It is not correct, and it should go like this: \binom{2n}{2}=\frac{2n(2n-1)}{2}=n(2n-1)=2n^2-n=n(n-1)+n^2=2\frac{n(n-1)}{2}+n^2=2\binom{n}{2}+n^2 It looks that your work starts well and ends well ...

As an alternative, with the typo correction we have \begin{eqnarray*} \binom{2n}{2} = 2 \binom{n}{2}+n^2 \end{eqnarray*} which can be interpreted in this way LHS is the number of couples we can ...

I did not check the dplyr code but I noticed that the dummy_data table contains tibbles (column obs). I also encountered problems with the nls function, then I decided to use a different strategy. ...

Yes, well apart from the fact that there is no thing such as -0, you are correct. Cheers!

The answer, if anyone wants to know, is, if \alpha\in GF(p) is the primitive element: H= \left( \begin{array}{ccc} \alpha^{p-1}& \alpha^{p-1} & ... & \alpha^{p-1} \\ \alpha^{p-1} & \alpha^{p-2} & ... & \alpha \\ (\alpha^{p-1})^2 & (\alpha^{p-2})^2 & ... & (\alpha)^2 \\ ... \\ (\alpha^{p-1})^{d-2} & (\alpha^{p-2})^{d-2} & ... & (\alpha)^{d-2} \\ \end{array} \right) ...

To get this off the "unanswered" list, there is the formula (which I also used here ): \mathbf{A}^{-1}=\begin{pmatrix}\mathbf{E}^{-1}+\left(\mathbf{E}^{-1}\mathbf{F}\right)(\mathbf{H}-\mathbf{G}\mathbf{E}^{-1}\mathbf{F})^{-1}\left(\mathbf{G}\mathbf{E}^{-1}\right)&-\left(\mathbf{E}^{-1}\mathbf{F}\right)(\mathbf{H}-\mathbf{G}\mathbf{E}^{-1}\mathbf{F})^{-1}\\-(\mathbf{H}-\mathbf{G}\mathbf{E}^{-1}\mathbf{F})^{-1}\left(\mathbf{G}\mathbf{E}^{-1}\right)&(\mathbf{H}-\mathbf{G}\mathbf{E}^{-1}\mathbf{F})^{-1}\end{pmatrix} ...