4.3 Independence & Causality | 4.3 Independence & Causality | Unit 4: Probability | Mathematics for Computer Science | Electrical Engineering and Computer Science

<Independence & Causality
4.3.1Independence: Video
4.3.2Independent Dice Rolls
4.3.3Mutual Independence: Video
4.3.4Mutually Independent Dice Rolls
4.3.5Independent vs Disjoint
4.3.6Labeled Balls
4.3.7Paradox
>Mutual Independence: Video

Independent Dice Rolls

Consider the following events for rolling 2 dice:

\(\begin{align}A_i&:=\text{the first die is a \(i\), for \(i\in[1,6]\)}&\\B_i&:=\text{the second die is a \(i\), for \(i\in[1,6]\)}&\\S_i&:=\text{sum of the dice is \(i\), for \(i\in[2,12]\)}&\end{align}\)

Which of the following events are independent?

\(A_1\) and \(B_1\)

\(A_1\) and \(B_6\)

\(A_3\) and \(S_2\)

\(A_2\) and \(S_6\)

\(A_1\) and \(S_7\)

Two dice throws are independent.

\(\Pr[A_3 \cap S_2]=\Pr[\emptyset]=0\neq \frac{1}{6}\cdot\frac{1}{36}=\Pr[A_3]\Pr[S_2].\) \(\Pr[A_2 \cap S_6]= \Pr[A_2 \cap B_4]=\frac{1}{36}\neq \frac{1}{6}\cdot\frac{5}{36}=\Pr[A_2]\Pr[S_6].\) \(\Pr[A_1 \cap S_7]= \Pr[A_1 \cap B_6]=\frac{1}{36} = \frac{1}{6}\cdot\frac{6}{36}=\Pr[A_1]\Pr[S_7].\)