Answer:
[tex]A_2, A_3[/tex] are not independent events.
Step-by-step explanation:
We are given the following in the question:
[tex]A_1:\text{You like car 1}\\A_2:\text{You like car 2}\\A_3:\text{You like car 3}\\P(A_1) = 0.5\\P(A_2) = 0.6\\P(A_3) = 0.7\\P(A_1\cup A_2) = 0.8\\P(A_2\cap A_3) = 0.4\\P(A_1\cup A_2\cup A_3) = 0.9[/tex]
Independent events:
[tex]P(A\cap B) = P(A)\times P(B)[/tex]
Since,
[tex]P(A_2\cap A_3) \neq P(A_2)\times P(A_3)\\0.4\neq 0.6\times 0.7 \\0.4\neq 0.42[/tex]
Thus, they are not independent events.
Now, we evaluate
[tex]P(A_2|A_3) = \dfrac{P(A_2\cap A_3)}{P(A_3)} = \dfrac{0.4}{0.7} = 0.57\\\\P(A_2|A_3) \neq P(A_2) = 0.6[/tex]
Thus, they are not independent event.
