اختبار الفرضيات الإحصائية

اختبار الفرضيات الإحصائية Statistical hypothesis testing هو من دراسات الإحصاء ، نحكم من خلاله على صحة فرضية إحصائية وذلك عن طريق إجراء دراسة إحصائية على المجتمع المراد اختبار الفرضية فيه حيث نجري اختبارا إحصائيا على عينة عشوائية مسحوبة من هذا المجتمع ونصدر القرار الإحصائي الذي يحكم على هذه الفرضية .

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احصاء الاختبارات الشائعة

In the table below, the symbols used are defined at the bottom of the table. Many other tests can be found in other articles.

الاسم

الصيغة

الافتراضات أو الملاحظات

One-sample z-test

z={\frac {{\overline {x}}-\mu _{0}}{(\ s/{\sqrt {n}})}}

(Normal population or n > 30) and σ known.

(z is the distance from the mean in relation to the standard deviation of the mean). For non-normal distributions it is possible to calculate a minimum proportion of a population that falls within k standard deviations for any k (see: Chebyshev's inequality).

Two-sample z-test

z={\frac {({\overline {x}}_{1}-{\overline {x}}_{2})-d_{0}}{\sqrt {{\frac {\sigma _{1}^{2}}{n_{1}}}+{\frac {\sigma _{2}^{2}}{n_{2}}}}}}

Normal population and independent observations and σ₁ and σ₂ are known

Two-sample pooled t-test, equal variances*

t={\frac {({\overline {x}}_{1}-{\overline {x}}_{2})-d_{0}}{s_{p}{\sqrt {{\frac {1}{n_{1}}}+{\frac {1}{n_{2}}}}}}},

$s_{p}^{2}={\frac {(n_{1}-1)s_{1}^{2}+(n_{2}-1)s_{2}^{2}}{n_{1}+n_{2}-2}},$
$df=n_{1}+n_{2}-2\$ ^[1]

(Normal populations or n₁ + n₂ > 40) and independent observations and σ₁ = σ₂ and σ₁ and σ₂ unknown

Two-sample unpooled t-test, unequal variances*

t={\frac {({\overline {x}}_{1}-{\overline {x}}_{2})-d_{0}}{\sqrt {{\frac {s_{1}^{2}}{n_{1}}}+{\frac {s_{2}^{2}}{n_{2}}}}}},

$df={\frac {\left({\frac {s_{1}^{2}}{n_{1}}}+{\frac {s_{2}^{2}}{n_{2}}}\right)^{2}}{{\frac {\left({\frac {s_{1}^{2}}{n_{1}}}\right)^{2}}{n_{1}-1}}+{\frac {\left({\frac {s_{2}^{2}}{n_{2}}}\right)^{2}}{n_{2}-1}}}}$ ^[1]

(Normal populations or n₁ + n₂ > 40) and independent observations and σ₁ ≠ σ₂ and σ₁ and σ₂ unknown

One-proportion z-test

z={\frac {{\hat {p}}-p_{0}}{\sqrt {\frac {p_{0}(1-p_{0})}{n}}}}

n^.p₀ > 10 and n (1 − p₀) > 10 and it is a SRS (Simple Random Sample), see notes.

Two-proportion z-test, pooled for

d_{0}=0

z={\frac {({\hat {p}}_{1}-{\hat {p}}_{2})-d_{0}}{\sqrt {{\hat {p}}(1-{\hat {p}})({\frac {1}{n_{1}}}+{\frac {1}{n_{2}}})}}}

${\hat {p}}={\frac {x_{1}+x_{2}}{n_{1}+n_{2}}}$

n₁ p₁ > 5 and n₁(1 − p₁) > 5 and n₂ p₂ > 5 and n₂(1 − p₂) > 5 and independent observations, see notes.

Two-proportion z-test, unpooled for

|d_{0}|>0

z={\frac {({\hat {p}}_{1}-{\hat {p}}_{2})-d_{0}}{\sqrt {{\frac {{\hat {p}}_{1}(1-{\hat {p}}_{1})}{n_{1}}}+{\frac {{\hat {p}}_{2}(1-{\hat {p}}_{2})}{n_{2}}}}}}

n₁ p₁ > 5 and n₁(1 − p₁) > 5 and n₂ p₂ > 5 and n₂(1 − p₂) > 5 and independent observations, see notes.

