What is the equation of the line that goes through #(3, 7)# and is perpendicular to #8x-3y=-3#?

1 Answer
Sep 16, 2016

#y=-3/8x+65/8#

Explanation:

Consider the standard form of #y=mx+c# where #m# is the gradient (slope).

Any line perpendicular to this will have a gradient of #(-1)xx1/m = -1/m#

'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
given:#" "8x-3y=-3#

We need to convert this into form #y=mx+c#

Add #3y to both sides

#8x=3y-3#

Add 3 to both sides

#8x+3=3y#

Divide both sides by 3

#y=8/3x+1#

Thus #m=8/3#

Thus #-1/m = -3/8#
'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
So the perpendicular line has the equation: #y=-3/8x+c#

We are told this passes through the point #(x,y)->(3,7)#

So by substituting for #x# and #y# we have

#color(brown)(y=-3/8x+c" "color(blue)(->" "7=-3/8(3)+c)#

#7=-9/8+c#

#c=7+9/8 = 65/8#

Thus we have

#y=-3/8x+65/8#

Tony B