The following algorithm checks whether a number is prime:

```
Given a number n,loop over all numbers smaller than n and check whether they divide n.
If one of them divides n, answer no. Otherwise, answer yes.
```

Now, I have to analyse the number of division operations performed by the algorithm as a function of the length of its input in the following two cases:

1) The number is encoded in unary (i.e, 4 is 1111). How do I show that the number of divisions is polynomial?

2) The number is encoded in binary (i.e, 4 is 100). How do I show that the number of divisions is exponential?