Using a similar method to my answer to the previous question...
>! <s> 43 </s> 42
Since
>! $N = \frac{\phi + \phi + ...}{\phi}$
>! and
>! $439204 = 2^{(2^3)}\cdot 5\cdot 7^3+2\cdot (3^4+1)$
>!
>! $\frac{\phi + \phi}{\phi}^{(\frac{\phi + \phi}{\phi}^\frac{\phi + \phi + \phi}{\phi})}\cdot \frac{\phi + \phi + \phi + \phi + \phi}{\phi} \cdot \frac{\phi + \phi + \phi + \phi + \phi + \phi + \phi}{\phi} ^\frac{\phi + \phi + \phi}{\phi} + \frac{\phi + \phi}{\phi}\cdot (\frac{\phi + \phi + \phi}{\phi} ^\frac{\phi + \phi + \phi + \phi}{\phi} + \frac{\phi}{\phi})$