Use the Markov Inequality and with a carefully chosen value of a to compute a bo
ID: 3382412 • Letter: U
Question
Use the Markov Inequality and with a carefully chosen value of a to compute a bound on P [X= 6] .Choose a to make the bound as tight as possible with this inequality and compare your result to the exact value.
Let X be the number of dots on the top side of a randomly rolled fair die. Compute the mean and variance of X. Use the Markov Inequality with a carefully chosen value of a to compute a bound on P[X = 6]. Chose a to make the bound as tight as possible with this inequality and compare your result to the exact value. Use the Chebychev Inequality with a carefully chosen value of a to compute a bound on P[X = 6 or X = 1]. Chose a to make the bound as tight as possible with this inequality and compare your result to the exact value.Explanation / Answer
X is the no of dots on a fair die when it is thrown
As the die is fair and each throw is independent,
E(x) = (1+2+3+..+6) 1/6 = 21/6 = 3.5
E(X^2) = (1^2+2^2+...+6^2) 1/6 = 91/6
Var(X) = 91/6- 49/4
= (181-147)/12 = 17/6
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