Question: Convergence in Probability Let the random variable Y, have a distribution Binom(n, p). Prove that a converges to pin probability. Use Chebyshev's theorem P(|Y -

Convergence in Probability Let the random variable Y, have a distribution Binom(n, p). Prove that a converges to pin probability. Use Chebyshev's theorem P(|Y - HY | 2 kov) S with My = p and oy = np(1-p). Simply applying WLLN will not get the credit - only use the Chebyshev's theorem and property of Binom(n, p)

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