Question

For the distribution with p.d.f f(x) = ; x = 1,2,3,...
= 0, otherwise
Using Chebyshev's inequality show that P[IX-2| ≤ 2] ≥ 1/2 .​

Answer 1

Answer:

Step-by-step explanation:

Let X be a Uniform random variable on the interval (0,10). ... Ρ(|X − 5| ≥ 2) ... Using the Chebyshev's inequality find an upper bound for the above ... 1) = Ρ(X ≥ 9) + (X ≤ 1 ...

Hope this helps you.

Answer 2

Answer:

Let x be a uniform random variable on interval

0

P(lX-5l_>2).....using the chebkev inequality fond a bound for above