1. The problem involves analyzing the relationship between given $x$ and $y$ values from multiple tables. 2. We start by examining the first table: $x = [-120, -110, -100, -95, -90]$ and $y = [27, 2, 27, 227, 627]$. 3. To understand the relationship, we can check if $y$ depends on $x$ through a function or pattern. 4. Observing the values, there is no simple linear or quadratic pattern directly visible. 5. Next, we look at the second table: $x = [-120, -110, -100, -95, -90]$ and $y = [2, 27, 27, 227, 627]$. 6. Comparing with the first table, the $y$ values are rearranged, suggesting a possible permutation or mapping. 7. The third table reverses the $x$ values and assigns $y$ values accordingly: $x = [-120, -110, -100, -95, -90]$ and $y = [627, 227, 27, 2, 27]$. 8. The fourth and fifth tables swap $x$ and $y$ values, indicating inverse relationships. 9. Since no explicit function is given, and the data is tabulated, the problem likely involves identifying patterns or transformations between $x$ and $y$. 10. Without further instructions, the best approach is to note that the data shows permutations and reversals of $x$ and $y$ values. Final answer: The tables represent different permutations and reversals of the $x$ and $y$ values, showing no simple functional relationship but illustrating data rearrangement.