Normal distribution
In probability theory, a normal (or Gaussian or Gauss or Laplace–Gauss) distribution is a type of continuous probability distribution for a realvalued random variable. The general form of its probability density function is
Probability density function The red curve is the standard normal distribution  
Cumulative distribution function  
Notation  

Parameters 
= mean (location) = variance (squared scale)  
Support  
CDF  
Quantile  
Mean  
Median  
Mode  
Variance  
MAD  
Skewness  
Ex. kurtosis  
Entropy  
MGF  
CF  
Fisher information 
 
KullbackLeibler divergence 
The parameter is the mean or expectation of the distribution (and also its median and mode); and is its standard deviation. The variance of the distribution is . A random variable with a Gaussian distribution is said to be normally distributed and is called a normal deviate.
Normal distributions are important in statistics and are often used in the natural and social sciences to represent realvalued random variables whose distributions are not known.^{[1]}^{[2]} Their importance is partly due to the central limit theorem. It states that, under some conditions, the average of many samples (observations) of a random variable with finite mean and variance is itself a random variable whose distribution converges to a normal distribution as the number of samples increases. Therefore, physical quantities that are expected to be the sum of many independent processes (such as measurement errors) often have distributions that are nearly normal.^{[3]}
Moreover, Gaussian distributions have some unique properties that are valuable in analytic studies. For instance, any linear combination of a fixed collection of normal deviates is a normal deviate. Many results and methods (such as propagation of uncertainty and least squares parameter fitting) can be derived analytically in explicit form when the relevant variables are normally distributed.
A normal distribution is sometimes informally called a bell curve. However, many other distributions are bellshaped (such as the Cauchy, Student's t, and logistic distributions).
Contents
 1 Definitions
 2 Properties
 3 Related distributions
 4 Statistical Inference
 5 Occurrence and applications
 6 Computational methods
 7 History
 8 See also
 9 Notes
 10 References
 11 External links
DefinitionsEdit
Standard normal distributionEdit
The simplest case of a normal distribution is known as the standard normal distribution. This is a special case when and , and it is described by this probability density function:
The factor in this expression ensures that the total area under the curve is equal to one.^{[note 1]} The factor in the exponent ensures that the distribution has unit variance (i.e. the variance is equal to one), and therefore also unit standard deviation. This function is symmetric around , where it attains its maximum value and has inflection points at and .
Authors differ on which normal distribution should be called the "standard" one. Gauss defined the standard normal as having variance , that is
Stigler^{[4]} goes even further, defining the standard normal with variance :
General normal distributionEdit
Every normal distribution is a version of the standard normal distribution whose domain has been stretched by a factor (the standard deviation) and then translated by (the mean value):
The probability density must be scaled by so that the integral is still 1.
If is a standard normal deviate, then will have a normal distribution with expected value and standard deviation . Conversely, if is a normal deviate with parameters and , then will have a standard normal distribution. This variate is called the standardized form of
Every normal distribution is the exponential of a quadratic function:
where and . In this form, the mean value is , and the variance is . For the standard normal distribution, , , and .
NotationEdit
The probability density of the standard Gaussian distribution (standard normal distribution) (with zero mean and unit variance) is often denoted with the Greek letter (phi).^{[5]} The alternative form of the Greek letter phi, , is also used quite often.
The normal distribution is often referred to as or .^{[6]} Thus when a random variable is distributed normally with mean and variance , one may write
Alternative parameterizationsEdit
Some authors advocate using the precision as the parameter defining the width of the distribution, instead of the deviation or the variance . The precision is normally defined as the reciprocal of the variance, .^{[7]} The formula for the distribution then becomes
This choice is claimed to have advantages in numerical computations when is very close to zero and simplify formulas in some contexts, such as in the Bayesian inference of variables with multivariate normal distribution.
Also the reciprocal of the standard deviation might be defined as the precision and the expression of the normal distribution becomes
According to Stigler, this formulation is advantageous because of a much simpler and easiertoremember formula, and simple approximate formulas for the quantiles of the distribution.
Normal distributions form an exponential family with natural parameters and , and natural statistics x and x^{2}. The dual, expectation parameters for normal distribution are η_{1} = μ and η_{2} = μ^{2} + σ^{2}.
Cumulative distribution functionEdit
The cumulative distribution function (CDF) of the standard normal distribution, usually denoted with the capital Greek letter (phi), is the integral
The related error function gives the probability of a random variable with normal distribution of mean 0 and variance 1/2 falling in the range ; that is
These integrals cannot be expressed in terms of elementary functions, and are often said to be special functions. However, many numerical approximations are known; see below.
