7:29 PM Wed Jan 29 〒 28\% Emilio Mejia Felic... G. 4 Unions and intersections of sets Video 09:19 V Let \( F=\{-8,-7,-6,-2\} \) and \( G=\{-12,-7,-5,2\} \). What is \( F \cap G \) ? \[ \{-12,-8,-6,-5\} \] \( \{-7\} \) \( \{-12,-8,-6,-5,-2,2\} \) \( \{-12,-8,-7,-6,-5,-2,2\} \)

To find the intersection of sets \( F \) and \( G \), denoted as \( F \cap G \), we need to identify the elements that are common to both sets. Given: \[ F = \{-8, -7, -6, -2\} \] \[ G = \{-12, -7, -5, 2\} \] **Step-by-Step Analysis:** 1. **Identify Common Elements:** - **-8:** Present in \( F \) but not in \( G \). - **-7:** Present in both \( F \) and \( G \). - **-6:** Present in \( F \) but not in \( G \). - **-2:** Present in \( F \) but not in \( G \). - **-12:** Present in \( G \) but not in \( F \). - **-5:** Present in \( G \) but not in \( F \). - **2:** Present in \( G \) but not in \( F \). 2. **Conclusion:** The only element common to both \( F \) and \( G \) is **-7**. Therefore, the intersection \( F \cap G \) is: \[ \{-7\} \] **Answer:** \( \{-7\} \)