Suppose that 10 balls are put into 5 boxes, with each ball independently being put in box i with probabilitypi,∑i=15pi=1Find the expected number of boxes that have exactly 1 ball.

Answered: "Suppose that 10 balls are put into 5..."

luxlivinglm

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2022-08-20

Suppose that 10 balls are put into 5 boxes, with each ball independently being put in box i with probability

p_{i}, \sum_{i = 1}^{5} p_{i} = 1

Find the expected number of boxes that have exactly 1 ball.

Answer & Explanation

Allyson Vance

Beginner2022-08-21Added 14 answers

Define indicator random variables

J_{i}

, i=1,...,5 that marks whether

i^{t h}

box has one and only one ball or not.
Observe that

P (J_{i} = 1) = (b e g \in {a r r a y} {c} 10 ∖ 1 e n d {a r r a y}) p_{i} {(1 - p_{i})}^{9}

since we have that

i^{t h}

box has one and only if we choose one ball out of ten and put it into that box, and all other balls we put in some of remaining boxes. Hence, the number of empty boxes can be expressed as

M = \sum_{i = 1}^{5} J_{i}

, so, using the linearity of expectation, we get

E (M) = \sum_{i = 1}^{5} E (J_{i}) = \sum_{i = 1}^{5} P (J_{i} = 1) = \sum_{i = 1}^{5} 10 \cdot p_{i} {(1 - p_{i})}^{9}

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