Projecting a point into a line
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How can I project a point (let's say (50,0)) to a line (y = 5.6x - 7.1)?
Thank you.
3 Comments
Mark Sherstan
on 11 Dec 2018
Look at the answer here
Donigo Fernando Sinaga
on 11 Dec 2018
Adam Danz
on 11 Dec 2018
If you look at the example in the link Mark provided, you'll see that the vector variable is actually a 2x2 matrix of the endpoint coordinates of the line.
Since you already have the slope, intercept, and (x,y) coordinates of another point, I suggest using the method proposed in the answer section.
Accepted Answer
You need the equation of both perpendicular lines. You already have the equation for the first line. In your line y = 5.6x - 7.1 the slope is 5.6.
The slope of the second line will just be the perpendicular slope of your first line.
m = 5.6;
b = -7.1;
x = 50;
y = 0;
perpSlope = -1/m;
To get the y intercept of the 2nd line you just need to solve for y=mx+b using your point (x,y)
yInt = -perpSlope * x + y;
Now you've got the two linear equations and you need to find out where they intersect. Here we find the x coordinate of the intersection. m and b are the slope and intercept of line 1, perSlope and yInt are the slope and intercept of line 2.
xIntersection = (yInt - b) / (m - perpSlope);
To get the y coordinate of the intersection, we just plug the x coordinate into one of the equations.
yIntersection = perpSlope * xIntersection + yInt;
Now we can plot it out to make sure it looks rights
figure
plot(x,y, 'rx')
hold on
plot(xIntersection, yIntersection, 'ro')
refline(m, b)
refline(perpSlope, yInt)
axis equal
1 Comment
Donigo Fernando Sinaga
on 19 Dec 2018
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