Chapter 6: Q.6.20 (page 279)

Let X1, X2, ... be a sequence of independent and identically distributed continuous random variables. Find
a) $P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$
b) $P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$

Short Answer

Expert verified

a) $P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\} is \frac{1}{6}$

b) $P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\} = \frac{7}{12}$

Step by step solution

Part (a) - Step 1: To determine

The value of $P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$

Explanation

Let $X_{1}, X_{2} . . . . .$ be continuous random variables with independent and identical distributions.

Conditional probability is defined as follows:

$\begin{aligned} P \{X_{6} > X_{1} ∣ X_{1} = max (X_{1}, \dots, X_{5})\} = \frac{P \{X_{6} > X_{1}, X_{1} = max (X_{1}, \dots, X_{5})\}}{P \{X_{1} = max (X_{1}, \dots, X_{5})\}} \\ = \frac{P \{(X_{6} > X_{1}) \cap [X_{1} = max (X_{1}, \dots, X_{5})]\}}{P \{X_{1} = max (X_{1}, \dots, X_{5})\}} \\ \approx \frac{P \{(X_{6} = max (X_{1}, \dots, X_{6})) \cap [X_{1} = max (X_{1}, \dots, X_{5})]\}}{P \{X_{1} = max (X_{1}, \dots, X_{5})\}} \\ \approx \frac{P (X_{6} = max (X_{1}, \dots, X_{6})) \times P (X_{1} = max (X_{1}, \dots, X_{5}))}{P \{X_{1} = max (X_{1}, \dots, X_{5})\}} \\ = \frac{(\frac{1}{6}) (\frac{1}{5})}{(\frac{1}{5})} \\ = 5 \cdot (\frac{1}{6} \times \frac{1}{5}) \\ = \frac{1}{6} \end{aligned}$

Hence $P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\} is \frac{1}{6}$

Part (b) - Step 3: To find

The value of $P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$

Part (b) - Step 4: Explanation

Given: $P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5}), X_{6} > X_{1}\}$

Calculation: Let $X_{1}, X_{2} . . . . .$ be continuous random variables with independent and identical distributions.

Where $X_{6} > X_{1}$

$P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5}), X_{6} > X_{1}\} = 1$

By symmetry,

$P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5}), X_{6} < X_{1}\} = \frac{1}{2}$

From part (a),

$P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\} = \frac{1}{6}$

Therefore

$\begin{aligned} P \{X_{6} > X_{2} ∣ X_{1} = max (X_{1}, \dots, X_{5})\} = \frac{1}{6} + (\frac{1}{2} \times \frac{5}{6}) \\ = \frac{7}{12} \end{aligned}$

Hence $P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\} = \frac{7}{12}$

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Let X1, X2, ... be a sequence of independent and identically distributed continuous random variables. Find
a) $P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$
b) $P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$

Short Answer

Step by step solution

Part (a) - Step 1: To determine

Explanation

Part (b) - Step 3: To find

Part (b) - Step 4: Explanation

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Let X1, X2, ... be a sequence of independent and identically distributed continuous random variables. Finda) PX6>X1∣X1=maxX1,…,X5b)PX6>X2∣X1=maxX1,…,X5

Short Answer

Step by step solution

Part (a) - Step 1: To determine

Explanation

Part (b) - Step 3: To find

Part (b) - Step 4: Explanation

One App. One Place for Learning.

Most popular questions from this chapter

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Calculus

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Study anywhere. Anytime. Across all devices.

Let X1, X2, ... be a sequence of independent and identically distributed continuous random variables. Find
a) $P \{X_{6} > X_{1} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$
b) $P \{X_{6} > X_{2} ∣ X_{1} = \max (X_{1}, \dots, X_{5})\}$