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$x$ be depth in meters and $y$ be dive duration in minutes.

As a result, a positive relationship suggests that the y-values tend to rise as the x-values rise. In this example, this means that as the depth of the dive increases, so does the time of the descent.

As a result, a linear relationship means that as the x-values increase by one, the y-values tend to change by a constant amount. As a result, in this example, if the depth increases by one meter, the dive duration tends to change by a consistent amount.

As a result, a high connection means that the points in the scatterplot stray very little from the general pattern between the variables, indicating that the scatterplot of the two variables has a very distinct pattern. As a result, in this situation, the scatterplot of the two variables shows a fairly apparent connection between the depth and the dive length.

As a result, the correlation determines how strong the linear relationship between the variables is. When the two variables are swapped, the strength of the linear relationship between them is unaffected, and the correlation remains unchanged. Because the equation for the least-square regression line employs the variables $y$ and $x$ changing them will affect the regression line's equation.