For this case we have that by definition, the equation of a line in the slope-intersection form is given by:
[tex]y = mx + b[/tex]
Where:
m: It's the slope
b: It is the cut-off point with the y axis
[tex]m = \frac {y2-y1} {x2-x1}[/tex]
We have the following points:
[tex](x1, y1): (- 7,25)\\(x2, y2): (- 4,13)[/tex]
Substituting the values:[tex]m = \frac {13-25} {- 4 - (- 7)} = \frac {-12} {- 4 + 7} = \frac {-12} {3} = - 4[/tex]
Thus, the line is of the form:
[tex]y = -4x + b[/tex]
We substitute one of the points and find "b":
[tex]13 = -4 (-4) + b\\13 = 16 + b\\b = 13-16 = -3[/tex]
Finally we have to:
[tex]y = -4x-3[/tex]
Answer:
The equation es [tex]y = -4x-3[/tex]
