To determine how many times Lisette should expect to land on a 2 when spinning the spinner 48 times, we first need to know the total number of sections on the spinner and how many of those sections are labeled with the number 2.
Assuming the spinner is fair, the expected number of times to land on any given section can be calculated using the formula:
\[ \text{Expected number of outcomes} = (\text{Number of spins}) \times (\text{Probability of landing on that outcome}) \]
Let’s say the spinner has \( n \) sections, and out of these \( n \) sections, \( k \) sections are labeled with the number 2.
The probability \( P \) of landing on a 2 in a single spin is given by:
\[ P = \frac{k}{n} \]
Thus, the expected number of times to land on a 2 after 48 spins is:
\[ E = 48 \times P = 48 \times \frac{k}{n} \]
Without the specific values of \( n \) and \( k \), I cannot calculate an exact number. If you provide the number of sections on the spinner and how many of those are labeled with a 2, I can give you a precise answer.