Elementary Statistics
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Lesson 13.1 One-Way ANOVA

The purpose of a one-way ANOVA is to determine the existence of a statistically significant difference among several independent population means.  Random samples are taken from each population and the test actually uses standard deviations to help determine if the means are equal or not.

Basic Assumptions

  1. Each population from which a sample is taken is assumed to be normal.
  2. All samples are randomly selected and independent.
  3. The populations are assumed to have equal variances.
  4. The factor is a categorical variable. 
  5. The response is a numerical variable.

Some explanation of #4 and 5 is needed.  Suppose we want to determine if the average weight of tomatoes grown in different types of soil are equal or not.  The type of soil (bare ground, ground cover, plastic cover, straw cover, or compost cover) would be the factor and these are categorical variables.  The weights of the tomatoes grown in each of these types of soil are measured and therefore, quantitative continuous variables.

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The Null and Alternate Hypotheses

The null hypothesis states that all of the population means are the same. The alternate hypothesis is that at least one pair of population means is different.

Ho:  µ1 = µ2 = µ3 = ... = µk

Ha: At least two of the group means are not equal.

Ultimately, when we do a One-Way ANOVA, if the null is true it means that the differences between populations are due to random variations and the averages are statistically the same.  On the other hand, if the null is not true, the differences between populations are too large to be due to random variation so the averages are not statistically the same.


Please continue to the next section of this lesson.

 

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