In computing the Chinese Remainder theorem from a vector of tuples (residue, modulus) the following code fails :

```
c = ((1,5),(3,7),(11,13),(19,23))
def crt(c):
residues, moduli = zip(*c)
N = product(moduli)
complements = (N/ni for ni in moduli)
scaled_residues = (product(pair) for pair in zip(residues,complements))
inverses = (modular_inverse(*pair) for pair in zip(complements,moduli))
si = (product(u) for u in zip(scaled_residues,inverses))
result = sum(si) % N
return result
```

Giving the result as **0** ( I guess the generated iterables are empty ). Yet the following code works perfectly :

```
def crt(c):
residues, moduli = zip(*c)
N = product(moduli)
complements = list((N/ni for ni in moduli)) # <-- listed
scaled_residues = (product(pair) for pair in zip(residues,complements))
inverses = (modular_inverse(*pair) for pair in zip(complements,moduli))
si = (product(u) for u in zip(scaled_residues,inverses))
result = sum(si) % N
return result
```

Which yields (a) correct result of **8851**.

Why should I have to `list(`

one of the first generators? Adding `list`

to any subsequent generator does not change the fail (0) result. Only listing this first generator produces the correct result. What is going on here ?

`zip(residues,complements)`

and then`zip(complements,moduli)`

before iterating through? – Alex L Feb 1 '13 at 6:42`[N/ni for ni in moduli]`

instead`list((N/ni for ni in moduli))`

– Denis Nikanorov Feb 1 '13 at 7:39