The two functions are closely related, namely
For a generic normal distribution with density , mean and deviation , the cumulative distribution function is
The complement of the standard normal CDF, , is often called the Qfunction, especially in engineering texts.^{[8]}^{[9]} It gives the probability that the value of a standard normal random variable will exceed : . Other definitions of the function, all of which are simple transformations of , are also used occasionally.^{[10]}
The graph of the standard normal CDF has 2fold rotational symmetry around the point (0,1/2); that is, . Its antiderivative (indefinite integral) is
The CDF of the standard normal distribution can be expanded by Integration by parts into a series:
where denotes the double factorial.
An asymptotic expansion of the CDF for large x can also be derived using integration by parts; see Error function#Asymptotic expansion.^{[11]}
Standard deviation and coverageEdit
About 68% of values drawn from a normal distribution are within one standard deviation σ away from the mean; about 95% of the values lie within two standard deviations; and about 99.7% are within three standard deviations. This fact is known as the 689599.7 (empirical) rule, or the 3sigma rule.
More precisely, the probability that a normal deviate lies in the range between and is given by
To 12 significant figures, the values for are:^{[12]}
OEIS  

1  0.682689492137  0.317310507863 

OEIS: A178647  
2  0.954499736104  0.045500263896 

OEIS: A110894  
3  0.997300203937  0.002699796063 

OEIS: A270712  
4  0.999936657516  0.000063342484 
 
5  0.999999426697  0.000000573303 
 
6  0.999999998027  0.000000001973 

Quantile functionEdit
The quantile function of a distribution is the inverse of the cumulative distribution function. The quantile function of the standard normal distribution is called the probit function, and can be expressed in terms of the inverse error function:
For a normal random variable with mean and variance , the quantile function is
The quantile of the standard normal distribution is commonly denoted as . These values are used in hypothesis testing, construction of confidence intervals and QQ plots. A normal random variable will exceed with probability , and will lie outside the interval with probability . In particular, the quantile is 1.96; therefore a normal random variable will lie outside the interval in only 5% of cases.
The following table gives the quantile such that will lie in the range with a specified probability . These values are useful to determine tolerance interval for sample averages and other statistical estimators with normal (or asymptotically normal) distributions:.^{[13]}^{[14]} NOTE: the following table shows , not as defined above.
0.80  1.281551565545  0.999  3.290526731492  
0.90  1.644853626951  0.9999  3.890591886413  
0.95  1.959963984540  0.99999  4.417173413469  
0.98  2.326347874041  0.999999  4.891638475699  
0.99  2.575829303549  0.9999999  5.326723886384  
0.995  2.807033768344  0.99999999  5.730728868236  
0.998  3.090232306168  0.999999999  6.109410204869 
For small , the quantile function has the useful asymptotic expansion
PropertiesEdit
The normal distribution is the only distribution whose cumulants beyond the first two (i.e., other than the mean and variance) are zero. It is also the continuous distribution with the maximum entropy for a specified mean and variance.^{[15]}^{[16]} Geary has shown, assuming that the mean and variance are finite, that the normal distribution is the only distribution where the mean and variance calculated from a set of independent draws are independent of each other.^{[17]}^{[18]}
The normal distribution is a subclass of the elliptical distributions. The normal distribution is symmetric about its mean, and is nonzero over the entire real line. As such it may not be a suitable model for variables that are inherently positive or strongly skewed, such as the weight of a person or the price of a share. Such variables may be better described by other distributions, such as the lognormal distribution or the Pareto distribution.
The value of the normal distribution is practically zero when the value lies more than a few standard deviations away from the mean (e.g., a spread of three standard deviations covers all but 0.27% of the total distribution). Therefore, it may not be an appropriate model when one expects a significant fraction of outliers—values that lie many standard deviations away from the mean—and least squares and other statistical inference methods that are optimal for normally distributed variables often become highly unreliable when applied to such data. In those cases, a more heavytailed distribution should be assumed and the appropriate robust statistical inference methods applied.
The Gaussian distribution belongs to the family of stable distributions which are the attractors of sums of independent, identically distributed distributions whether or not the mean or variance is finite. Except for the Gaussian which is a limiting case, all stable distributions have heavy tails and infinite variance. It is one of the few distributions that are stable and that have probability density functions that can be expressed analytically, the others being the Cauchy distribution and the Lévy distribution.
