lognormality

Lognormality refers to the property of a random variable whose natural logarithm is normally distributed. A variable X is said to be lognormally distributed if the logarithm of X, denoted as ln(X), follows a normal distribution. This property implies that X itself is always positive and skewed to the right, often modeling phenomena characterized by multiplicative processes.

The probability density function (pdf) of a lognormal distribution with parameters μ (mean of ln(X)) and σ (standard

f(x) = (1 / (xσ√(2π))) * exp( - (ln(x) - μ)² / (2σ²) ), for x > 0

Lognormality is common in various fields such as finance, biology, and engineering. For example, stock prices,

One notable feature of a lognormal distribution is its asymmetry, with a long right tail, highlighting the

Understanding lognormality helps in modeling and analyzing data where values are positive and skewed, and in