show

type Side   = Float
type Vertex = (Float, Float)

square s = Rectangle s s
circle r = Ellipse r r

regularPolygon :: Int -> Side -> Shape
regularPolygon n s = regularPolygonHelper n s 0 theta r
where r     = s / 2.0 * (sin (pi / n))
theta = (2.0 * pi) / n

regularPolygonHelper :: Int -> Side -> Int -> Double -> Double -> Shape
regularPolygonHelper 0 s i theta r = Polygon []
regularPolygonHelper n s i theta r =
(r * cos (i * theta), r * sin (i * theta)) :
(regularPolygonHelper (n - 1) s (i + 1) theta r)
``````

Why is this? Isn't `(2.0 * pi) / n` a double?

-
please note the Problem with your last call in regularPolygonHelper - your are prepending a Vertex onto a Shape - but you want to prepend a vertex to a Vertex-list and return "Polygon newList" –  Carsten Aug 22 '11 at 21:24

Haskell has no automatic conversion between different numeric types. You have to do this by hand. In your case, `(2.0 * pi) / fromIntegral n` would do the trick. (You have to add this at all the other places where you want to have a cast too) The reason for this is, that implicit conversion would make type inference much harder, IMHO it is better to have type inference than automatic conversion.

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strange - tried this but it's not the only problem and in my case didn't work as well ... but if it's the correct answer ... ok –  Carsten Aug 22 '11 at 21:19
Automatic conversion can also lead to loss of precision, which can be another possible headache to track down. Overall, I think explicit is better than implicit when it comes to mixing numeric types. –  hammar Aug 22 '11 at 21:22
did you guys check the code with the propoed changes? does it work and does it produce the right outputs (for example a simple square)? –  Carsten Aug 22 '11 at 21:25
there is still the problem with regularPolygonHelper as far as I can tell –  Carsten Aug 22 '11 at 21:52
@CKoenig You have to add this at all the other places where you want to have a cast too ... Did you actually read my answer? –  FUZxxl Aug 22 '11 at 21:54

better not mix the types so much here is a version that compiles so far:

``````
data Shape = Rectangle Side Side
| RTTriangle Side Side
| Polygon [Vertex]
deriving Show

type Side   = Double
type Vertex = (Double, Double)

square s = Rectangle s s
circle r = Ellipse r r

regularPolygon :: Int -> Side -> Shape
regularPolygon n s = regularPolygonHelper n s 0 theta r
where r     = s / 2.0 * (sin (pi / fromIntegral n))
theta = (2.0 * pi) / fromIntegral n

regularPolygonHelper :: Int -> Side -> Int -> Double -> Double -> Shape
regularPolygonHelper 0 s i theta r = Polygon []
regularPolygonHelper n s i theta r =
let Polygon rPoly = regularPolygonHelper (n - 1) s (i + 1) theta r in
Polygon ((r * cos (fromIntegral i * theta), r * sin (fromIntegral i * theta)) : rPoly)

``````
-
the output of this don't look correct to me - but I don't think the problem is with my changes ... not sure though but I'm tired ... sorry –  Carsten Aug 22 '11 at 21:22
I would not use `Double` for the number of sides. It leaves the door open to errors like passing `0.5` which would cause the `0` base case to be skipped. On a similar note, I'd probably add an `error` case for negative numbers. –  hammar Aug 22 '11 at 21:37
true - just a quick hack anyway, as I don't think the algorithm works correct. But as I mentioned: does the fromIntegral solve the trick? I don't think so. don't you need some kind of Int -> Double(Float)? I'm a bit ashamed but I don't know how to do this in haskell :( –  Carsten Aug 22 '11 at 21:43
Look at the type of `fromIntegral :: (Integral a, Num b) => a -> b`. It can convert from any integral type (e.g. `Int`), to any numeric type (e.g. `Double`). –  hammar Aug 22 '11 at 21:45
well after reading a bit it should be fromIntegral - but why did my GHCi throw on me ... well I must be really sleepy .. sorry will work on it tomorrow ... –  Carsten Aug 22 '11 at 21:46