The goodness-of-fit test is performed to see if the observed results are statistically similar to the expected ones.
The goodness-of-fit test uses a null hypothesis - which assumes that the distribution is as claimed, and a contradicting alternative hypothesis.
If all the expected frequencies in a distribution are equal, such as when predicting the color of traffic lights, the expected frequency -&#160;E&#160;is expressed as the ratio of the total number of operations, six and&#160;k,&#160;the number of categories, three.
However, for unequal expected frequencies such as finding women with different hair color,&#160;E&#160;is calculated by multiplying the sum of the observed frequencies by the probability for each category.
In the earlier example of child birth, the expected and observed frequencies are used to calculate the chi-square value. Using the chi-square table, one can discover whether the difference between the expected and observed frequencies is statistically significant.
If this difference and the test statistic is large, with a small&#160;P-value, this means that the test statistic falls in the critical region. Hence, the null hypothesis is rejected. If not, fail to reject the null hypothesis.

expected frequencies in goodness-of-fit tests

A goodness-of-fit test is conducted to determine whether the observed frequency values are statistically similar to the frequencies expected for the dataset. Suppose the expected frequencies for a dataset are equal such as when predicting the frequency of any number appearing when casting a die. In that case, the expected frequency is the ratio of the total number of observations (n)&#160; to the number of categories (k).
<img alt="Equation1" src="/files/ftp_upload/13601/13601_Pagetext_Equation_1_.svg" style="text-align: center; height: 12px;" />
Hence, the expected frequency of any number appearing when casting a die will be 1/6.
However, suppose the expected frequencies of the dataset are unequal; the expected frequency is obtained by multiplying the total number of observations n and the probability p for the category.
<img alt="Equation2" src="/files/ftp_upload/13601/13601_Pagetext_Equation_2_.svg" style="text-align: center; height: 14px;" />

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Expected Frequencies in Goodness-of-Fit Tests

A goodness-of-fit test is conducted to determine whether the observed frequency values are statistically similar to the frequencies expected for the ...

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Education

JoVE Core

Statistics

Unit 1

Distributions

KEY TERMS AND CONCEPTS

distributions to estimate population parameter

distributions-to-estimate-population-parameter

Distributions to Estimate Population Parameter

The accurate values of population parameters such as population proportion, population mean, and population standard deviation (or variance) are usually ...

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Degrees of Freedom

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Student t Distribution

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choosing between z and t distribution

Choosing Between z and t Distribution

The z and the Student t distribution estimate the population mean using the sample mean and standard deviation. However, to decide which distribution to ...

chi-square distribution

Chi-square Distribution

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finding critical values for chi-square

Finding Critical Values for Chi-Square

Consider a curve representing sample data drawn randomly from a normally distributed population. One must construct confidence intervals to estimate or to ...

estimating population standard deviation

Estimating Population Standard Deviation

When the population standard deviation is unknown and the sample size is large, the sample standard deviation s is commonly used as a point estimate of ...

goodness-of-fit test

Goodness-of-Fit Test

The goodness-of-fit test is a type of hypothesis test which determines whether the data &#34;fits&#34; a particular distribution. For example, one may ...

contingency table

Contingency Table

A contingency table provides a way of portraying data that can facilitate calculating probabilities. It is a method of displaying a frequency distribution ...

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Introduction to Test of Independence

In statistics, the term independence means that one can directly obtain the probability of any event involving both variables by multiplying their ...

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Hypothesis Test for Test of Independence

The test of independence is a chi-square-based test used to determine whether two variables or factors are independent or dependent. This hypothesis test ...

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Determination of Expected Frequency

Suppose one wants to test independence between the two variables of a contingency table. The values in the table constitute the observed frequencies of ...

test for homogeneity

Test for Homogeneity

The goodness&#8211;of&#8211;fit test can be used to decide whether a population fits a given distribution, but it will not suffice to decide whether two ...

f distribution

F Distribution

The F distribution was named after Sir Ronald Fisher, an English statistician. The F statistic is a ratio (a fraction) with two sets of degrees of ...

key terms and concepts

2.4K Views. A goodness-of-fit test is conducted to determine whether the observed frequency values are statistically similar to the frequencies expected for the dataset. Suppose the expected frequencies for a dataset are equal such as when predicting the frequency of any number appearing when casting a die. In that case, the expected frequency is the ratio of the total number of observations (n)  to the number of categories (k). Hence, the expected frequency of any number appearing when casting a di...

Video: Expected Frequencies in Goodness-of-Fit Tests

statistics

JoVE Core Statistics introduces the concepts and application of the collection, analysis, presentation, and interpretation of data to students. These animated lessons provide an understanding of statistics beneficial to students from a wide range of disciplines. Additionally, the scientist-in-action videos demonstrate the application of related concepts in classical and original research experiments performed in today's laboratories worldwide

8.9 : Expected Frequencies in Goodness-of-Fit Tests

8.9 : Expected Frequencies in Goodness-of-Fit Tests

8.1 : Distributions to Estimate Population Parameter

8.2 : Degrees of Freedom

8.3 : Student t Distribution

8.4 : Choosing Between z and t Distribution

8.5 : Chi-square Distribution

8.6 : Finding Critical Values for Chi-Square

8.7 : Estimating Population Standard Deviation

8.8 : Goodness-of-Fit Test

8.10 : Contingency Table

8.11 : Introduction to Test of Independence

8.12 : Hypothesis Test for Test of Independence

8.13 : Determination of Expected Frequency

8.14 : Test for Homogeneity

8.15 : F Distribution