Question: A random variable X has a mean = 10 and a variance 2 = 4. Using Chebyshevs theorem, find (a) P(|X 10|
A random variable X has a mean μ = 10 and a variance σ2 = 4. Using Chebyshev’s theorem, find
(a) P(|X − 10| ≥ 3);
(b) P(|X − 10| < 3);
(c) P(5 (d) the value of the constant c such that P(|X − 10| ≥ c) ≤ 0.04.
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