Relation To Badlands Album Sales

And with this information, I can create an equation based on the calculations—b(x) =231608(0.850)x. This equation may be more accurate than the one I’ll be creating as technology will always be better than the human brain. I can see with this equation that the b-value is 0 < b < 0.87, the correlation will be adequately strong in a positive sense. The data is less scattered comparatively to Badlands’ album sales as it has a larger correlation coefficient. The following is a scatter plot of this data, showing the gradual decreasing shape of the function, which will be useful when creating the equation. The x-axis is the number of weeks since the release date and the y-axis is the number of albums sold. By looking at this graph, I noticed that the base of my equation must be between zero and one, or have a negative horizontal compression factor due to the decreasing sense. As well, I’ll need to add the
Ultimately, the horizontal asymptote will not be needed in the equation since it is zero, and proper conventions must be followed when creating an equation.When I calculated the Pearson’s R-correlation coefficient in the exponential regression function using the TI-83+ for the album sales for Badlands, I also obtained an equation in exponential form. The equation f(x) =28582(0.881)x, will be the general base understanding of how the equation I create to model the data should look like. The base exponential function with transformations is f(x) = abk(x-d) + c; where “a” is the vertical stretch/compression factor, “k” is the horizontal stretch/compression factor, “d” is the vertical shift, “c” is the horizontal shift and asymptote and “b” is the base of the function.