Symbolic derivative of function using diff()

23 Mai 2014
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Aktualisiert 13 Jun. 2015
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For those familiar, I am writing a function to find the EOMs using the lagrangian.
I have defined all variables as syms: x(t), y(t), z(t)...
Afterward, I define eqns KE and PE as functions of x,y, and z; and L = KE - PE.
When I call diff(L,x(t)) matlab returns the correct answer, but when attempting to take a second derivative with respect to time [diff(diff(L,x(t)),t)], Matlab calls the incorrect form of diff() and yields: "Error using sym/diff, [secondary] arguments must not be symbolic." Is there a way to force this command such that it yields a result? Happy to provide specific code on request, thank you.

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Antworten (2)

Mahdi
Mahdi am 23 Mai 2014

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Why don't you just tell diff to take the second derivative immediately? Look under the Higher-Order Derivatives subsection for diff.
In this case, you can do:
diff(L,x(t),2) % Second derivative

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Oscar Sandoval
Oscar Sandoval am 23 Mai 2014
Mahdi,
Second derivative is wrt a different variable - i.e. d/dt(d/dx(f(x))), in accordance with first term of lagrangian formulation of equations of motion.
Mahdi
Mahdi am 23 Mai 2014
Try
diff(L,x(t),t)
Also make sure that t is also defined as a symbol
syms t
Oscar Sandoval
Oscar Sandoval am 23 Mai 2014
Mahdi,
diff(L,x_d(t),t): 'Error using sym/diff (line 69) The second and third arguments must either be variables or a variable and a nonnegative integer specifying the number of differentiations.'
It appears to interpret 't' as t number of differentiations.
Mahdi
Mahdi am 23 Mai 2014
Sorry, I'm trying to understand the problem itself here. Is t a defined set of numbers? Or is it just a symbol? Can you show me the definitions of x(t) and y(t) (what you made them equal to?)?
Oscar Sandoval
Oscar Sandoval am 23 Mai 2014
Mahdi,
x(t) and y(t) are two of six coordinates defining position and orientation of the Center of Mass of a dynamic system. These variables are measured inputs of the system. I am attempting to solve the function symbolically to arrive at the EoMs of the system, which will then be evaluated at the measured values of x and y, amongst other inputs, in order to design a real-time controller. Are you familiar with the Euler-Lagrange equations?
Mahdi
Mahdi am 26 Mai 2014
Sorry for the late reply,
I am afraid that I am not. I would suggest posting the question again and adding a bit more detail. Try searching the forums because I have run into this problem into the past and found a solution online.

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Mischa Kim
Mischa Kim am 13 Jun. 2015

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Check out the Euler-Lagrange tool on File Exchange.

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Oscar Sandoval
Oscar Sandoval
am 23 Mai 2014

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Walter Roberson
Walter Roberson
am 13 Jun. 2015

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