Could anybody explain this output to me? Im completely new at Haskell and do not know why that happens.

import Data.Char

o=ord 'f'

main=do print (o==102)
print (mod (102^2087) 9797)
print (mod (o^2087) 9797)

Output:

True
5253
0

GHC version 7.4.1, Ubuntu

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ord has type Char -> Int, so o is an Int. In Haskell, Ints have an upper bound, but Integers do not. –  Snowball Aug 24 '12 at 16:26

This is because o has type Int which has a limited range and thus (mod (o^2087) 9797) is also an Int. However, the constant 102 is of a generic numeric type (Num a => a) and (mod (102^2087) 9797) is of generic integral type (Integral a => a). When this generic integral type must be resolved to a concrete type, which happens when applying print, the default resolution is to choose Integer, an unbounded integral type. The details of this resolution are described in section 4.3.4 Ambiguous Types, and Defaults for Overloaded Numeric Operations of the Haskell 2010 Report.

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That seems to fix the problem. Thank you very much. –  Nymer Aug 24 '12 at 16:34

Firstly, ord is a function which returns the numerical representation of a character, in this case 102.

1. Your first line (print (o==102)) is checking whether o is equal to 102 which it is, hence the output True.

2. The second line (print (mod (102^2087) 9797)) applies two arguments to the mod function. The mod function returns the remainder when the first argument is divided by the second argument. This is integer division so no fractional parts are allowed. The caret operator (^) means that the exponent is taken. i.e. "102 to the power of 2087".

3. The final line (print (mod (o^2087) 9797)) does the same as the second line, with different arguments.

Hope that's clear!

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I think Nymer is confused because the final line outputs 0 instead of 5253, even though o == 102. –  Snowball Aug 24 '12 at 16:25
My bad. Is a downvote really necessary though? –  Nick Brunt Aug 24 '12 at 16:28
Not really, but that wasn't me. –  Snowball Aug 24 '12 at 16:30
Neither me. Thankyou. –  Nymer Aug 24 '12 at 16:35