Write the equation of a line in slope intercept form that passes through the two points. 4,-1 and 6,-7

Question

asked Jul 17, 2022 223k views

1 Answer

Netsu · Answer 1 · 2022-07-21T21:18:08+0000

A line has an equation of,

y=mx+n .

m is called a slope

n is called y-intercept

We are also given two points
(x_1,y_1)=(4,-1),(x_2,y_2)=(6,-7) .

We begin with computing the slope,

$m=(\Delta y)/(\Delta x)=(y_2-y_1)/(x_2-x_1)=(-7-(-1))/(6-4)=(-7+1)/(2)=(-6)/(2)=\boxed{-3}$

We have computed the slope m and our equation is almost done,

y=-3x+n

Next step is to find out what y-intercept n is. I will use point
(4,-1) and insert x and y it into already known equation, then solve for n,

-1=-3(4)+n

$-1=-12+n\implies n=\boxed{11}$

The reason I can insert coordinates of a point as x and y is because this particular point is in the line described by equation,

$\boxed{y=-3x+11}$

Hope this helps. :)