Symmetries and derivativesEdit
The normal distribution with density (mean and standard deviation ) has the following properties:
 It is symmetric around the point which is at the same time the mode, the median and the mean of the distribution.^{[19]}
 It is unimodal: its first derivative is positive for negative for and zero only at
 The area under the curve and over the axis is unity (i.e. equal to one).
 Its density has two inflection points (where the second derivative of is zero and changes sign), located one standard deviation away from the mean, namely at and ^{[19]}
 Its density is logconcave.^{[19]}
 Its density is infinitely differentiable, indeed supersmooth of order 2.^{[20]}
Furthermore, the density of the standard normal distribution (i.e. and ) also has the following properties:
 Its first derivative is
 Its second derivative is
 More generally, its nth derivative is where is the nth (probabilist) Hermite polynomial.^{[21]}
 The probability that a normally distributed variable with known and is in a particular set, can be calculated by using the fact that the fraction has a standard normal distribution.
MomentsEdit
The plain and absolute moments of a variable are the expected values of and , respectively. If the expected value of is zero, these parameters are called central moments. Usually we are interested only in moments with integer order .
If has a normal distribution, these moments exist and are finite for any whose real part is greater than −1. For any nonnegative integer , the plain central moments are:^{[22]}
Here denotes the double factorial, that is, the product of all numbers from to 1 that have the same parity as
The central absolute moments coincide with plain moments for all even orders, but are nonzero for odd orders. For any nonnegative integer
The last formula is valid also for any noninteger When the mean the plain and absolute moments can be expressed in terms of confluent hypergeometric functions and ^{[citation needed]}
These expressions remain valid even if is not integer. See also generalized Hermite polynomials.
Order  Noncentral moment  Central moment 

1  
2  
3  
4  
5  
6  
7  
8 
The expectation of conditioned on the event that lies in an interval is given by
where and respectively are the density and the cumulative distribution function of . For this is known as the inverse Mills ratio. Note that above, density of is used instead of standard normal density as in inverse Mills ratio, so here we have instead of .
Fourier transform and characteristic functionEdit
The Fourier transform of a normal density with mean and standard deviation is^{[23]}
where is the imaginary unit. If the mean , the first factor is 1, and the Fourier transform is, apart from a constant factor, a normal density on the frequency domain, with mean 0 and standard deviation . In particular, the standard normal distribution is an eigenfunction of the Fourier transform.
In probability theory, the Fourier transform of the probability distribution of a realvalued random variable is closely connected to the characteristic function of that variable, which is defined as the expected value of , as a function of the real variable (the frequency parameter of the Fourier transform). This definition can be analytically extended to a complexvalue variable .^{[24]} The relation between both is:
Moment and cumulant generating functionsEdit
The moment generating function of a real random variable is the expected value of , as a function of the real parameter . For a normal distribution with density , mean and deviation , the moment generating function exists and is equal to
The cumulant generating function is the logarithm of the moment generating function, namely
Since this is a quadratic polynomial in , only the first two cumulants are nonzero, namely the mean and the variance .
Zerovariance limitEdit
In the limit when tends to zero, the probability density eventually tends to zero at any , but grows without limit if , while its integral remains equal to 1. Therefore, the normal distribution cannot be defined as an ordinary function when .
However, one can define the normal distribution with zero variance as a generalized function; specifically, as Dirac's "delta function" translated by the mean , that is Its CDF is then the Heaviside step function translated by the mean , namely
Maximum entropyEdit
Of all probability distributions over the reals with a specified mean and variance , the normal distribution is the one with maximum entropy.^{[25]} If is a continuous random variable with probability density , then the entropy of is defined as^{[26]}^{[27]}^{[28]}
where is understood to be zero whenever . This functional can be maximized, subject to the constraints that the distribution is properly normalized and has a specified variance, by using variational calculus. A function with two Lagrange multipliers is defined:
where is, for now, regarded as some density function with mean and standard deviation .
At maximum entropy, a small variation about will produce a variation about which is equal to 0:
Since this must hold for any small , the term in brackets must be zero, and solving for yields:
Using the constraint equations to solve for and yields the density of the normal distribution:
The entropy of normal distribution equals to
Operations on normal deviatesEdit
The family of normal distributions is closed under linear transformations: if is normally distributed with mean and standard deviation , then the variable , for any real numbers and , is also normally distributed, with mean and standard deviation .
