The nth moment about the mean (or nth central moment) of a real-valued random variable X is the quantity μ_n := E[(X − E[X])ⁿ], where E is the expectation operator. For a continuous univariate probability distribution with probability density function f(x), the nth moment about the mean μ is

${\displaystyle \mu _{n}=\operatorname {E} \left[(X-\operatorname {E} [X])^{n}\right]=\int _{-\infty }^{+\infty }(x-\mu )^{n}f(x)\,\mathrm {d} x.}$ ^[1]

For random variables that have no mean, such as the Cauchy distribution, central moments are not defined.

The first few central moments have intuitive interpretations:

• The "zeroth" central moment μ₀ is 1.
• The first central moment μ₁ is 0 (not to be confused with the first raw moment or the expected value μ).
• The second central moment μ₂ is called the variance, and is usually denoted σ², where σ represents the standard deviation.
• The third and fourth central moments are used to define the standardized moments which are used to define skewness and kurtosis, respectively.

For all n, the nth central moment is homogeneous of degree n:

${\displaystyle \mu _{n}(cX)=c^{n}\mu _{n}(X).\,}$ 

Only for n such that n equals 1, 2, or 3 do we have an additivity property for random variables X and Y that are independent:

${\displaystyle \mu _{n}(X+Y)=\mu _{n}(X)+\mu _{n}(Y)\,}$  provided n ∈ {1, 2, 3}.

A related functional that shares the translation-invariance and homogeneity properties with the nth central moment, but continues to have this additivity property even when n ≥ 4 is the nth cumulant κ_n(X). For n = 1, the nth cumulant is just the expected value; for n = either 2 or 3, the nth cumulant is just the nth central moment; for n ≥ 4, the nth cumulant is an nth-degree monic polynomial in the first n moments (about zero), and is also a (simpler) nth-degree polynomial in the first n central moments.

Sometimes it is convenient to convert moments about the origin to moments about the mean. The general equation for converting the nth-order moment about the origin to the moment about the mean is

${\displaystyle \mu _{n}=\operatorname {E} \left[\left(X-\operatorname {E} [X]\right)^{n}\right]=\sum _{j=0}^{n}{n \choose j}(-1)^{n-j}\mu '_{j}\mu ^{n-j},}$ 

where μ is the mean of the distribution, and the moment about the origin is given by

${\displaystyle \mu '_{m}=\int _{-\infty }^{+\infty }x^{m}f(x)\,dx=\operatorname {E} [X^{m}]=\sum _{j=0}^{m}{m \choose j}\mu _{j}\mu ^{m-j}.}$ 

For the cases n = 2, 3, 4 — which are of most interest because of the relations to variance, skewness, and kurtosis, respectively — this formula becomes (noting that ${\displaystyle \mu =\mu '_{1}}$  and ${\displaystyle \mu '_{0}=1}$ ):

${\displaystyle \mu _{2}=\mu '_{2}-\mu ^{2}\,}$  which is commonly referred to as ${\displaystyle \operatorname {Var} (X)=\operatorname {E} [X^{2}]-\left(\operatorname {E} [X]\right)^{2}}$ 

${\displaystyle \mu _{3}=\mu '_{3}-3\mu \mu '_{2}+2\mu ^{3}\,}$ 

${\displaystyle \mu _{4}=\mu '_{4}-4\mu \mu '_{3}+6\mu ^{2}\mu '_{2}-3\mu ^{4}.\,}$ 

... and so on,^[2] following Pascal's triangle, i.e.

${\displaystyle \mu _{5}=\mu '_{5}-5\mu \mu '_{4}+10\mu ^{2}\mu '_{3}-10\mu ^{3}\mu '_{2}+4\mu ^{5}.\,}$ 

because ${\displaystyle 5\mu ^{4}\mu '_{1}-\mu ^{5}\mu '_{0}=5\mu ^{4}\mu -\mu ^{5}=5\mu ^{5}-\mu ^{5}=4\mu ^{5}}$ 

The following sum is a stochastic variable having a compound distribution

${\displaystyle W=\sum _{i=1}^{M}Y_{i},}$ 

where the ${\displaystyle Y_{i}}$  are mutually independent random variables sharing the same common distribution and ${\displaystyle M}$  a random integer variable independent of the ${\displaystyle Y_{k}}$  with its own distribution. The moments of ${\displaystyle W}$  are obtained as

${\displaystyle \operatorname {E} [W^{n}]=\sum _{i=0}^{n}\operatorname {E} \left[{M \choose i}\right]\sum _{j=0}^{i}{i \choose j}(-1)^{i-j}\operatorname {E} \left[\left(\sum _{k=1}^{j}Y_{k}\right)^{n}\right],}$ 

where ${\displaystyle \operatorname {E} \left[\left(\sum _{k=1}^{j}Y_{k}\right)^{n}\right]}$  is defined as zero for ${\displaystyle j=0}$ .

In distributions that are symmetric about their means (unaffected by being reflected about the mean), all odd central moments equal zero whenever they exist, because in the formula for the nth moment, each term involving a value of X less than the mean by a certain amount exactly cancels out the term involving a value of X greater than the mean by the same amount.

For a continuous bivariate probability distribution with probability density function f(x,y) the (j,k) moment about the mean μ = (μ_X, μ_Y) is

${\displaystyle \mu _{j,k}=\operatorname {E} \left[(X-\operatorname {E} [X])^{j}(Y-\operatorname {E} [Y])^{k}\right]=\int _{-\infty }^{+\infty }\int _{-\infty }^{+\infty }(x-\mu _{X})^{j}(y-\mu _{Y})^{k}f(x,y)\,dx\,dy.}$ 

The nth central moment for a complex random variable X is defined as ^[3]

The absolute nth central moment of X is defined as

The 2nd-order central moment β₂ is called the variance of X whereas the 2nd-order central moment α₂ is the pseudo-variance of X.

• Standardized moment
• Image moment
• Normal distribution § Moments
• Complex random variable