Ess-For-H8152.tex 19/7/2006 18: 2 Page 719
ESSENTIAL FORMULAE 719Chi-square distributionPercentile values (χ^2 p) for the Chi-square distribu-
tion withνdegrees of freedom—see Table 63.1 on
page 609.χ^2 =∑{
(o−e)^2
e}
whereoandeare the observedand expected frequencies.Symbols:Populationnumber of membersNp, meanμ, standard devia-
tionσ.Samplenumber of membersN, meanx, standard deviations.Sampling distributionsmean of sampling distribution of meansμx
standard error of meansσx
standard error of the standard deviationsσs.Standard error of the meansStandard error of the means of a sample distribu-
tion, i.e. the standard deviation of the means of
samples, is:σx=σ
√
N√(
Np−N
Np− 1)for a finite population and/or for sampling without
replacement, andσx=σ
√
Nfor an infinite population and/or for sampling with
replacement.The relationship between sample mean and
population meanμx=μfor all possible samples of sizeNare drawn
from a population of sizeNp.Estimating the mean of a population (σknown)The confidence coefficient for a large sample size,
(N≥30) iszcwhere:Confidence Confidence
level % coefficientzc99 2.58
98 2.33
96 2.05
95 1.96
90 1.645
80 1.28
50 0.6745The confidence limits of a population mean based
on sample data are given by:x±zcσ
√
N√(
Np−N
Np− 1)for a finite population of sizeNp, and byx±zcσ
√
Nfor an infinite populationEstimating the mean of a population (σunknown)The confidence limits of a population mean based
on sample data are given by:μx±zcσx.Estimating the standard deviation of a populationThe confidence limits of the standard deviation of a
population based on sample data are given by:
s±zcσs.Estimating the mean of a population based on a
small sample sizeThe confidence coefficient for a small sample size
(N<30) is tc which can be determined using
Table 61.1, page 582. The confidence limits of a
population mean based on sample data is given by:x±tcs
√
(N−1)