To complete the 12 cfracs in [this post][1] and the 4 in [the next][2], all associated with the 6+6+3+1=16 "sporadic sequences", then 13 cfracs have closed-forms, 1 has six limits (with one divergent), and the last 2 as divergent. 

We evaluate the last 3 cfracs for $n = 1000\; \text{to}\; 1200,$ *sort the values $v$*, and plot the values $-2<v<2.$

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**I. Degree 2 for (-9,-3,-27)**
  
$$C_2(-9,-3,-27) = \frac1{-3 + \large{\underset{k=1}{\overset{n}{\mathrm K}} ~  \frac{-27k^4}{(-9k^2-9k-3)}}}$$

As discussed in the post above, this has *six limits* (with one divergent $v\to \infty$) as clearly seen in the plot below,

[![Cfrac27][3]][3]

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**II. Degree 3 for (11,3,1)**
  
$$C_3(11,3,1) = \frac1{-5 + \large{\underset{k=1}{\overset{n}{\mathrm K}} ~  \frac{-125k^4}{-(2k+1)(11k^2+11k+5)}}}$$

Its plot is vastly different and presumably has infinitely many limits within $-1<v<1$, 

[![Cfrac125][4]][4]

It has an illusory "pattern" if $n$ is mod $5$, but disappears upon further analysis.

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**III. Degree 3 for (7,2,8)**
  
$$C_3(7,2,8) = \frac1{-3 + \large{\underset{k=1}{\overset{n}{\mathrm K}} ~  \frac{-81k^4}{-(2k+1)(7k^2+7k+3)}}}$$

Likewise, its plot looks very similar to the previous one,

[![Cfrac81b][5]][5]

so the same conclusion about it can be made.

  [1]: https://mathoverflow.net/q/447099/12905
  [2]: https://mathoverflow.net/q/447166/12905
  [3]: https://i.sstatic.net/XiEsN.jpg
  [4]: https://i.sstatic.net/Q2BKQ.jpg
  [5]: https://i.sstatic.net/XUKyX.jpg