Respuesta :
Answer:
B. y = 4 + 6x
Step-by-step explanation:
We know that the rate of change of a straight line is equal to the slope of the line.
Now, the general form of a straight line is y = mx + b, where m is the slope and b is the y-intercept.
Also, the slope of a line joined by [tex]( x_{1},y_{1} )[/tex] and [tex]( x_{2},y_{2} )[/tex] is given by [tex]m=\frac{y_{2}-y_{1}}{x_{2}-x_{1}}[/tex].
So, using these, we will find the slopes of the lines given in the options.
A. Here, we are given two points (3,3) and (4,6). Then, the slope is given by,
[tex]m_{1}=\frac{6-3}{4-3}[/tex] i.e. [tex]m_{1}=3[/tex].
B. We have the equation of line y = 4 + 6x. On comparing it with the general form, we get that the slope is 6 i.e. [tex]m_{2}=6[/tex].
C. We are given the standard form of a line. First, we convert it into the slope-intercept form ( or the general form ).
i.e. 12x + 6y = 18 → 2x + y = 3 → y = -2x + 3
Now, on comparing this equation with the general form of a line, we get that the slope is -2. i.e. [tex]m_{3}=-2[/tex].
D. Here, we are given a linear function passing through (1,-1) and (0,4). Then the slope is given by,
[tex]m_{1}=\frac{4+1}{0-1}[/tex] i.e. [tex]m_{4}=-5[/tex].
Hence, we obtain that the function y=4+6x has the greatest slope or the greatest rate of change i.e. [tex]m_{2}=6[/tex].
