I am solving an exercise on multiple linear regression. Near the end I will be asked for the same data as the previous model, it is the maximum likelihood estimates.

The previous model: I have the matrix $(X'X)^-1$ and the matrix $X'y$ and the model is:

$Y_i = B_0 + B_1x_i + B_2X^2_I + e_i$

$i= 1,...,10$

Now I have:

$Y_i = g_0 + g_1x^*_i + g_2(x^*_i)^2 + e_i$

$ x^*_i = x_i -10$

$i=1,...,10$

To transform the model can I decrease the Matrix data for 10?

For example the first row of the matrix $(X'X)^-1$ is: $[4,0,0]$
$4-10 ; 0-10 ; 0-10 ....$

The same thing can I make it also for the matrix $X'y$? Perhaps the question is stupid, but wants to be sure of this solution. Thank you.