# Expected value of independent random variables - Algorithms [closed]

There are n independent random variables X1,X2..Xn. Each random variable can take value of either 0 or 1. The probability that a variable Xi has a value of 1 is 1/n. What is the expected value of square of sum of X1..Xn.

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This seems like it might be better suited to mathoverflow.net. –  ASGM Mar 16 at 12:29
@user2074981 MathOverflow is for research-level questions, while Mathematics is for more basic questions such as this one - reference. –  Dukeling Mar 16 at 12:39
Thanks @Dukeling for the clarification! –  ASGM Mar 16 at 12:45
This question appears to be off-topic because it is about it is a pure mathematics question. –  borrible Aug 20 at 8:01

## closed as off-topic by n.m., Dukeling, Alexey Frunze, Chris Laplante, borribleAug 20 at 8:01

This question appears to be off-topic. The users who voted to close gave this specific reason:

• "This question does not appear to be about programming within the scope defined in the help center." – n.m., Dukeling, Alexey Frunze, Chris Laplante
If this question can be reworded to fit the rules in the help center, please edit the question.

This may be homework, so I'll give a few hints:

We want E((\sum_i X_i) ^2). Now show that:

E((\sum_i X_i)^2) = E(\sum_i X_i^2 + 2\sum_{1<= i < j <= n} X_i * X_j)
= n * E(X_i^2) + 2 * choose(n, 2) * E(X_i * X_j)


Now all you need is:

E(X_i^2), E(X_i * X_j)


For any i and j, since they are i.i.d.

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