I am testing the code density of Python and Haskell. So I decided to write a program to solve equations of the form ax^2+bx+c=0 where a<>0. In Python this takes five lines:

```
import cmath
def secondgrade(a,b,c):
d=b**2-4*a*c
return ((-b+cmath.sqrt(d))/2*a,(-b-cmath.sqrt(d))/2*a)
```

In Haskell which is supposed to be more concise and less verbose it took me twelve lines:

```
import Data.Complex
csqrt :: Double->Complex Double
csqrt a = if a<0 then 0.0 :+ sqrt(abs(a)) else sqrt(a) :+ 0.0
secondgrade :: Double->Double->Double->(Complex Double,Complex Double)
secondgrade a b c = let d = b^2 - 4*a*c
denominator=2*a :+ 0
b'=(-b) :+ 0
solution1=b'+(csqrt d)
solution2=b'-(csqrt d)
in (solution1/denominator,solution2/denominator)
```

Is there any solution with fewer lines and without losing in readability?

please back up such claims. – user166390 Feb 16 '13 at 19:32`secondgrade a b c = let d = b^2 - 4*a*c in ((d**0.5 - b)/2*a, (-(d**0.5) - b)/2*a)`

Works with any instance of`Floating`

, including`Complex Double`

– Niklas B. Feb 16 '13 at 19:46`/2*a`

instead of`/(2*a)`

). Here is an improved one, without code duplication! :D`secondgrade a b c=join(***)(\q->(q*(b^2-4*a*c)**0.5-b)/2/a)(1,-1)`

– Rotsor Feb 17 '13 at 0:55