2 Answers

Balizok · Answer 1 · 2023-06-04T13:39:13+0000

Answer:

$\sf y=-(1)/(2)x+1$

Explanation:

Slope-intercept form: y = mx + b

where:

Given: y = 2x + 9

where:

Note:

Perpendicular lines have slopes that are negative reciprocals of each other.

$\sf \textsf{a slope of 2} \implies \textsf{would have a negative reciprocal of} -(1)/(2)$

$\textsf{Perpendicular line:}\ \sf y=-(1)/(2)x+b$

Substitute the given point into the the equation to find the value of b:

$\sf \sf y=-(1)/(2)x+1\\\\-1=-(1)/(2)(4)+b\\\\-1=-2+b\\\\-1+2=-2+2+b\\\\1=b$

$\textsf{Perpendicular line:}\ \sf y=-(1)/(2)x+1$

Tim Dunphy · Answer 2 · 2023-06-08T03:43:22+0000

Answer: y =
-(1)/(2) x + 1

Explanation:

First, we will find the slope. The slope of perpendicular lines are negative reciprocals.

In this case, the first slope is 2. The negative of 2 is -2, and the reciprocal of -2 is
-(1)/(2) .

Now, we will plug in this new slope, the point given, and solve for the b, or the y-intercept.

y = mx + b

(-1) = (
-(1)/(2) )(4) + b

-1 = -2 + b

1 = b

Lastly, we will write our equation.

y = mx + b

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

The line is y =
-(1)/(2) x + 1, or y = 1 -
(x)/(2) .

Your comment on this question: