How to approach this type of question in matlab?

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Mohit
Mohit el 3 de Ag. de 2024
Comentada: Image Analyst el 3 de Ag. de 2024
A ship travels on a straight line course described by y = (2005x)/6, where distances are measured in kilometers. The ship starts when x = -20 and ends when x = 40. Calculate the distance at closest approach to a lighthouse located at the coordinate origin (0,0). Do not solve this using a plot.
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Mohit
Mohit el 3 de Ag. de 2024
*y=200-5x/6
Sam Chak
Sam Chak el 3 de Ag. de 2024
Mohit, do not express the equation using implied multiplication or implied division. Use standard computing notation for math operators when expressing an inline equation.
Because we don't know whether the path trajectory equation is
200 - 5*(x/6)
Or
(200 - 5*x)/6.

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Respuestas (2)

Image Analyst
Image Analyst el 3 de Ag. de 2024
Editada: Image Analyst el 3 de Ag. de 2024
This looks like a homework problem. If you have any questions ask your instructor or read the link below to get started:
How do I get help on homework questions on MATLAB Answers? - MATLAB Answers - MATLAB Central
Obviously, if it is homework, we can't give you the full solution because you're not allowed to turn in our code as your own.
Hints: linspace to define x, and be sure to use enough points to get good resolution, like ten thousand or so. Use sqrt to compute distance of (x,y) to (0,0) origin. Use min to find the minimum distance and index for that distance.
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Torsten
Torsten el 3 de Ag. de 2024
@Mohit
min: x^2 + y^2 = x^2 + (200-5*x/6)^2
Do you know how to compute the vertex of this parabola ?
Image Analyst
Image Analyst el 3 de Ag. de 2024
Ran in:
@Mohit using your updated/corrected formula
x = linspace(-10, 30, 20000);
y = 200 - 5 * x / 6;
D = sqrt(x.^2 + y.^2);
min_dist = min(D)
min_dist = 177.5528
or maybe
x = linspace(-10, 30, 20000);
y = (200 - 5 * x) / 6;
D = sqrt(x.^2 + y.^2);
[min_dist, indexOfClosest] = min(D)
min_dist = 25.6074
indexOfClosest = 13197
plot(x, y, 'b-', 'LineWidth', 2)
grid on;
line([0, x(indexOfClosest)], [0, y(indexOfClosest)], 'Color', 'r', 'LineWidth', 2)
axis equal
Still not exactly sure what the formula is. Please use parentheses to make it unambiguous.

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Sam Chak
Sam Chak el 3 de Ag. de 2024
Hi @Mohit
The distance of the ship at the closest approach to a lighthouse should be the perpendicular distance from the lighthouse (0, 0) to the straight line trajectory of the ship.
https://byjus.com/maths/distance-of-a-point-from-a-line/

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