Gauss's inequality - Alchetron, The Free Social Encyclopedia

In probability theory, Gauss's inequality (or the Gauss inequality) gives an upper bound on the probability that a unimodal random variable lies more than any given distance from its mode.

Let X be a unimodal random variable with mode m, and let τ² be the expected value of (X − m)². (τ² can also be expressed as (μ − m)² + σ², where μ and σ are the mean and standard deviation of X.) Then for any positive value of k,

Pr ( ∣ X − m ∣> k ) ≤ { ( 2 τ 3 k ) 2 if k ≥ 2 τ 3 1 − k τ 3 if 0 ≤ k ≤ 2 τ 3 .

The theorem was first proved by Carl Friedrich Gauss in 1823.

References

Gauss's inequality Wikipedia

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