Chapter 2.1, Problem 48E

Solution

To Describe:

The strength, and the direction of the linear correlation of a data set whose scatter plot is given.

No Correlation.

Given:

The scatter plot of a data set:

  

Concepts Used:

When points on the scatter plot of a dataset are clustered along a straight line, then the data is said to have linear correlation.

The collective nearness of these points to a single straight line indicates the strength of linear correlation. This can be estimated by the width of an oval enclosing all the points tilted along the said straight line. The larger the width, the lesser is the strength of the linear correlation.

If the value of $y$ in the above estimated straight line increases with increasing values of $x$ then the correlation is said to be positive in direction. If, on the other hand, $y$ decreases with increase in $x$ , the direction of correlation is said to be negative. In terms of an oval drawn around the points, if the oval is tilted along a line with a positive slope, then the correlation is positive, and if the oval is tilted along a line with negative slope, then the correlation is negative.

Calculations:

Draw an oval enclosing the points on the data.

  

Interpretation:

The oval enclosing the points is almost equal in width and length. Thus, it is not tilted along any straight line, indicating no linear correlation.

Conclusion:

The given scatter plot represent a data set with no linear correlation.