Four different types of insecticides are used on strawberry plants. The number of strawberries on each randomly selected plant is given below. Use
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Which of the following is a correct statement about the means?
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)
◦ The mean of Insecticide 3 is equal to the mean of Insecticide 1.
◦ The mean of Insecticide 2 is equal to the mean of Insecticide 3.
◦ The mean of Insecticide 1 is equal to the mean of Insecticide 4.
◦ The mean of Insecticide 1 is equal to the mean of Insecticide 2.