Also if and are two independent normal random variables, with means , and standard deviations , , then their sum will also be normally distributed,^{[proof]} with mean and variance .
In particular, if and are independent normal deviates with zero mean and variance , then and are also independent and normally distributed, with zero mean and variance . This is a special case of the polarization identity.^{[29]}
Also, if , are two independent normal deviates with mean and deviation , and , are arbitrary real numbers, then the variable
is also normally distributed with mean and deviation . It follows that the normal distribution is stable (with exponent ).
More generally, any linear combination of independent normal deviates is a normal deviate.
Infinite divisibility and Cramér's theoremEdit
For any positive integer , any normal distribution with mean and variance is the distribution of the sum of independent normal deviates, each with mean and variance . This property is called infinite divisibility.^{[30]}
Conversely, if and are independent random variables and their sum has a normal distribution, then both and must be normal deviates.^{[31]}
This result is known as Cramér’s decomposition theorem, and is equivalent to saying that the convolution of two distributions is normal if and only if both are normal. Cramér's theorem implies that a linear combination of independent nonGaussian variables will never have an exactly normal distribution, although it may approach it arbitrarily closely.^{[32]}
Bernstein's theoremEdit
Bernstein's theorem states that if and are independent and and are also independent, then both X and Y must necessarily have normal distributions.^{[33]}^{[34]}
More generally, if are independent random variables, then two distinct linear combinations and will be independent if and only if all are normal and , where denotes the variance of .^{[33]}
Other propertiesEdit
 If the characteristic function of some random variable is of the form , where is a polynomial, then the Marcinkiewicz theorem (named after Józef Marcinkiewicz) asserts that can be at most a quadratic polynomial, and therefore is a normal random variable.^{[32]} The consequence of this result is that the normal distribution is the only distribution with a finite number (two) of nonzero cumulants.
 If and are jointly normal and uncorrelated, then they are independent. The requirement that and should be jointly normal is essential; without it the property does not hold.^{[35]}^{[36]}^{[proof]} For nonnormal random variables uncorrelatedness does not imply independence.
 The Kullback–Leibler divergence of one normal distribution from another is given by:^{[37]}
The Hellinger distance between the same distributions is equal to
 The Fisher information matrix for a normal distribution is diagonal and takes the form
 The conjugate prior of the mean of a normal distribution is another normal distribution.^{[38]} Specifically, if are iid and the prior is , then the posterior distribution for the estimator of will be
 The family of normal distributions not only forms an exponential family (EF), but in fact forms a natural exponential family (NEF) with quadratic variance function (NEFQVF). Many properties of normal distributions generalize to properties of NEFQVF distributions, NEF distributions, or EF distributions generally. NEFQVF distributions comprises 6 families, including Poisson, Gamma, binomial, and negative binomial distributions, while many of the common families studied in probability and statistics are NEF or EF.
 In information geometry, the family of normal distributions forms a statistical manifold with constant curvature . The same family is flat with respect to the (±1)connections ∇ and ∇ .^{[39]}
Related distributionsEdit
Central limit theoremEdit
The central limit theorem states that under certain (fairly common) conditions, the sum of many random variables will have an approximately normal distribution. More specifically, where are independent and identically distributed random variables with the same arbitrary distribution, zero mean, and variance and is their mean scaled by
Then, as increases, the probability distribution of will tend to the normal distribution with zero mean and variance .
The theorem can be extended to variables that are not independent and/or not identically distributed if certain constraints are placed on the degree of dependence and the moments of the distributions.
Many test statistics, scores, and estimators encountered in practice contain sums of certain random variables in them, and even more estimators can be represented as sums of random variables through the use of influence functions. The central limit theorem implies that those statistical parameters will have asymptotically normal distributions.
The central limit theorem also implies that certain distributions can be approximated by the normal distribution, for example:
 The binomial distribution is approximately normal with mean and variance for large and for not too close to 0 or 1.
 The Poisson distribution with parameter is approximately normal with mean and variance , for large values of .^{[40]}
 The chisquared distribution is approximately normal with mean and variance , for large .
 The Student's tdistribution is approximately normal with mean 0 and variance 1 when is large.
Whether these approximations are sufficiently accurate depends on the purpose for which they are needed, and the rate of convergence to the normal distribution. It is typically the case that such approximations are less accurate in the tails of the distribution.
A general upper bound for the approximation error in the central limit theorem is given by the Berry–Esseen theorem, improvements of the approximation are given by the Edgeworth expansions.
