What is Log-Normal Distribution?
A log-normal distribution is a continuous distribution of random variables whose logarithms distribute normally. In other words, the lognormal distribution generates by the function of ex, where x (random variable) is supposed to distribute normally. In the natural logarithm of ex is the x, the logarithms of lognormally distributed random variables distributed normally.
A variable X is normally distributed if Y = ln(X), where ln is the natural logarithm.
- Y= exLet’s assume a natural logarithm on both sides.lnY = ln ex which results into lnY = x
Therefore, if X, a random variable, has a normal distributionNormal DistributionNormal Distribution is a bell-shaped frequency distribution curve which helps describe all the possible values a random variable can take within a given range with most of the distribution area is in the middle and few are in the tails, at the extremes. This distribution has two key parameters: the mean (µ) and the standard deviation (σ) which plays a key role in assets return calculation and in risk management strategy.read more, Y has a lognormal distribution.
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Log-Normal Distribution Formula
The formula for the probability density function of the lognormal distribution defines by the mean μ and standard deviation σ, which is denoted by:
Parameters of Log-Normal Distribution
The following three parameters characterize the log-normal distribution:
- σ, the standard deviation of the distribution log, is also called the shape parameter. The shape parameter generally affects the overall shape of the lognormal distribution, but it does not impact the location and height of the graph.m, the median of the distribution, also known as the scale parameter.Θ, the location parameter which is used to locate the graph on the x-axis.
The mean and standard deviation are two major parameters of the lognormal distribution, and these two parameters explicitly define it.
The following figure illustrates the normal distribution and log-normal distribution.
The above figure, we can note the following features of the log-normal distribution.
- The log-normal distributions are positively skewedDistributions Are Positively SkewedA positively skewed distribution is one in which the mean, median, and mode are all positive rather than negative or zero. The data distribution is more concentrated on one side of the scale, with a long tail on the right.read more to the right due to lower mean values and higher variance in the random variables in consideration.The lognormal distribution is always bounded from below by 0 as it helps in modeling the asset prices, which are unexpected to carry negative values.The lognormal distribution is skewed positively with a large number of small values. However, it includes a few significant values, which result in the mean being greater than the mode very often.
The above figure shows that the log-normal distribution is bounded by 0. Furthermore, it positively skewed to the right, which its long tail could notice towards the right. These two observations consider the major properties of lognormal distributions. In practice, lognormal distributions proved very helpful in distributing equity or asset prices. In contrast, the normal distribution is useful in estimating the asset’s expected returns over time.
Examples of Log-Normal Distribution
The following are some examples where one can use the log-normal distributions:
- The volume of gas in energy and petroleum reserves.The volume of milk production.The quantity of rainfall.The potential lives of manufacturing and industrial units whose chances for survival characterize by the stress rate.The extent of periods to which any infectious disease exists.
Application and Uses of Log-Normal Distribution
The following are applications and uses of the log-normal distribution.
- The most commonly used and popular distribution is a normal distribution, which is normally distributed and symmetrical and forms a bell-shaped curve that has modeled various naturals from simple to very complex.But there are instances where normal distribution faces constraints where lognormal distribution can be easily applied. For example, the normal distribution can consider a negative random variable, but the lognormal distribution envisages only positive random variables.Asset price analysis is one of the various applications of lognormal distribution used in finance. The expected return on assets graphs in a normal distribution, but the prices of the assets graph in a lognormal distribution.With the help of the lognormal distribution curve, we can easily calculate the compound rate of return on assetsReturn On AssetsReturn on assets (ROA) is the ratio between net income, representing the amount of financial and operational income a company has, and total average assets. The arithmetic average of total assets a company holds analyses how much returns a company is producing on the total investment made.read more over time.If we applied a normal distribution to calculate asset prices over time, there are possibilities of getting returns less than -100%, which subsequently assumes the prices of assets are less than 0. But suppose we use lognormal distribution to estimate the compound rate of returnRate Of ReturnRate of Return (ROR) refers to the expected return on investment (gain or loss) & it is expressed as a percentage. You can calculate this by, ROR = {(Current Investment Value – Original Investment Value)/Original Investment Value} * 100read more over some time. In that case, we can easily ward off the situation of getting negative returns as lognormal distribution considers only positive random variables.A price relative is the asset’s price at the end of the period divided by the initial price of the asset, which is equal to 1 plus holding period returns. To find the end of the asset of the period price, we can get the same by multiplying it by the relative price times the initial asset price. Lognormal distribution takes only positive value; therefore, the asset price at the end of the period cannot be below 0.
Log-Normal Distribution in Modelling Equity Stock Prices
The log-normal distribution models the probability distributionProbability DistributionProbability distribution could be defined as the table or equations showing respective probabilities of different possible outcomes of a defined event or scenario. In simple words, its calculation shows the possible outcome of an event with the relative possibility of occurrence or non-occurrence as required.read more of stock and many other asset prices. For instance, we have observed a lognormal appearing in the Black-Scholes-Merton option pricing model, where there is an assumption that the price of an underlying asset option distributes lognormally simultaneously.
Conclusion
- The normal distribution is the probability distribution, which is the asymmetrical and bell-shaped curve. In a normal distribution, 69% of the outcome falls within one standard deviation, and 95% falls within two standard deviations.Due to the popularity of normal distribution, most people are familiar with the concept and application of normal distribution. Still, at the time, they didn’t seem equally familiar with the concept of the lognormal distribution. One can convert the normal distribution into a lognormal distribution with the help of logarithms, which becomes the fundamental basis as the lognormal distributions consider the only random variable distributed normally.One can use the lognormal distributions in conjunction with the normal distribution. Lognormal distributions are the outcome of assuming the ln, natural logarithm in which base is equal to e = 2.718. In addition to the given base, the lognormal distribution can be made using another base, which would subsequently impact the shape of the lognormal distribution.The lognormal distribution graphs the log of normally distributed random variables from the normal distribution curves. The ln, the natural log, is known as e, the exponent to which one should raise a base to get the desired random variable x, which one could find on the normal distribution curve.
Recommended Articles
This article has been a guide to what log-normal distribution is and its definition. Here we discuss examples of log-normal distribution along with its parameters, applications, and uses. You can learn more about finance from the following articles: –
- Reserve Price MeaningPoisson Distribution in ExcelExponential Distribution FormulaHypergeometric Distribution Formula
