Let X and Y be two continuous random variables, Find E(X+Y)*E(X)+E(Y)E(X)-E(Y)E(X)E(Y)E(X)/E(Y)
Question
Let X and Y be two continuous random variables, Find E(X+Y)*E(X)+E(Y)E(X)-E(Y)E(X)E(Y)E(X)/E(Y)
Solution
The expression you provided seems to be a mathematical one, involving the expected values (E) of two random variables X and Y. Let's simplify it step by step:
- E(X+Y)*E(X)+E(Y)E(X)-E(Y)E(X)E(Y)E(X)/E(Y)
First, let's distribute E(X) in the first part of the expression:
- E(X)*E(X) + E(Y)*E(X) + E(Y)E(X) - E(Y)E(X)E(Y)E(X)/E(Y)
Then, simplify the expression by combining like terms:
- 2*E(X)*E(Y) + E(X)^2 - E(Y)E(X)E(Y)E(X)/E(Y)
Finally, simplify the last term by cancelling out E(Y) from the numerator and denominator:
- 2*E(X)*E(Y) + E(X)^2 - E(X)^2
So, the simplified expression is:
- 2*E(X)*E(Y)
This is the final simplified form of the given expression.
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