SOLUTION: Find the distance from (6,-3)to the line defined by y= 2x-5. Express as a radical or a number rounded to the nearest hundreth
Algebra ->
Rational-functions
-> SOLUTION: Find the distance from (6,-3)to the line defined by y= 2x-5. Express as a radical or a number rounded to the nearest hundreth
Log On
Question 849870: Find the distance from (6,-3)to the line defined by y= 2x-5. Express as a radical or a number rounded to the nearest hundreth Found 3 solutions by Alan3354, Fombitz, Edwin McCravy:Answer by Alan3354(69443) (Show Source):
You can put this solution on YOUR website! Step 1, find the line perpendicular to y = 2x-5 thru (6,3), point A.
Step 2, find the intersection of the 2 lines, point B.
Step 3, find the distance AB.
=================
email for help or to check your work.
You can put this solution on YOUR website! Do you mean the minimum distance to the line?
If so, the minimum distance is a perpendicular line going through the point.
A perpendicular line would have the form,
Use the point to solve for .
.
.
.
Find the intersection of the two lines.
Set them equal to each other.
Then from either equation, solve for .
Now find the distance from (6,-3) to (2,-1) using the distance formula,
They did it the long way.
The formula for the distance from a point to a line is
where the equation of the line is Ax+By+C=0 and the point is (x1,y1)
The point is (x1,y1) = (6,-3)
The line's equation is y=2x-5. we must get that in the form
Ax+By+C=0
y=2x-5. We subtract the entire right side from both sides
-2x+y+5=0
A=-2, B=1, C=5, (x1,y1) = (6,-3)
We can rationalize the denominator by multiplying by .
.
That's about 4.47, so let's draw the graph as a check:
That green line looks like it's about 4.47 units in length.
Edwin
