Question 1160834: Find the point on the line y=5x+1 that is closest to the point (3,5) .
Found 2 solutions by Boreal, ikleyn:
Answer by Boreal(15235)   (Show Source):
You can put this solution on YOUR website! 
Find the perpendicular line through (3, 5) that intersects the line y=5x+1
the perpendicular line has slope -(1/5), the negative reciprocal.
so y-y1=m(x-x1) point slope formula, m=slope and (x1, y1) the point.
y-5=(-1/5)(x-3)
y=(-1/5)x+3/5+5
y=(-1/5)x+(28/5)
Those two lines intersect at a point when (-1/5)x+(28/5)=5x+1
or (26/5)x=(23/5)
or x=(23/26)
when x=(23/26), y=141/26 using the 5x+1
and x=(23/26), y=-23/130+(728/130), or (705/130), which is 141/26
One could use the distance formula, but the perpendicular line to the intersection of the two will yield the closest point.
((-23/26), (141/26))
Answer by ikleyn(52903)  (Show Source):
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