We can see that the first step is made up of 2 squares, the second step is made up of 4 squares, and the third step 8 squares. If we only considered the first two steps we would not know if this relationship was linear or exponential, we would just know it has increased by 2. By considering the increase from step 2 to step 3, we can see that it has increased by 4 squares, so we know the relationship is not linear.

The number of squares doubles each step.

We could have constructed a table of values showing the step number and the number of squares in each step to see the pattern in another form.

Using the pattern we described in part (a), we have to double the number of squares in step 3 to find the number of squares in the next step.

2\cdot 8 = 16

There are 16 squares in the next step.

We can find the growth factor by dividing a term by the previous term, that is by evaluating. We can see that when x=1, f\left(x\right)=5 and when x=2, f\left(x\right)=25.

\dfrac{25}{5}=5

We could have chosen other values and arrived at the same result. For example \dfrac{125}{25}=5.

Using the growth factor found in part (a), we know that as x increases by 1, f\left(x\right) increases by a factor of 5. This means f\left(5\right)=5\times f\left(4\right).

f\left(5\right)=5\times 128 = 3125