Projecting a point into a line

18 visualizaciones (últimos 30 días)
Donigo Fernando Sinaga
Donigo Fernando Sinaga el 10 de Dic. de 2018
Comentada: Donigo Fernando Sinaga el 19 de Dic. de 2018
How can I project a point (let's say (50,0)) to a line (y = 5.6x - 7.1)?
Thank you.
  3 comentarios
Mostrar 1 comentario más antiguo
Donigo Fernando Sinaga
Donigo Fernando Sinaga el 11 de Dic. de 2018
How can I define a function y = 9.1*x -135.3396 in 'vector' variable? And how can I plot like that?
Adam Danz
Adam Danz el 11 de Dic. de 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.

Iniciar sesión para comentar.

Iniciar sesión para responder a esta pregunta.

Respuesta aceptada

Adam Danz
Adam Danz el 11 de Dic. de 2018
Editada: Adam Danz el 11 de Dic. de 2018
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
181211 152914-Figure 1.jpg
  1 comentario
Donigo Fernando Sinaga
Donigo Fernando Sinaga el 19 de Dic. de 2018
Thank you very much, your answer really helps me. Thank you!

Iniciar sesión para comentar.

Más respuestas (0)

Categorías

Más información sobre Numerical Integration and Differentiation en Help Center y File Exchange.

Etiquetas

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by