Question

Unfortunately, the diagram you are referring to is not visible in this text format. However, I can still provide you with a general way to determine the relationship between the number of pentagons and the perimeter of the figure they form, and then we can create a hypothetical example if needed.

Assuming that the pentagons are regular (all sides are of equal length) and they are arranged in such a way that each pentagon shares one side with another (except the first and last if arranged in a line), we can follow this reasoning:

- Each pentagon has 5 sides.
- When two pentagons are placed next to each other, they share a side, so the total number of sides is not simply multiplied by the number of pentagons.
- If we add one pentagon to another, we are only adding 4 new sides to the perimeter because one side is shared.

Let's denote the length of each side of a pentagon as `s`.

For one pentagon:
- The perimeter `y` would be 5 times the length of a side `s`.

For two pentagons:
- Since they share a side, we only add four sides to the perimeter, which would be 5s + 4s.

For three pentagons:
- Yet again, when adding the third pentagon, we only add another four sides, making it 5s + 4s + 4s.

So, to write an equation for `y` perimeter for `x` pentagons:

y = 5s + 4s(x - 1)

Now, let's suppose the length of one side `s` is a fixed constant (for example, 1 unit to simplify), and use that to fill out the table:

Number of Pentagons, x | Perimeter, y | Ordered Pair (x, y)
1 | 5 | (1, 5)
2 | 9 | (2, 9)
3 | 13 | (3, 13)

So the equation would be simplified as:

y = 5 + 4(x - 1)

To represent the relationship using a graph, you would simply plot the ordered pairs on a coordinate plane with `x` on the horizontal axis and `y` on the vertical axis, and draw a line through the points. The graph would show a linear relationship starting from the point (1, 5) and going up by 4 units for each additional pentagon.