Question

To determine the type of function represented in the table, we can observe the values of \( x \) and their corresponding values of \( f(x) \):

- \( f(11) = 1717 \)
- \( f(22) = 2424 \)
- \( f(33) = 3131 \)
- \( f(44) = 3838 \)
- \( f(55) = 4545 \)

We can look for a pattern in the values of \( f(x) \).

If we rewrite \( f(x) \) in terms of \( x \):

1. For \( x = 11 \):
- \( f(11) = 1717 = 11 \times 1 + 1716 \)

2. For \( x = 22 \):
- \( f(22) = 2424 = 22 \times 1 + 2402 \)

3. For \( x = 33 \):
- \( f(33) = 3131 = 33 \times 1 + 3098 \)

4. For \( x = 44 \):
- \( f(44) = 3838 = 44 \times 1 + 3794 \)

5. For \( x = 55 \):
- \( f(55) = 4545 = 55 \times 1 + 4490 \)

It appears that \( f(x) = 100x - 100 \). Plugging in values of \( x \):

- For \( x = 11 \): \( f(11) = 100(11) - 100 = 1100 - 100 = 1000 \) (incorrect)
- For x = 22: \( f(22) = 2200 - 100 = 2900 \) (incorrect)
- For x = 33: \( f(33) = 3300 - 100 = 3200 \) (incorrect)
- For x = 44: \( f(44) = 4400 - 100 = 4300 \) (incorrect)
- For x = 55: \( f(55) = 5500 - 100 = 5400 \) (incorrect)

So instead we realize we should focus on differences.

Calculating the difference between sequential values of \( f(x) \):

- \( 2424 - 1717 = 707 \)
- \( 3131 - 2424 = 707 \)
- \( 3838 - 3131 = 707 \)
- \( 4545 - 3838 = 707 \)

The difference between consecutive \( f(x) \) values is constant (always 707), which indicates that \( f(x) \) is a linear function.

Thus, we conclude:

**This function is linear because the differences between consecutive values of \( f(x) \) are constant.**