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11 September, 23:56

Correlation is a measure of the direction and strength of the linear (straight-line) association between two quantitative variables. The analysis of data from a study found that the scatter plot between two variables, x and y, appeared to show a straight-line relationship and the correlation (r) was calculated to be - 0.84. This tells us that

a. there is little reason to believe that the two variables have a linear association relationship

b. all of the data values for the two variables lie on a straight line.

c. there is a strong linear relationship between the two variables with larger values of x tending to be associated with larger values of the y variable.

d. there is a strong linear relationship between x and y with smaller x values tending to be associated with larger values of the y variable.

e. there is a weak linear relationship between x and y with smaller x values tending to be associated with smaller values of the y variable

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  1. 12 September, 00:18
    0
    D

    Step-by-step explanation:

    The correlation coefficient r=-0.84 denotes that there is inverse relationship between x and y. It means that as the x values increase the y values decrease whereas as the x values decreases the y-values increases. Also, r=-0.84 denotes the strong relationship between x and y because it is close to 1. So, r=-0.84 denotes that there is strong linear relationship between x and y with smaller x values tending to be associated with larger y values.
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