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Hello,
I want to solve following differential equation:
(x^2+x+1) / (x^2+x) dx/dt + dy/dt = 1 with constraint x+x^2 = y+y^2
It involves derivatives of both x and y. How can I solve this in Matlab.
Thanks guys in advance!! Cheers

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Birdman
Birdman am 23 Okt. 2017

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syms y(t) x(t)
a=(x^2+x+1)/(x^2+x);
%%because of the constraint, x+x^2=y+y^2 ----> x+y=-1. Take the derivative wrt t and you will
%%find x_dot=-y_dot;
eqns=a*diff(x,t)-diff(x,t)==1;
X=dsolve(eqns,t)
Try this.

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Harshit Agarwal
Harshit Agarwal am 23 Okt. 2017
Thanks for the quick answer!! really appreciate that.
How do you arrived at x+x^2=y+y^2 ----> x+y=-1 ? Shouldn't it be dx/dt*(1+2x)=dy/dt*(1+2y)?
Birdman
Birdman am 23 Okt. 2017
x-y=(y-x)*(y+x),
Division of x-y to y-x brings -1 and therefore;
x+y=-1
Steven Lord
Steven Lord am 23 Okt. 2017
x = 42;
y = 42;
L = x + x.^2;
R = y + y.^2;
isequal(L, R) % true
isequal(x+y, -1) % false
Be careful about dividing by 0.
Harshit Agarwal
Harshit Agarwal am 24 Okt. 2017
Well, my bad. Let's say if we cannot express dx explicitly in terms of dy, then how to solve this type of equations. For. e.g.,
(x^2+x+1) / (x^2+x) dx/dt + dy/dt = 1 with constraint x^2+y^2+xy=10 (or any constant)
Torsten
Torsten am 24 Okt. 2017
Bearbeitet: Torsten am 24 Okt. 2017
Differentiate the algebraic equation with respect to t.
The differential equation and the differentiated algebraic equation then give you a linear system of equations in the unknowns dx/dt and dy/dt. Solve it explicitly for dx/dt and dy/dt and then use one of the standard ODE integrators.
Or write your system as
M*[dx/dt ; dy/dt] = f(t,x,y)
with
M = [(x^2+x+1)/(x^2+x) 1 ; 0 0]
f = [1 ; x^2+y^2+x*y-10]
and use ODE15S with the state-dependent mass matrix option.
Best wishes
Torsten.
David Goodmanson
David Goodmanson am 24 Okt. 2017
Why should x+x^2 = y+y^2 imply x+y = -1 only? x = y also works, in which case
eqns=a*diff(x,t)-diff(x,t)==1;
becomes
eqns=a*diff(x,t)+diff(x,t)==1;
in which case
Warning: Unable to find explicit solution. Returning implicit solution instead.
X = solve(2*x - 2*atanh(2*x + 1) == C2 + t, x)
Not as convenient as the first solution since t is given as a function of x rather than vice versa, but still a solution.

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