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44 votes
Write an equation of the line in slope-intercept form that passes through the point (-6, 1) and has a slope of ½.

User Jpaljasma
by
2.7k points

2 Answers

23 votes
23 votes

Answer:


y = (1)/(2) x + 4

Explanation:

Slope intercept form is:


y = mx +b

y and x remain as variables and don't get changed or touched.

m is the slope of the line.

b is the y-intercept of the line.

To find the information needed for this form, we need to use the equation:


y - y_(1) = m (x - x_(1) )

We are given that the slope is
(1)/(2), so we plug it in for m:


y - y_1 = (1)/(2) (x-x_1)

Now, we need to plug in the given value of
x_1 and
y_1 in the point (-6, 1), where the x = -6 and y = 1. So it will look like this when plugged into the equation:


y - 1 = (1)/(2) (x-(-6))

Solve for y (isolate y on one side):


y - 1 = (1)/(2) (x-(-6))\\\\y - 1 = (1)/(2) (x+6)\\\\y - 1 = (1)/(2) x+3\\\\\\y= (1)/(2)x+4

Final answer is: y = 1/2x + 4

User Bhavik
by
2.6k points
8 votes
8 votes

Answer:

y = 1/2x +4

Explanation:

You are given the slope (m) of the line and a point, and asked for slope-intercept form:

y = mx +b . . . . . . . line with slope m and y-intercept b

The value of the intercept, b, can be found from the point by rearranging this equation to ...

b = y -mx

b = 1 -1/2(-6) = 4 . . . . using x=-6, y=1

Then the equation of the line with m=1/2 and b=4 is ...

y = 1/2x +4

User Eric Olson
by
2.7k points