69% 11:58 Thu 4 Jul Done courses.edx.org edX MITx: 6.431x Help mayakaripel Probability The Science..1 answer below »

69% 11:58 Thu 4 Jul Done courses.edx.org edX MITx: 6.431x Help mayakaripel Probability The Science of Uncertainty and Data Course Discussion Progress Resources 10. Exercise: Independence and expectations I Course Unit 5: Continuous random variables Lec. 10: Conditioning on a random variable; Independence; Bayes' rule> Next> 10. Exer10. Exercise: Independence and expectations IItions I Bookmark this page Exercise: Independence and expectations II 3 points possible (graded) Let X, Y, and Z be independent jointly continuous random variables, and let g. h, r be some functions. For each one of the following formulas, state whether it is true for all choices of the functions g. h, and r, or false (i.e., not true for all choices of these functions). Do not attempt formal derivations; use an intuitive argument. E[g(X.Y)A(Z)]= E[s(X.n)) - E [h(z)] 1 True Es (x, Y)] . E[nY, Z)] .Eg(X.)Y. 2. False 3 True You have used 0 of 1 attempt Submit Save

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