# Haskell RandomGen for new matrix

I have to implement this function in haskell:

``````insertRandomNumber :: RandomGen g => [[Int]] -> g -> ([[Int]], g)
``````

The function inserts a random number at a random position in my matrix. I can insert only at a position where there is a 0. The matrix size is 4 x 4 . I have this :

``````insertRandomNumber :: RandomGen g => [[Int]] -> g -> ([[Int]], g)
insertRandomNumber mat g =
let (pos,_) = randomR (1,16) g
ok = free (pos `div` 4) (pos `mod` 4) mat
in if ok == True
then newmatrix pos mat
else insertRandomNumber mat g
``````

The problem is that if the first position is not free, my program will block on else. I hope you can give me a example of how to use randomgen to insert a random number to a FREE random position.

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– leftaroundabout Apr 27 '14 at 23:54
Style nitpicking: `ok == True` is redundant. – duplode Apr 27 '14 at 23:55

You need to retain your new random number generator and pass that instead of the old generator. Failure to do so means you will always generate the same `pos` on every iteration and loop forever.

In code:

``````let (pos,_) = randomR (1,16) g
``````

Here you are explicitly ignoring the new RNG state. Instead:

``````let (pos,newGen) = randomR (1,16) g
``````

Then later you passed the old generator, which would generate the exact same `pos`:

``````in if ok == True then newmatrix pos mat else insertRandomNumber mat g
``````

Instead, you should pass the new generator state:

``````in if ok == True then newmatrix pos mat else insertRandomNumber mat newGen
``````
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thanks. this was very useful – stebogstb Apr 28 '14 at 0:32
@stebogstb then accept the answer. – Hi-Angel Dec 14 '15 at 18:07

You can split this problem into three parts: enumerate all indices which contain a 0, pick a random index out of these, and insert a random number at the chosen index. So something like this:

``````insertRandomNumber :: RandomGen g => [[Int]] -> g -> ([[Int]], g)
insertRandomNumber mat g0 = case validPositions mat of
[] -> (mat, g0)
xs -> let (i,g1)  = randomR (0, length xs - 1) g0
(v, g2) = randomR (1,100 :: Int) g1
in (replaceAt mat (xs !! i) v, g2)
``````

I will leave you to write the functions `validPositions` and `replaceAt`.

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