Since no one else has mentioned it, equivalent to Yoda's `Level[expr, 1]`

construction is to use Apply to replace the head of an expression with `List`

:

```
In[1]:= expr = a + b - c + d + 4 e - 3 f;
In[2]:= List @@ expr
Level[expr, 1] == %
Out[2]= {a, b, -c, d, 4 e, -3 f}
Out[3]= True
In[4]:= expr2 = a^2 + 5 bc/ef - Sqrt[g - h] - Cos[i]/Sin[j + k];
In[5]:= List @@ expr2
Level[expr2, 1] == %
Out[5]= {a^2, (5 bc)/ef, -Sqrt[g - h], -Cos[i] Csc[j + k]}
Out[6]= True
```

The two methods do basically the same thing and have identical timings (using my version of a average timing function)

```
In[1]:= SetOptions[TimeAv, Method -> {"MinNum", 80000}, "BlockSize" -> 20000];
In[7]:= List @@ expr // TimeAv
Total wall time is 0.244517, total cpu time is 0.13
and total time spent evaluating the expression is 0.13
The expression was evaluated 80000 times, in blocks of 20000 runs. This yields
a mean timing of 1.625*10^-6 with a blocked standard deviation of 2.16506*10^-7.
Out[7]= {1.625*10^-6, {a, b, -c, d, 4 e, -3 f}}
In[8]:= Level[expr, 1] // TimeAv
Total wall time is 0.336927, total cpu time is 0.16
and total time spent evaluating the expression is 0.16
The expression was evaluated 80000 times, in blocks of 20000 runs. This yields
a mean timing of 2.*10^-6 with a blocked standard deviation of 3.53553*10^-7.
Out[8]= {2.*10^-6, {a, b, -c, d, 4 e, -3 f}}
```