Question

What is the equation of the line that passes through `(-4,1)` and is perpendicular to the line that passes through the following points: `(6,9),(-2,6)`?

Answer 1

`8x+3y+29=0`

Explanation:

Slope of the line that passes through points `(x_1,y_1)` and `(x_2,y_2)` is given by `(y_2-y_1)/(x_2-x_1)`. Hence slope of line joining `(6,9)` and `(−2,6)` is `(6-9)/((-2)-6)` or `-3/-8=3/8`.

As product of slope of two perpendicular lines is `-1`, slope of line perpendicular to one joining `(6,9)` and `(−2,6)` is `-1/(3/8)` or `-8/3`.

Now using Point-slope form, the equation of line passing through `(-4,1)` and slope `-8/3` will be

`(y-1)=-8/3xx(x-(-4))` or

`3(y-1)=(-8)xx(x+4)` or

`3y-3=-8x-32` or `8x+3y+29=0`