One-sample chi-square test

\chi ^{2}={\frac {(n-1)s^{2}}{\sigma _{0}^{2}}}

One of the following

• All expected counts are at least 5

• All expected counts are > 1 and no more than 20% of expected counts are less than 5

*Two-sample F test for equality of variances

F={\frac {s_{1}^{2}}{s_{2}^{2}}}

Arrange so

s_{1}^{2}

>

s_{2}^{2}

and reject H₀ for

F>F(\alpha /2,n_{1}-1,n_{2}-1)

^[2]

In general, the subscript 0 indicates a value taken from the null hypothesis, H₀, which should be used as much as possible in constructing its test statistic. ... Definitions of other symbols:

$\alpha$ , the probability of Type I error (rejecting a null hypothesis when it is in fact true)
$n$ = sample size
$n_{1}$ = sample 1 size
$n_{2}$ = sample 2 size
${\overline {x}}$ = sample mean
$\mu _{0}$ = hypothesized population mean
$\mu _{1}$ = population 1 mean
$\mu _{2}$ = population 2 mean
$\sigma$ = population standard deviation
$\sigma ^{2}$ = population variance

$s$ = sample standard deviation
$s^{2}$ = sample variance
$s_{1}$ = sample 1 standard deviation
$s_{2}$ = sample 2 standard deviation
$t$ = t statistic
$df$ = degrees of freedom
${\overline {d}}$ = sample mean of differences
$d_{0}$ = hypothesized population mean difference
$s_{d}$ = standard deviation of differences

${\hat {p}}$ = x/n = sample proportion, unless specified otherwise
$p_{0}$ = hypothesized population proportion
$p_{1}$ = proportion 1
$p_{2}$ = proportion 2
$d_{p}$ = hypothesized difference in proportion
$\min\{n_{1},n_{2}\}$ = minimum of n₁ and n₂
$x_{1}=n_{1}p_{1}$
$x_{2}=n_{2}p_{2}$
$\chi ^{2}$ = Chi-squared statistic
$F$ = F statistic

انظر أيضاً

Comparing means test decision tree
Complete spatial randomness
Counternull
Multiple comparisons
Omnibus test
Behrens–Fisher problem
Bootstrapping (statistics)
Checking if a coin is fair
Falsifiability
Fisher's method for combining independent tests of significance
Modifiable areal unit problem
Null hypothesis
P-value
Representation theory
Spatial autocorrelation
Statistical theory
Statistical significance
Type I error, Type II error
Exact test

For a reconstruction and defense of Neyman–Pearson testing, see Mayo and Spanos, (2006), "Severe Testing as a Basic Concept in a Neyman–Pearson Philosophy of Induction," GJPS, 57: 323–57.

الهامش

^ ^أ ^ب NIST handbook: Two-Sample t-Test for Equal Means
^ NIST handbook: F-Test for Equality of Two Standard Deviations (Testing standard deviations the same as testing variances)

وصلات خارجية

Wilson González, Georgina (September 10, 1997). "Hypothesis Testing". Environmental Sampling & Monitoring Primer. Virginia Tech. {{cite web}}: Unknown parameter |coauthors= ignored (|author= suggested) (help)
Bayesian critique of classical hypothesis testing
Critique of classical hypothesis testing highlighting long-standing qualms of statisticians
Dallal GE (2007) The Little Handbook of Statistical Practice (A good tutorial)
References for arguments for and against hypothesis testing
Statistical Tests Overview: How to choose the correct statistical test
An Interactive Online Tool to Encourage Understanding Hypothesis Testing

[NIST2mean-1] أ ^ب NIST handbook: Two-Sample t-Test for Equal Means

[2] NIST handbook: F-Test for Equality of Two Standard Deviations (Testing standard deviations the same as testing variances)

[1]

[2]