13.2 The F Distribution and the F Ratio - Statistics | OpenStax (2024)

The distribution used for the hypothesis test is a new one. It is called the F distribution, named after Sir Ronald Fisher, an English statistician. The F statistic is a ratio (a fraction). There are two sets of degrees of freedom: one for the numerator and one for the denominator.

For example, if F follows an F distribution and the number of degrees of freedom for the numerator is 4, and the number of degrees of freedom for the denominator is 10, then F ~ F4,10.

Note

The F distribution is derived from the Student’s t-distribution. The values of the F distribution are squares of the corresponding values of the t-distribution. One-way ANOVA expands the t-test for comparing more than two groups. The scope of that derivation is beyond the level of this course. It is preferable to use ANOVA when there are more than two groups instead of performing pairwise t-tests because performing multiple tests introduces the likelihood of making a Type 1 error.

To calculate the F ratio, two estimates of the variance are made.

  1. Variance between samples: an estimate of σ2 that is the variance of the sample means multiplied by n, when the sample sizes are the same. If the samples are different sizes, the variance between samples is weighted to account for the different sample sizes. The variance is also called variation due to treatment or explained variation.
  2. Variance within samples: an estimate of σ2 that is the average of the sample variances, also known as a pooled variance. When the sample sizes are different, the variance within samples is weighted. The variance is also called the variation due to error or unexplained variation.
  • SSbetween = the sum of squares that represents the variation among the different samples
  • SSwithin = the sum of squares that represents the variation within samples that is due to chance

To find a sum of squares mean, add together squared quantities which, in somecases, may be weighted. We used sum of squares to calculate the sample variance and the sample standard deviation in Descriptive Statistics.

MS means mean square. MSbetween is the variance between groups, and MSwithin is the variance within groups.

Calculation of Sum of Squares and Mean Square

  • k = the number of different groups
  • nj = the size of the jth group
  • sj = the sum of the values in the jth group
  • n = total number of all the values combined (totalsamplesize: ∑nj)
  • x = one value: ∑x = ∑sj
  • Sum of squares of all values from every group combined: ∑x2
  • Between group variability: SStotal = ∑x2( x2)n( x2)n
  • Total sum of squares: ∑x2(x)2n(x)2n
  • Explained variation: sum of squares representing variation among the different samplesSS(between)=[ (sj)2nj ](sj)2nSS(between)=[ (sj)2nj ](sj)2n
  • Unexplained variation: sum of squares representing variation within samples due to chance SSwithin=SStotalSSbetweenSSwithin=SStotalSSbetween
  • dfs for different groups (dfs for the numerator): df = k – 1
  • Equation for errors within samples (dfs for the denominator): dfwithin = nk
  • Mean square (variance estimate) explained by the different groups: MSbetween = SSbetweendfbetweenSSbetweendfbetween
  • Mean square (variance estimate) that is due to chance (unexplained): MSwithin = SSwithindfwithinSSwithindfwithin

MSbetween and MSwithin can be written as follows:

  • MSbetween=SSbetweendfbetween=SSbetweenk1MSbetween=SSbetweendfbetween=SSbetweenk1
  • MSwithin=SSwithindfwithin=SSwithinnkMSwithin=SSwithindfwithin=SSwithinnk

The one-way ANOVA test depends on the fact that MSbetween can be influenced by population differences among means of the several groups. Since MSwithin compares values of each group to its own group mean, the fact that group means might be different does not affect MSwithin.

The null hypothesis says that all groups are samples from populations having the same normal distribution. The alternate hypothesis says that at least two of the sample groups come from populations with different normal distributions. If the null hypothesis is true, MSbetween and MSwithin should both estimate the same value.

Note

The null hypothesis says that all the group population means are equal. The hypothesis of equal means implies that the populations have the same normal distribution because it is assumed that the populations are normal and that they have equal variances.

F Ratio or F Statistic F=MSbetweenMSwithinF=MSbetweenMSwithin

If MSbetween and MSwithin estimate the same value, following the belief that H0 is true, then the F ratio should be approximately equal to 1. Mostly, just sampling errors would contribute to variations away from 1. As it turns out, MSbetween consists of the population variance plus a variance produced from the differences between the samples. MSwithin is an estimate of the population variance. Since variances are always positive, if the null hypothesis is false, MSbetween will generally be larger than MSwithin. Then the F ratio will be larger than 1. However, if the population effect is small, it is not unlikely that MSwithin will be larger in a given sample.

