Let FX(x):=P(X≤x) a distribution function of a random variable X.
Prove that FX is right-continuous.
I need to show that for every non-increasing sequence xn with lim I will get:
\lim_{n\to\infty}f(x_n)=f(x_0)
How do I show this ? Any ideas ?
Let FX(x):=P(X≤x) a distribution function of a random variable X.
Prove that FX is right-continuous.
I need to show that for every non-increasing sequence xn with lim I will get:
\lim_{n\to\infty}f(x_n)=f(x_0)
How do I show this ? Any ideas ?
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