Respuesta :
The equation of the line perpendicular to y = 3x + 6 and containing the point (-9,-5) is [tex]y = \frac{-1}{3}x - 8[/tex]
Solution:
Given that line perpendicular to y = 3x + 6 and containing the point (-9, -5)
We have to find the equation of line
The slope intercept form is given as:
y = mx + c ------ eqn 1
Where "m" is the slope of line and "c" is the y - intercept
Let us first find the slope of line
The given equation of line is y = 3x + 6
On comparing the given equation of line y = 3x + 6 with eqn 1, we get,
m = 3
Thus the slope of given equation of line is 3
We know that product of slopes of given line and slope of line perpendicular to given line is equal to -1
Slope of given line [tex]\times[/tex] slope of line perpendicular to given line = -1
[tex]3 \times \text{ slope of line perpendicular to given line }= -1[/tex]
[tex]\text{ slope of line perpendicular to given line } = \frac{-1}{3}[/tex]
Let us now find the equation of line with slope [tex]m = \frac{-1}{3}[/tex] and containing the point (-9, -5)
Substitute [tex]m = \frac{-1}{3}[/tex] and (x, y) = (-9, -5) in eqn 1
[tex]-5 = \frac{-1}{3}(-9) + c\\\\-5 = 3 + c\\\\c = -8[/tex]
Thus the required equation of line is:
Substitute [tex]m = \frac{-1}{3}[/tex] and c = -8 in eqn 1
[tex]y = \frac{-1}{3}x - 8[/tex]
Thus the required equation of line perpendicular to given line is found
