Answer Happy

Posted: **Wed Jul 13, 2022 5:07 am**

: Let Xn N 1 Be A Sequence Of Independent Random Variables With P Xn N P Xn N 21 Let Sn2 K 1 Var Xk Let M 1 (70.92 KiB) Viewed 27 times

detailed steps and clear handwriting are better, thanks
let {Xn−}n=1∞ be a sequence of independent random variables with P(Xn=n)=P(Xn=−n)=21, let sn2=k=1∑Var(Xk), let Mn=Sn1(X1+⋯+Xn), shom that Mn converges in distrilrition and find the limiting distrilution.

Answer Happy

let {Xn​−}n=1∞​ be a sequence of independent random variables with P(Xn​=n)=P(Xn​=−n)=21​, let sn2​=k=1∑​Var(Xk​), let M

let {Xn​−}n=1∞​ be a sequence of independent random variables with P(Xn​=n)=P(Xn​=−n)=21​, let sn2​=k=1∑​Var(Xk​), let M

let {Xn−}n=1∞ be a sequence of independent random variables with P(Xn=n)=P(Xn=−n)=21, let sn2=k=1∑Var(Xk), let M

let {Xn−}n=1∞ be a sequence of independent random variables with P(Xn=n)=P(Xn=−n)=21, let sn2=k=1∑Var(Xk), let M