Operations on a single random variableEdit
If X is distributed normally with mean μ and variance σ^{2}, then
 The exponential of X is distributed lognormally: e^{X} ~ ln(N (μ, σ^{2})).
 The absolute value of X has folded normal distribution: X ~ N_{f} (μ, σ^{2}). If μ = 0 this is known as the halfnormal distribution.
 The absolute value of normalized residuals, X − μ/σ, has chi distribution with one degree of freedom: X − μ/σ ~ .
 The square of X/σ has the noncentral chisquared distribution with one degree of freedom: X^{2}/σ^{2} ~ (μ^{2}/σ^{2}). If μ = 0, the distribution is called simply chisquared.
 The distribution of the variable X restricted to an interval [a, b] is called the truncated normal distribution.
 (X − μ)^{−2} has a Lévy distribution with location 0 and scale σ^{−2}.
Combination of two independent random variablesEdit
If and are two independent standard normal random variables with mean 0 and variance 1, then
 Their sum and difference is distributed normally with mean zero and variance two: .
 Their product follows the "productnormal" distribution^{[41]} with density function where is the modified Bessel function of the second kind. This distribution is symmetric around zero, unbounded at , and has the characteristic function .
 Their ratio follows the standard Cauchy distribution: .
 Their Euclidean norm has the Rayleigh distribution.
Combination of two or more independent random variablesEdit
 If are independent standard normal random variables, then the sum of their squares has the chisquared distribution with degrees of freedom
 If are independent normally distributed random variables with means and variances , then their sample mean is independent from the sample standard deviation,^{[42]} which can be demonstrated using Basu's theorem or Cochran's theorem.^{[43]} The ratio of these two quantities will have the Student's tdistribution with degrees of freedom:
 If , are independent standard normal random variables, then the ratio of their normalized sums of squares will have the Fdistribution with (n, m) degrees of freedom:^{[44]}
Operations on the density functionEdit
The split normal distribution is most directly defined in terms of joining scaled sections of the density functions of different normal distributions and rescaling the density to integrate to one. The truncated normal distribution results from rescaling a section of a single density function.
ExtensionsEdit
The notion of normal distribution, being one of the most important distributions in probability theory, has been extended far beyond the standard framework of the univariate (that is onedimensional) case (Case 1). All these extensions are also called normal or Gaussian laws, so a certain ambiguity in names exists.
 The multivariate normal distribution describes the Gaussian law in the kdimensional Euclidean space. A vector X ∈ R^{k} is multivariatenormally distributed if any linear combination of its components ∑^{k}
_{j=1}a_{j} X_{j} has a (univariate) normal distribution. The variance of X is a k×k symmetric positivedefinite matrix V. The multivariate normal distribution is a special case of the elliptical distributions. As such, its isodensity loci in the k = 2 case are ellipses and in the case of arbitrary k are ellipsoids.  Rectified Gaussian distribution a rectified version of normal distribution with all the negative elements reset to 0
 Complex normal distribution deals with the complex normal vectors. A complex vector X ∈ C^{k} is said to be normal if both its real and imaginary components jointly possess a 2kdimensional multivariate normal distribution. The variancecovariance structure of X is described by two matrices: the variance matrix Γ, and the relation matrix C.
 Matrix normal distribution describes the case of normally distributed matrices.
 Gaussian processes are the normally distributed stochastic processes. These can be viewed as elements of some infinitedimensional Hilbert space H, and thus are the analogues of multivariate normal vectors for the case k = ∞. A random element h ∈ H is said to be normal if for any constant a ∈ H the scalar product (a, h) has a (univariate) normal distribution. The variance structure of such Gaussian random element can be described in terms of the linear covariance operator K: H → H. Several Gaussian processes became popular enough to have their own names:
 Gaussian qdistribution is an abstract mathematical construction that represents a "qanalogue" of the normal distribution.
 the qGaussian is an analogue of the Gaussian distribution, in the sense that it maximises the Tsallis entropy, and is one type of Tsallis distribution. Note that this distribution is different from the Gaussian qdistribution above.
A random variable X has a twopiece normal distribution if it has a distribution
where μ is the mean and σ_{1} and σ_{2} are the standard deviations of the distribution to the left and right of the mean respectively.
The mean, variance and third central moment of this distribution have been determined^{[45]}
where E(X), V(X) and T(X) are the mean, variance, and third central moment respectively.
