Probability Playground: The Cauchy Distribution

The Cauchy distribution is a symmetric bell-shaped distribution which arises naturally as the ratio of two independent normal random variables with mean zero. The median is given by a parameter θ, while a scale parameter σ controls the spread of the distribution.

Parameter	Range	Description
θ	−∞ < θ < ∞	Location parameter
σ	σ > 0	Scale parameter

Probability Density Function

f (x; θ, σ) = \frac{1}{π σ} \frac{1}{1 + {(\frac{x - θ}{σ})}^{2}}

F (x; θ, σ) = \frac{1}{π} arctan (\frac{x - θ}{σ}) + \frac{1}{2}

Support

- \infty < x < \infty

Mean

Variance

Example	θ	σ
Let X₁ and X₂ be independent standard normal random variables. Then X₁/X₂ is a Cauchy(0, 1) random variable.	0.000	1.000
Let X₁ be a normal(0, 6) and X₂ an independent normal(0, 2) random variables. Then X₁/X₂ is a Cauchy(0, 3) random variable.	0.000	3.000
A line passes through the point (1, 2) at a uniformly random angle. The x-axis intercept of the line is a Cauchy(1, 2) random variable.	1.000	2.000

X ∼ Cauchy(θ, σ)

θ = σ =

E(X) , Var(X) , SD(X)

Although the pdf of the Cauchy is similar to that of a normal distribution in being symmetric about θ, the Cauchy distribution is heavy-tailed, with neither the mean nor the variance being defined. Because of this, the box under the graph showing the mean and standard deviation is not displayed.

Although the cdf of the Cauchy looks similar to that of a normal distribution, the Cauchy distribution is heavy-tailed, with neither the mean nor the variance being defined. Because of this, the box under the graph showing the mean and standard deviation is not displayed.

The illustration above shows a red line passing through the point (θ, σ), where the angle of the line is uniformly random. The light blue circle shows the location X of the x-axis intercept of this line, which has a Cauchy(θ, σ) distribution.

The simulation above shows a red line passing through the point (θ, σ), where the angle of the line is uniformly random. The light blue circle shows the location X of the x-axis intercept of this line, which has a Cauchy(θ, σ) distribution. The histogram accumulates the results of each simulation.

Y = ∑ Xᵢ ∼ Cauchy(Σθᵢ, Σσᵢ) 1/X ∼ Cauchy(θ/(θ² + σ²), σ/(θ² + σ²)) (X − θ)/σ ∼ Standard Cauchy

E(Y) , Var(Y) , SD(Y)

Proof

X ∼ Cauchy(θ, σ)

Y = ∑ Xᵢ ∼ Cauchy(Σθᵢ, Σσᵢ) 1/X ∼ Cauchy(θ/(θ² + σ²), σ/(θ² + σ²)) (X − θ)/σ ∼ Standard Cauchy