We first want to determine if the minimum or maximum value of the quadratic function is shown in the table. If it is, we can use the property of symmetry to help complete any missing values.

To find any remaining values, we want to find the first and second differences and use these to complete the table.

In this case since f(-1) \text{ and }f(1) are equal, the minimum value occurs at the x-value directly between -1 and 1. The minimum value occurs at \left(0, -4 \right).

Since the quadratic is symmetric about this point, we can use this to find other points. We are given the point \left(-2, 0 \right) so using symmetry we know \left (2, 0 \right) must also be on the function. In other words, when we move 2 units to the left of x=0, the output is 0 so when we move 2 units to the right of x=0 the output must also be 0. For the same reason we know when x=-3, the output is 5.

To find the last two values we want to find the first and second differences. Comparing the output values we have found so far, we can see the first differences are: -5, -3, -1, +3, +5, \cdots. This means the second difference is +2.

From this information, we can find the remaining values. When x=4, the output will be 5+2=7 more than when x=3, and the value for x=5 will be 7+2=9 more than this value.

The minimum or maximum will not necessarily be shown in the table, but it is helpful if it is shown due to the symmetry of quadratic relationships.

We could have also noticed that this table follows a similar pattern to the parent quadratic function, f(x)=x^2, but is translated down 4 units. If we noticed this, we could use the rule to complete the missing values.