Answer:
r=0.4 (Same value)
Explanation:
The correlation coefficient is unaffected by the scale of relation.
Correlation is a "statistical measure that indicates the extent to which two or more variables fluctuate together". And is always between -1 and 1. 1 indicates perfect linear relationship and -1 perfect inverse linear relationship. The formula for the correlation is given by:
![0.4=r=(b(\sum xy)-(\sum x)(\sum y))/(√([n\sum x^2 -(\sum x)^2][n\sum y^2-(\sum y)^2]))](https://img.qammunity.org/2020/formulas/mathematics/high-school/sr9ptvphrd5s8ge2z32wvgep3z1wqxkbgm.png)
Applying this formula we got that the correlation coeffcient it's 0.4. Now if we multiply all the x values by 2 we have this:
![r_f=(2b(\sum xy)-2(\sum x)(\sum y))/(√(4[n\sum x^2 -(\sum x)^2][n\sum y^2-(\sum y)^2]))](https://img.qammunity.org/2020/formulas/mathematics/high-school/1x5zgv7j6sn2eejwy8y0urbdai6axsztau.png)
And symplyfing we see this:
![r_f=2(b(\sum xy)-(\sum x)(\sum y))/(2√([n\sum x^2 -(\sum x)^2][n\sum y^2-(\sum y)^2]))](https://img.qammunity.org/2020/formulas/mathematics/high-school/8ij9n0s343ixxty4i0atejbt1koi9qzq9c.png)
We can cancel the 2 on the numerator and denominator and we got the same formula equal to 0.4.
![r_f=(b(\sum xy)-(\sum x)(\sum y))/(√([n\sum x^2 -(\sum x)^2][n\sum y^2-(\sum y)^2]))=0.4](https://img.qammunity.org/2020/formulas/mathematics/high-school/765uevgrl5nt7lttj0t7cm50xhykwxxva6.png)
So for this reason the correlation coefficient it's not affected by scale changes on the independent or dependent variables.