One of the main practical uses of the Gaussian law is to model the empirical distributions of many different random variables encountered in practice. In such case a possible extension would be a richer family of distributions, having more than two parameters and therefore being able to fit the empirical distribution more accurately. The examples of such extensions are:
 Pearson distribution — a fourparameter family of probability distributions that extend the normal law to include different skewness and kurtosis values.
 The generalized normal distribution, also known as the exponential power distribution, allows for distribution tails with thicker or thinner asymptotic behaviors.
Statistical InferenceEdit
Estimation of parametersEdit
It is often the case that we don't know the parameters of the normal distribution, but instead want to estimate them. That is, having a sample from a normal population we would like to learn the approximate values of parameters and . The standard approach to this problem is the maximum likelihood method, which requires maximization of the loglikelihood function:
Taking derivatives with respect to and and solving the resulting system of first order conditions yields the maximum likelihood estimates:
Sample meanEdit
Estimator is called the sample mean, since it is the arithmetic mean of all observations. The statistic is complete and sufficient for , and therefore by the Lehmann–Scheffé theorem, is the uniformly minimum variance unbiased (UMVU) estimator.^{[46]} In finite samples it is distributed normally:
The variance of this estimator is equal to the μμelement of the inverse Fisher information matrix . This implies that the estimator is finitesample efficient. Of practical importance is the fact that the standard error of is proportional to , that is, if one wishes to decrease the standard error by a factor of 10, one must increase the number of points in the sample by a factor of 100. This fact is widely used in determining sample sizes for opinion polls and the number of trials in Monte Carlo simulations.
From the standpoint of the asymptotic theory, is consistent, that is, it converges in probability to as . The estimator is also asymptotically normal, which is a simple corollary of the fact that it is normal in finite samples:
Sample varianceEdit
The estimator is called the sample variance, since it is the variance of the sample ( ). In practice, another estimator is often used instead of the . This other estimator is denoted , and is also called the sample variance, which represents a certain ambiguity in terminology; its square root is called the sample standard deviation. The estimator differs from by having (n − 1) instead of n in the denominator (the socalled Bessel's correction):
The difference between and becomes negligibly small for large n's. In finite samples however, the motivation behind the use of is that it is an unbiased estimator of the underlying parameter , whereas is biased. Also, by the Lehmann–Scheffé theorem the estimator is uniformly minimum variance unbiased (UMVU),^{[46]} which makes it the "best" estimator among all unbiased ones. However it can be shown that the biased estimator is "better" than the in terms of the mean squared error (MSE) criterion. In finite samples both and have scaled chisquared distribution with (n − 1) degrees of freedom:
The first of these expressions shows that the variance of is equal to , which is slightly greater than the σσelement of the inverse Fisher information matrix . Thus, is not an efficient estimator for , and moreover, since is UMVU, we can conclude that the finitesample efficient estimator for does not exist.
Applying the asymptotic theory, both estimators and are consistent, that is they converge in probability to as the sample size . The two estimators are also both asymptotically normal:
In particular, both estimators are asymptotically efficient for .
Confidence intervalsEdit
By Cochran's theorem, for normal distributions the sample mean and the sample variance s^{2} are independent, which means there can be no gain in considering their joint distribution. There is also a converse theorem: if in a sample the sample mean and sample variance are independent, then the sample must have come from the normal distribution. The independence between and s can be employed to construct the socalled tstatistic:
This quantity t has the Student's tdistribution with (n − 1) degrees of freedom, and it is an ancillary statistic (independent of the value of the parameters). Inverting the distribution of this tstatistics will allow us to construct the confidence interval for μ;^{[47]} similarly, inverting the χ^{2} distribution of the statistic s^{2} will give us the confidence interval for σ^{2}:^{[48]}
where t_{k,p} and χ 2
k,p are the pth quantiles of the t and χ^{2}distributions respectively. These confidence intervals are of the confidence level 1 − α, meaning that the true values μ and σ^{2} fall outside of these intervals with probability (or significance level) α. In practice people usually take α = 5%, resulting in the 95% confidence intervals. The approximate formulas in the display above were derived from the asymptotic distributions of and s^{2}. The approximate formulas become valid for large values of n, and are more convenient for the manual calculation since the standard normal quantiles z_{α/2} do not depend on n. In particular, the most popular value of α = 5%, results in z_{0.025} = 1.96.
