I want to solve the below mentioned system of ODEs. However I get the warning "Explicit solution could not be found. > In dsolve at 194 " Can anyone explain me why?
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syms v(t)
syms p(t)
syms k
syms g
syms m
o1='Dv= -k*v(t)*v(t)/m - g*sin(p(t))’;
o2='Dp= -g*cos(p(t))/v(t)’;
int=’v(0)=50, p(0)=35’;
[v,p]=dsolve(o1,o2,int)
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Answers (2)
Zoltán Csáti
on 3 Nov 2014
First of all, the first five lines are not needed. To answer your problem: this nonlinear differential equation system can not be solved by the Symbolic Math Toolbox. I tried to solve it with the more advanced Maple 16, but it couldn't solve either. I suggest you to solve it numerically, or using an approximate analytic method.
MA
on 3 Nov 2014
you can't solve it unless you have k,g,m parameters
3 Comments
Torsten
on 4 Nov 2014
You don't need an explicit function for p and v. If you have p and v in an array at times t(1),...,t(n), just use MATLAB interp1 to interpolate the values for t and p at times in between the t(i)'s.
For an example, take a look at example 3 under
Best wishes
Torsten.
Torsten
on 4 Nov 2014
Or even simpler:
Solve for p,v,x and y simultaneously using ODE45:
dv/dt= -k*v*v/m - g*sin(p)
dp/dt= -g*cos(p)/v
dx/dt = v*cos(p)
dy/dt = v*sin(p)
Best wishes
Torsten.
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