The previous calculations were done with groups of different sizes. If the groups are the same size, the calculations simplify somewhat and the F ratio can be written as follows:

F Ratio formula when the groups are the same sizeF=nsx¯2s2pooledF=nsx¯2s2pooled

where

  • n = the sample size
  • dfnumerator = k – 1
  • dfdenominator = nk
  • s2 pooled = the mean of the sample variances (pooled variance)
  • sx¯2sx¯2 = the variance of the sample means

Data is typically put into a table for easy viewing. One-way ANOVA results are often displayed in this manner by computer software.

Source of VariationSum of Squares (SS)Degrees of Freedom (df)Mean Square (MS)F
Factor
(Between)
SS(Factor)k – 1MS(Factor) = SS(Factor)/(k – 1)F = MS(Factor)/MS(Error)
Error
(Within)
SS(Error)nkMS(Error) = SS(Error)/(nk)
TotalSS(Total)n – 1

Table 13.1

Example 13.1

Three different diet plans are to be tested for mean weight loss. The entries in the table are the weight losses for the different plans. The one-way ANOVA results are shown in Table 13.2.

Plan 1: n1 = 4Plan 2: n2 = 3Plan 3: n3 = 3
53.58
4.574
43.5
34.5

Table 13.2

s1 = 16.5, s2 = 15, s3 = 15.5

Following are the calculations needed to fill in the one-way ANOVA table. The table is used to conduct a hypothesis test.

SS(between)=[ (sj)2nj ](sj)2nSS(between)=[ (sj)2nj ](sj)2n

13.1

=s124+s223+s323(s1+s2+s3)210=s124+s223+s323(s1+s2+s3)210

13.2

where n1 = 4, n2 = 3, n3 = 3, and n = n1 + n2 + n3 = 10

=(16.5)24+(15)23+(15.5)23(16.5+15+15.5)210=(16.5)24+(15)23+(15.5)23(16.5+15+15.5)210

13.3

SS(between)=2.2458SS(between)=2.2458

13.4

S(total)=x2(x)2nS(total)=x2(x)2n

13.5

=(52+4.52+42+32+3.52+72+4.52+82+42+3.52)=(52+4.52+42+32+3.52+72+4.52+82+42+3.52)

13.6

(5+4.5+4+3+3.5+7+4.5+8+4+3.5)210(5+4.5+4+3+3.5+7+4.5+8+4+3.5)210

13.7

=24447210=244220.9=24447210=244220.9

13.8

SS(total)=23.1SS(total)=23.1

13.9

SS(within)=SS(total)SS(between)SS(within)=SS(total)SS(between)

13.10

=23.12.2458=23.12.2458

13.11

SS(within)=20.8542SS(within)=20.8542

13.12

Using the TI-83, 83+, 84, 84+ Calculator

One-way ANOVA Table: The formulas for SS(Total), SS(Factor) = SS(Between), and SS(Error) = SS(Within) as shown previously. The same information is provided by the TI calculator hypothesis test function ANOVA in STAT TESTS (syntax is ANOVA[L1, L2, L3] where L1, L2, L3 have the data from Plan 1, Plan 2, Plan 3, respectively).

Source of VariationSum of Squares (SS)Degrees of Freedom (df)Mean Square (MS)F
Factor
(Between)
SS(Factor)
= SS(Between)
= 2.2458
k – 1
= 3 groups – 1
= 2
MS(Factor)
= SS(Factor)/(k – 1)
= 2.2458/2
= 1.1229
F =
MS(Factor)/MS(Error)
= 1.1229/2.9792
= 0.3769
Error
(Within)
SS(Error)
= SS(Within)
= 20.8542
nk
= 10 total data – 3 groups
= 7
MS(Error)
= SS(Error)/(nk)
= 20.8542/7
= 2.9792
TotalSS(Total)
= 2.2458 + 20.8542
= 23.1
n – 1
= 10 total data – 1
= 9

Table 13.3

Try It 13.1

As part of an experiment to see how different types of soil cover would affect slicing tomato production, Marist College students grew tomato plants under different soil cover conditions. Groups of three plants each had one of the following treatments:

  • Bare soil
  • A commercial ground cover
  • Black plastic
  • Straw
  • Compost

All plants grew under the same conditions and were the same variety. Students recorded the weight in grams of tomatoes produced by each of the n = 15 plants, as seen in Table 13.4.

Bare: n1 = 3Ground Cover: n2 = 3Plastic: n3 = 3Straw: n4 = 3 Compost: n5 = 3
2,6255,3486,5837,2856,277
2,9975,6828,5606,8977,818
4,9155,4823,8309,2308,677

Table 13.4


Create the one-way ANOVA table.

