Category:Laws of Large Numbers
This category contains pages concerning Laws of Large Numbers:
Bernoulli's Theorem
Let the probability of the occurrence of an event be $p$.
Let $n$ independent trials be made, with $k$ successes.
Then:
- $\ds \lim_{n \mathop \to \infty} \frac k n = p$
Weak Law of Large Numbers
Let $P$ be a population.
Let $P$ have mean $\mu$ and finite variance.
Let $\sequence {X_n}_{n \mathop \ge 1}$ be a sequence of random variables forming a random sample from $P$.
Let:
- $\ds {\overline X}_n = \frac 1 n \sum_{i \mathop = 1}^n X_i$
Then:
- ${\overline X}_n \xrightarrow p \mu$
where $\xrightarrow p$ denotes convergence in probability.
Strong Law of Large Numbers
Let $P$ be a population.
Let $P$ have mean $\mu$ and finite variance.
Let $\sequence {X_n}_{n \mathop \ge 1}$ be a sequence of random variables forming a random sample from $P$.
Let:
- $\ds {\overline X}_n = \frac 1 n \sum_{i \mathop = 1}^n X_i$
Then:
- $\ds {\overline X}_n \xrightarrow {\text {a.s.} } \mu$
where $\xrightarrow {\text {a.s.} }$ denotes almost sure convergence.
Subcategories
This category has the following 3 subcategories, out of 3 total.
B
- Bernoulli's Theorem (3 P)
K
- Khinchin's Law (3 P)
- Kolmogorov's Law (3 P)
Pages in category "Laws of Large Numbers"
The following 6 pages are in this category, out of 6 total.