Normality testsEdit
Normality tests assess the likelihood that the given data set {x_{1}, ..., x_{n}} comes from a normal distribution. Typically the null hypothesis H_{0} is that the observations are distributed normally with unspecified mean μ and variance σ^{2}, versus the alternative H_{a} that the distribution is arbitrary. Many tests (over 40) have been devised for this problem, the more prominent of them are outlined below:
 "Visual" tests are more intuitively appealing but subjective at the same time, as they rely on informal human judgement to accept or reject the null hypothesis.
 QQ plot— is a plot of the sorted values from the data set against the expected values of the corresponding quantiles from the standard normal distribution. That is, it's a plot of point of the form (Φ^{−1}(p_{k}), x_{(k)}), where plotting points p_{k} are equal to p_{k} = (k − α)/(n + 1 − 2α) and α is an adjustment constant, which can be anything between 0 and 1. If the null hypothesis is true, the plotted points should approximately lie on a straight line.
 PP plot— similar to the QQ plot, but used much less frequently. This method consists of plotting the points (Φ(z_{(k)}), p_{k}), where . For normally distributed data this plot should lie on a 45° line between (0, 0) and (1, 1).
 ShapiroWilk test employs the fact that the line in the QQ plot has the slope of σ. The test compares the least squares estimate of that slope with the value of the sample variance, and rejects the null hypothesis if these two quantities differ significantly.
 Normal probability plot (rankit plot)
 Moment tests:
 Empirical distribution function tests:
 Lilliefors test (an adaptation of the Kolmogorov–Smirnov test)
 Anderson–Darling test
Bayesian analysis of the normal distributionEdit
Bayesian analysis of normally distributed data is complicated by the many different possibilities that may be considered:
 Either the mean, or the variance, or neither, may be considered a fixed quantity.
 When the variance is unknown, analysis may be done directly in terms of the variance, or in terms of the precision, the reciprocal of the variance. The reason for expressing the formulas in terms of precision is that the analysis of most cases is simplified.
 Both univariate and multivariate cases need to be considered.
 Either conjugate or improper prior distributions may be placed on the unknown variables.
 An additional set of cases occurs in Bayesian linear regression, where in the basic model the data is assumed to be normally distributed, and normal priors are placed on the regression coefficients. The resulting analysis is similar to the basic cases of independent identically distributed data, but more complex.
The formulas for the nonlinearregression cases are summarized in the conjugate prior article.
Sum of two quadraticsEdit
Scalar formEdit
The following auxiliary formula is useful for simplifying the posterior update equations, which otherwise become fairly tedious.
This equation rewrites the sum of two quadratics in x by expanding the squares, grouping the terms in x, and completing the square. Note the following about the complex constant factors attached to some of the terms:
 The factor has the form of a weighted average of y and z.
 This shows that this factor can be thought of as resulting from a situation where the reciprocals of quantities a and b add directly, so to combine a and b themselves, it's necessary to reciprocate, add, and reciprocate the result again to get back into the original units. This is exactly the sort of operation performed by the harmonic mean, so it is not surprising that is onehalf the harmonic mean of a and b.
Vector formEdit
A similar formula can be written for the sum of two vector quadratics: If x, y, z are vectors of length k, and A and B are symmetric, invertible matrices of size , then
where
Note that the form x′ A x is called a quadratic form and is a scalar:
In other words, it sums up all possible combinations of products of pairs of elements from x, with a separate coefficient for each. In addition, since , only the sum matters for any offdiagonal elements of A, and there is no loss of generality in assuming that A is symmetric. Furthermore, if A is symmetric, then the form
Sum of differences from the meanEdit
Another useful formula is as follows:
where
With known varianceEdit
For a set of i.i.d. normally distributed data points X of size n where each individual point x follows with known variance σ^{2}, the conjugate prior distribution is also normally distributed.
This can be shown more easily by rewriting the variance as the precision, i.e. using τ = 1/σ^{2}. Then if and we proceed as follows.
First, the likelihood function is (using the formula above for the sum of differences from the mean):
Then, we proceed as follows:
In the above derivation, we used the formula above for the sum of two quadratics and eliminated all constant factors not involving μ. The result is the kernel of a normal distribution, with mean and precision , i.e.
