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variance
variance (and mean) of a vector or matrix (or hypermatrix) of real or complex numbers
Syntax
[s [,mc]] = variance(x [,orien [,m]]) [s, mc] = variance(x) [s, mc] = variance(x, "r"|1 ) [s, mc] = variance(x, "c"|2 ) [s, mc] = variance(x, "*" , %nan) [s, mc] = variance(x, "r"|1, %nan) [s, mc] = variance(x, "c"|2, %nan) s = variance(x, "*", m) s = variance(x, "r"|1, m) s = variance(x, "c"|2, m)
Arguments
- x
real or complex vector or matrix. A hypermatrix is accepted only for undirectional computations
variance(x)
orvariance(x,"*",m)
- orien
the orientation of the computation. Valid values are
- 1 or "r": result is a row, after a column-wise computation.
- 2 or "c": result is a column, after a row-wise computation.
- "*": full undirectional computation (default); explicitly required when
m
is used.
- m
The known mean of the underlying statistical distribution law (assuming that it is known).
- "*" mode (default):
m
must be scalar - "r" or 1 mode:
m
is a row of lengthsize(x,2)
. The variance along the column #j is computed usingm(j)
as the mean for the considered column. Ifm(j)
is the same for all columns, it can be provided as a scalarm
. - "c" or 2 mode:
m
is a column of lengthsize(x,1)
. The variance along the row #i is computed usingm(i)
as the mean for the considered row. Ifm(i)
is the same for all rows, it can be provided as a scalarm
.
When
m
is not provided, thevariance
is built dividing the quadratic distance ofn
values tomean(x)
(ormean(x,"c")
ormean(x,"r")
) byn-1
(n
beinglength(x)
orsize(x,1)
orsize(x,2)
). If the elements ofx
are mutually independent, the result is then statistically unbiased.Else, the
variance
is built dividing the quadratic distance of values tom
by the number n of considered values (n being length(x) or size(x,1) or size(x,2)).If a true value
m
independent from x elements is used,x
andm
values are mutually independent, and the result is then unbiased.When the special value
m = %nan
is provided, the variance is still normalized by n (not n-1) but is computed usingm=mean(x)
instead (orm = mean(x,"c")
orm = mean(x,"r")
). Thism
does not bring independent information, and yields a statistically biased result.- "*" mode (default):
- s
- The variance of unweighted values of
x
elements. It is a scalar or a column vector or a row vector according toorien
. - mc
- Scalar or
orien
-wise mean ofx
elements (unweighted) (= mean(x,..)
), as computed before and used as reference in the variance.
Description
This function computes the variance of the real or complex numbers stored into a vector or matrix x
. If x
is complex, variance(x,..) = variance(real(x),..) + variance(imag(x),..)
is returned.
For a vector, a matrix, or a hypermatrix x
, s = variance(x)
returns in the scalar s
the variance of all the entries of x
.
s = variance(x,"c")
(or, equivalently, s = variance(x,2)
)
is the columnwise variance: s
is a column vector, with s(j) = variance(x(j,:))
.
s = variance(x,"r")
(or, equivalently, s = variance(x,1)
)
is the rowwise variance: s
is a row vector, with s(i) = variance(x(:,i))
.
The second output argument m
is the mean of the input, with respect to the orien
parameter.
The variance(x, "*"|"c"|"r", 1) synopsis used only in Scilab 5.4.1 must be replaced with
variance(x, "*"|"c"|"r", %nan) . variance(x, "*"|"c"|"r", 1) will warn
the user until Scilab 6.0. Indeed, 1 will be now considered as m=1 .
If 1 is the true value provided as m , the warning may be avoided entering 1+%eps instead
of 1 . |
Examples
x = [ 0.2113249 0.0002211 0.6653811; 0.7560439 0.4453586 0.6283918 ] s = variance(x) s = variance(x, "r") s = variance(x, "c") // The underlying statistical distribution and its mean are known: x = grand(100, 5, "unf", 0, 7); // Uniform distribution on [0, 7] // => the true asymptotic mean is (0+7)/2 = 3.5 and variance = (7-0)^2/12 (7-0)^2/12 // True asymptotic variance s = variance(x) // Unbiased (division by n-1). s = variance(x, "*", 3.5) // Unbiased (division by n). Always >= variance(x) s = variance(x, "*", %nan) // Biased (division by n). Always <= variance(x) // Across columns: s = variance(x, "c") s = variance(x, "c", 3.5) s = variance(x, "c", %nan) // With complex numbers uniformly distributed on [0,1] + [0,1].i: x = rand(4, 3) + rand(4, 3)*%i s = variance(x) s = variance(x, "*", 0.5 + 0.5*%i) s = variance(x, "*", %nan) s = variance(x, "r") s = variance(x, "c") // With a hypermatrix x = rand(3, 2, 2) // Uniform distribution on [0, 1] s = variance(x) s = variance(x, "*", 0.5) s = variance(x, "*", %nan) // s = variance(x, "r") // Is not supported for a hypermatrix // s = variance(x, "c") // Is not supported for a hypermatrix
See also
Bibliography
Wonacott, T.H. & Wonacott, R.J.; Introductory Statistics, fifth edition, J.Wiley & Sons, 1990.
History
Versão | Descrição |
5.5.0 |
|
5.4.1 |
|
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