The one-way ANOVA hypothesis test is always right-tailed because larger F values are way out in the right tail of the F distribution curve and tend to make us reject H0.

Notation

The notation for the F distribution is F ~ Fdf(num),df(denom),

where df(num) = dfbetween and df(denom) = dfwithin.

The mean for the F distribution is μ= df(denom) df(denom)2 . μ= df(denom) df(denom)2 .

13.2 The F Distribution and the F Ratio - Statistics | OpenStax (2024)

FAQs

Is the F-ratio the same as the F-distribution? ›

In probability theory and statistics, the F-distribution or F-ratio, also known as Snedecor's F distribution or the Fisher–Snedecor distribution (after Ronald Fisher and George W.

What is the F-ratio in statistics? ›

The F-ratio is the ratio of the between group variance to the within group variance. The F-ratio is used in an ANOVA (Analysis of Variance) that provides more insight into data compared to using only the mean or median.

How do you calculate F in statistics? ›

Because we want to compare the "average" variability between the groups to the "average" variability within the groups, we take the ratio of the Between Mean Sum of Squares to the Error Mean Sum of Squares. That is, the F-statistic is calculated as F = MSB/MSE.

How do you interpret an F-distribution? ›

Your F-test results are statistically significant when its test statistic is greater than this value. F-distributions require both a numerator and denominator degrees of freedom (DF) to define its shape. For example, F(3,2) indicates that the F-distribution has 3 numerator and 2 denominator degrees of freedom.

What is the formula for F-distribution? ›

F-Distribution Formula

The formula to calculate the F-statistic, or F-value, is: F = σ 1 σ 2 , or Variance 1/Variance 2. In order to accommodate the skewed right shape of the F-distribution, the larger variance is placed in the numerator and the smaller variance is used in the denominator.

What does the F ratio tell us in linear regression? ›

The F-ratio, which follows the F-distribution, is the test statistic to assess the statistical significance of the overall model. It tests the hypothesis that the variation explained by regression model is more than the variation explained by the average value (ȳ).

What does the F-statistic tell you? ›

A large F-statistic value proves that the regression model is effective in its explanation of the variation in the dependent variable and vice versa. On the contrary, an F-statistic of 0 indicates that the independent variable does not explain the variation in the dependent variable.

How do you find F in a probability distribution? ›

The formulas to find the probability distribution function are as follows:
  1. Discrete distributions: F(x) = ∑xi≤xp(xi) ∑ x i ≤ x p ( x i ) . Here p(x) is the probability mass function.
  2. Continuous distributions: F(x) = ∫x−∞f(u)du ∫ − ∞ x f ( u ) d u . Here f(u) is the probability density function.

What is the F-statistic rule? ›

F Statistic

The f test statistic formula is given below: F statistic for large samples: F = σ21σ22 σ 1 2 σ 2 2 , where σ21 σ 1 2 is the variance of the first population and σ22 σ 2 2 is the variance of the second population.

What does a large value for the F ratio indicate? ›

A large F value indicates that the differences in group means are substantially greater than the variability within each group, suggesting that the observed differences are unlikely to be due to chance alone.

What is the conclusion of the F-distribution? ›

Hypothesis Testing using the F-Distribution

If the F-statistic is greater than the critical value, then we reject the null hypothesis and conclude tthat the means of the populations are significantly different from each other.

What is a good F value in regression? ›

F is a test for statistical significance of the regression equation as a whole. It is obtained by dividing the explained variance by the unexplained variance. By rule of thumb, an F-value of greater than 4.0 is usually statistically significant but you must consult an F-table to be sure.

What is the sampling distribution of F ratio? ›

The F-distribution is the sampling distribution of the ratio of the variances of two samples drawn from a normal population. It is used directly to test to see if two samples come from populations with the same variance.

Are F and T distributions the same? ›

The F distribution can be regarded as the equivalent extension of the t distribution when there is more than one variable but small sample sizes. There are numerous ways of introducing this distribution in the literature, which is widely employed in many diverse areas.

What is the difference between the F ratio and the t-statistic? ›

The t-test is used to compare the means of two groups and determine if they are significantly different, while the F-test is used to compare variances of two or more groups and assess if they are significantly different.

What is the other term for t-distribution? ›

The t-distribution, also known as the Student's t-distribution, is a statistical function that creates a probability distribution. The t-distribution is similar to the normal distribution, with its bell shape, but it has heavier tails.

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