Consider a three element list. It has these possible states and associated probabilities:

```
1 [a, b, c] (0)
```

In the first shuffling operation, a has a 1/3 chance of being swapped with any of the elements, so the possible states and associated probabilities are as follows:

```
From (0)
1/3 [a, b, c] (1)
1/3 [b, a, c] (2)
1/3 [c, b, a] (3)
```

In the second shuffling operation, the same thing happens again except to the second slot, so:

```
From (1) ([a, b, c])
1/9 [b, a, c] (4)
1/9 [a, b, c] (5)
1/9 [a, c, b] (6)
From (2) ([b, a, c])
1/9 [a, b, c] (7)
1/9 [b, a, c] (8)
1/9 [b, c, a] (9)
From (3) ([c, b, a])
1/9 [b, c, a] (10)
1/9 [c, b, a] (11)
1/9 [c, a, b] (12)
```

In the third shuffling operation, the same thing happens, except to the third slot, so:

```
From (4) ([b, a, c])
1/27 [c, a, b] (13)
1/27 [b, c, a] (14)
1/27 [b, a, c] (15)
From (5) ([a, b, c])
1/27 [c, b, a] (16)
1/27 [a, c, b] (17)
1/27 [a, b, c] (18)
From (6) ([a, c, b])
1/27 [b, c, a] (19)
1/27 [a, b, c] (20)
1/27 [a, c, b] (21)
From (7) ([a, b, c])
1/27 [c, b, a] (22)
1/27 [a, c, b] (23)
1/27 [a, b, c] (24)
From (8) ([b, a, c])
1/27 [c, a, b] (25)
1/27 [b, c, a] (26)
1/27 [b, a, c] (27)
From (9) ([b, c, a])
1/27 [a, c, b] (28)
1/27 [b, a, c] (29)
1/27 [b, c, a] (30)
From (10) ([b, c, a])
1/27 [a, c, b] (31)
1/27 [b, a, c] (32)
1/27 [b, c, a] (33)
From (11) ([c, b, a])
1/27 [a, b, c] (34)
1/27 [c, a, b] (35)
1/27 [c, b, a] (36)
From (12) ([c, a, b])
1/27 [b, a, c] (37)
1/27 [c, b, a] (38)
1/27 [c, a, b] (39)
```

Combining the like terms, we get:

```
4/27 [a, b, c] From (18), (20), (24), (34)
5/27 [a, c, b] From (17), (21), (23), (28), (31)
5/27 [b, a, c] From (15), (27), (29), (32), (37)
5/27 [b, c, a] From (14), (19), (26), (30), (33)
4/27 [c, a, b] From (13), (25), (35), (39)
4/27 [c, b, a] From (16), (22), (36), (38)
```

This is clearly uneven.

The shuffle where you only select from elements that have not already been selected is correct. For proof I present this:

Consider you have a bag of elements. If you randomly pick from that bag and place the resulting elements in a list, you will get a randomly ordered list. This is essentially what swapping with only those elements that have not yet been selected does (Consider the list in which you place stuff to be the start of the list, and the bag to be the tail of the list which can be swapped with).