We have been given that the number of species of coastal dune plants in Australia decreases as the latitude, in °s, increases.
Further we know that there are 34 species at 11°s and 26 species at 44°s.
We can express the given information at two ordered pairs as shown below:
[tex](n,l)=(11,34)\text{ and }(n,l)=(44,26)[/tex]
Let us find slope of the line through these points:
[tex]m=\frac{y_{2}-y_{1}}{x_{2}-x_{1}}=\frac{26-34}{44-11}=\frac{-8}{33}=-0.2424[/tex]
Therefore, we can write the equation of line in slope intercept form as:
[tex]n=-0.2424l+b[/tex]
Where b is the y intercept, and we can find its value using one of the two points.
[tex]34=-0.2424(11)+b\\34=-2.67+b\\b=34+2.67=36.67[/tex]
Therefore, the required equation of the linear function is:
[tex]n=-0.2424l+36.67[/tex]
