invert the function s = L(t) to solve for t.

1 vue (au cours des 30 derniers jours)
Hyunji Yu
Hyunji Yu le 9 Mar 2020
Réponse apportée : SAI SRUJAN le 30 Mai 2024
syms t;
x(t)= sin(3*t^2)*(12*t + (10*13^(1/2))/13);
y(t)= t*(6*13^(1/2)*t + 5);
z(t)= cos(3*t^2)*(12*t + (10*13^(1/2))/13);
syms tau;
L(t) = vpaintegral(speed(tau), tau, 0, t);
syms s;
solve(s == L(t), t);
I'm trying to invert the function s = L(t) to solve for t, but I don't know how to change the function regarding as t.
  1 commentaire
Nishant Gupta
Nishant Gupta le 13 Mar 2020
Can you please tell what is speed(tau)?

Connectez-vous pour commenter.

Connectez-vous pour répondre à cette question.

Réponses (1)

SAI SRUJAN
SAI SRUJAN le 30 Mai 2024
Hi Hyunji,
I understand that you are trying to invert the function 's=L(t)' to solve for 't'.
The speed '(v(t))' of a particle moving along a path in three-dimensional space is given by the magnitude of its velocity vector, which is the derivative of its position vector, then: ['v(t) = sqrt(dx^2 + dy^2 + dz^2);'].
Please go through the following code sample to proceed further,
syms s t tau;
x(t) = sin(3*t^2)*(12*t + (10*sqrt(13))/13);
y(t) = t*(6*sqrt(13)*t + 5);
z(t) = cos(3*t^2)*(12*t + (10*sqrt(13))/13);
dx = diff(x, t);
dy = diff(y, t);
dz = diff(z, t);
% Speed function v(t)
v(t) = sqrt(dx^2 + dy^2 + dz^2);
% Define L(t) as the integral of v(tau) from 0 to t
L(t) = int(v(tau), tau, 0, t);
tSol = vpasolve(s == L(t), t);
For a comprehensive understanding of the 'vpasolve' function in MATLAB, please refer to the following documentation.
https://www.mathworks.com/help/symbolic/sym.vpasolve.html
I hope this helps!

Catégories

En savoir plus sur Symbolic Math Toolbox dans Help Center et File Exchange

Tags

Community Treasure Hunt

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

Start Hunting!

Translated by