I know that the extended euclidean algorithm is the ideal way to calculate the multiplicative inverse of a single number modulo prime **p**.

But what if I want to create an array **A** where **A[x]** has the inverse of x? Is there a faster way calculate such an array then by calculating the inverse of every element individually?

I intuitively expect that there is a shortcut because you have many identities like

```
A[x*y % p] = A[x]*A[y] % p
```

However I can not think of a general methodology for getting the entire array **A**.

`(x)`

are small enough, it might be more efficient to use Euler's theorem, provided you can perform modular exponentiation without resorting to bignums:`x^-1 = x^(p-2) (mod p)`

– Brett Hale Dec 24 '12 at 1:33