This can be written as a set of Bayesian update equations for the posterior parameters in terms of the prior parameters:
That is, to combine n data points with total precision of nτ (or equivalently, total variance of n/σ^{2}) and mean of values , derive a new total precision simply by adding the total precision of the data to the prior total precision, and form a new mean through a precisionweighted average, i.e. a weighted average of the data mean and the prior mean, each weighted by the associated total precision. This makes logical sense if the precision is thought of as indicating the certainty of the observations: In the distribution of the posterior mean, each of the input components is weighted by its certainty, and the certainty of this distribution is the sum of the individual certainties. (For the intuition of this, compare the expression "the whole is (or is not) greater than the sum of its parts". In addition, consider that the knowledge of the posterior comes from a combination of the knowledge of the prior and likelihood, so it makes sense that we are more certain of it than of either of its components.)
The above formula reveals why it is more convenient to do Bayesian analysis of conjugate priors for the normal distribution in terms of the precision. The posterior precision is simply the sum of the prior and likelihood precisions, and the posterior mean is computed through a precisionweighted average, as described above. The same formulas can be written in terms of variance by reciprocating all the precisions, yielding the more ugly formulas
With known meanEdit
For a set of i.i.d. normally distributed data points X of size n where each individual point x follows with known mean μ, the conjugate prior of the variance has an inverse gamma distribution or a scaled inverse chisquared distribution. The two are equivalent except for having different parameterizations. Although the inverse gamma is more commonly used, we use the scaled inverse chisquared for the sake of convenience. The prior for σ^{2} is as follows:
The likelihood function from above, written in terms of the variance, is:
where
Then:
The above is also a scaled inverse chisquared distribution where
or equivalently
Reparameterizing in terms of an inverse gamma distribution, the result is:
With unknown mean and unknown varianceEdit
For a set of i.i.d. normally distributed data points X of size n where each individual point x follows with unknown mean μ and unknown variance σ^{2}, a combined (multivariate) conjugate prior is placed over the mean and variance, consisting of a normalinversegamma distribution. Logically, this originates as follows:
 From the analysis of the case with unknown mean but known variance, we see that the update equations involve sufficient statistics computed from the data consisting of the mean of the data points and the total variance of the data points, computed in turn from the known variance divided by the number of data points.
 From the analysis of the case with unknown variance but known mean, we see that the update equations involve sufficient statistics over the data consisting of the number of data points and sum of squared deviations.
 Keep in mind that the posterior update values serve as the prior distribution when further data is handled. Thus, we should logically think of our priors in terms of the sufficient statistics just described, with the same semantics kept in mind as much as possible.
 To handle the case where both mean and variance are unknown, we could place independent priors over the mean and variance, with fixed estimates of the average mean, total variance, number of data points used to compute the variance prior, and sum of squared deviations. Note however that in reality, the total variance of the mean depends on the unknown variance, and the sum of squared deviations that goes into the variance prior (appears to) depend on the unknown mean. In practice, the latter dependence is relatively unimportant: Shifting the actual mean shifts the generated points by an equal amount, and on average the squared deviations will remain the same. This is not the case, however, with the total variance of the mean: As the unknown variance increases, the total variance of the mean will increase proportionately, and we would like to capture this dependence.
 This suggests that we create a conditional prior of the mean on the unknown variance, with a hyperparameter specifying the mean of the pseudoobservations associated with the prior, and another parameter specifying the number of pseudoobservations. This number serves as a scaling parameter on the variance, making it possible to control the overall variance of the mean relative to the actual variance parameter. The prior for the variance also has two hyperparameters, one specifying the sum of squared deviations of the pseudoobservations associated with the prior, and another specifying once again the number of pseudoobservations. Note that each of the priors has a hyperparameter specifying the number of pseudoobservations, and in each case this controls the relative variance of that prior. These are given as two separate hyperparameters so that the variance (aka the confidence) of the two priors can be controlled separately.
 This leads immediately to the normalinversegamma distribution, which is the product of the two distributions just defined, with conjugate priors used (an inverse gamma distribution over the variance, and a normal distribution over the mean, conditional on the variance) and with the same four parameters just defined.
The priors are normally defined as follows:
The update equations can be derived, and look as follows:
The respective numbers of pseudoobservations add the number of actual observations to them. The new mean hyperparameter is once again a weighted average, this time weighted by the relative numbers of observations. Finally, the update for is similar to the case with known mean, but in this case the sum of squared deviations is taken with respect to the observed data mean rather than the true mean, and as a result a new "interaction term" needs to be added to take care of the additional error source stemming from the deviation between prior and data mean.
The prior distributions are
Therefore, the joint prior is
The likelihood function from the section above with known variance is:
Writing it in terms of variance rather than precision, we get:
where
Therefore, the posterior is (dropping the hyperparameters as conditioning factors):