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means

Mean is a measure of central tendency used to summarize a data set by a single representative value. The term can refer to several related concepts, with the arithmetic mean being the most commonly used.

The arithmetic mean, or simply the average, of data x1, x2, ..., xn is x̄ = (x1 + x2 +

The geometric mean, defined for positive numbers as G = (x1 x2 ... xn)^(1/n), describes typical multiplicative growth

The harmonic mean, H = n / Σ (1/x_i), also defined for positive data, is appropriate for averaging quantities

Other means include generalized or power means M_r = ((1/n) Σ xi^r)^(1/r), with r = 1 yielding the arithmetic,

In practice, the choice of mean depends on the data structure and the question of interest; the

...
+
xn)
/
n.
The
population
mean
μ
is
the
expected
value
of
a
random
variable,
while
the
sample
mean
x̄
estimates
μ
from
observed
data.
When
observations
carry
weights
w1,
w2,
...,
wn,
the
weighted
mean
is
(Σ
w_i
x_i)
/
(Σ
w_i).
The
arithmetic
mean
is
sensitive
to
outliers
and
may
not
reflect
the
center
of
skewed
distributions.
and
ratios.
It
is
less
affected
by
extreme
values
than
the
arithmetic
mean
and
is
often
used
for
rates
or
normalized
data.
The
geometric
mean
relates
to
the
mean
of
logarithms:
log
G
equals
the
average
of
log
xi.
like
rates
or
speeds
that
combine
inversely.
It
emphasizes
smaller
values
and
can
be
heavily
influenced
by
near-zero
terms.
r
=
0
yielding
the
geometric
mean,
and
r
=
-1
yielding
the
harmonic
mean.
The
mean
in
probability
corresponds
to
the
expected
value,
and
the
sample
mean
is
a
common
estimator
for
the
population
mean,
with
behavior
described
by
the
Law
of
Large
Numbers.
mean
is
informative
for
symmetric,
non-skewed
data
but
can
be
misleading
for
skewed
distributions.