Question

How do you find a standard form equation for the line with (8, -2) and perpendicular to the line whose equation is x-5y-7=0?

Answer 1

`5x+y+2=0`

Explanation:

the basic equation of a straight line with known gradient `" "m" "`and one known set of co-ordinates`" (x_1,y_1)`

`y-y_1=m(x-x_1)`

we are given a line perpendicular to the required line so we use the fact that if the gradient of the required line is`" "m_1" "`and the gradient of a line perpendicular to it `" "m_2" "` then we have

`m_1m_2=-1`

that is the product of the gradients of perpendicular lines is `-1`

so we use the line given to find the gradient

`x-5y-7=0`

rearrange to the form

`y=mx+c`

`x-7=5y`

`y=1/5x-7/5`

`=>m=1/5`

this is the perpendicular gradient `m_2`

so

`m_1m_2=-1`

`=>m_1xx1/5=-1`

`:.m_1=-5`

we also have

`" (x_1,y_1)=(8,-2)`

`y-y_1=m(x-x_1)`

becomes

`y-8=-5(x- -2)`

`y-8=-5x-10`

`5x+y+2=0`

If the reader compares this with the original lines `x-5y-7=0`

a pattern may be seen .