We have the equation for function A. Is is a line, already written in the form [tex] y = mx+q [/tex]. In these cases, the slope of the line is [tex] m [/tex]. So, the slope of function A is 1.
As for function B, we have to pick two of its graph's point, say [tex] A = (A_x,A_y),\ B = (B_x, B_y) [/tex] and compute the slope as follows:
[tex] m = \cfrac{\Delta y}{\Delta x} = \cfrac{A_y-B_y}{A_x-B_x} [/tex]
We can see that the function passes through the points [tex] (0,-1) [/tex] and [/tex] (1,1) [/tex]. So, its slope is
[tex] \cfrac{-1-1}{0-1} = \cfrac{-2}{-1} = 2 [/tex]
So, the slope of function A is 1, and the slope of function B is 2.
This means that the first option is correct.
