1. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
Example: Write the equation of motion of the mechanical system given below in the State Variables Form. Force applied on the system is F(t)=100 u(t) (a step input having magnitude 100 Newtons) and at t=0 x0=0.05 m and dx/dt=0. Find x(t) and v(t).
State variables are x and v=dx/dt .
m=20 kg
c=40 Ns/m
k=5000 N/m
Matlab program to obtain eigenvalues:
>>a=[0 1; ];eig(a)

2. Solution due to the initial conditions
SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
Applying Laplace transform and arranging,
Solution due to the initial conditions
Solution due to the input

3. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
clc;clear;
syms s;
A=[0 1; ];
i1=eye(2); %identity matrix with dimension 2x2
siA=s*i1-A;
x0=[0.05;0]; %Initial conditions
B=[0;0.05];
Fs=100/s;
X=inv(siA)*x0+inv(siA)*B*Fs;
pretty(X)
For x(t) ;
clc;clear;
num=[ ];
den=[ ];
[r,p,k]=residue(num,den)

4. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
Steady-state value (Final value)
Initial value, x0

5. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
For v(t)
clc;clear;
num=[-7.5];
den=[ ];
[r,p,k]=residue(num,den)

6. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
Example:
Mathematical model of a mechanical system is defined as a system of differential equations as follows:
where f is input, x1 are x2 outputs.
At t=0 x1=2 and x2=-1.
Find the eigenvalues of the system.
If f is a step input having magnitude of 3, find x1(t).
If f is a step input having magnitude of 3, find x2(t).
Find the response of x1 due to the initial conditions.
Find the response of x2 due to the initial conditions.
How do you obtain [sI-A]-1 with MATLAB?

7. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
Let us obtain the State Variables Form so as to 1st order derivative terms are left-hand side and non-derivative terms are on the right-hand side.
State Variables Form A B
D(s)

8. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
a) Eigenvalues are roots of the polynomial D(s) or eigenvalues of the matrix A. or
General Solution
Solution due to the initial conditions
Homogeneous Solution
Solution due to the input Particular Solution
Initial Conditions
b) x1(t) due to the forcing
clc;clear;
num=[ ];
den=[ ];
[r,p,k]=residue(num,den)

9. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
System is unstable because of the positive root.
c) x2(t) due to input
clc;clear;
num=[6 174];
den=[ ];
[r,p,k]=residue(num,den)
Laplace transform of x2p

10. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
d) x1 due to the initial conditions.
clc;clear;
num=[2 -25];
den=[ ];
[r,p,k]=residue(num,den)
e) x2 due to the initial conditions
clc;clear;
num=[-1 4];
den=[ ];
[r,p,k]= residue(num,den)
f) [sI-A]-1 with Matlab.
clc;clear;
syms s;
i1=eye(2)
A=[-20 15;12 5];
a1=inv(s*i1-A)
pretty(a1)

11. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
Example:
Mathematical model of a system is given below. Where V(t) is input, q1(t) and q2(t) are outputs.
Write the equations in the form of state variables.
Write Matlab code to obtain eigenvalues of the system.
Write Matlab code to obtain matrix [sI-A]-1.
Results of (b) and (c) which are obtained by computer are as follows: 2
t (s)
V2(t)
At t=0
and V(t) is a step input having magnitude of 2.
Find the Laplace transform of due to the initial conditions.
e) Find the Laplace transform of q1 due to the input.

12. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
a) State variables are q1, q2 and
System of differential equations is arranged so as to 1st order derivative terms are left-hand side and non-derivative terms are on the right-hand side. A B
State variables
b) Matlab code which gives the eigenvalues of the system.
A=[ ;0 0 1; ]; eig(A)
c) Matlab code which produces [sI-A]-1
clc;clear
A=[ ;0 0 1; ];
syms s;
i1=eye(3);
sia=inv(s*i1-A);
pretty(sia)

13. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS

14. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
Example: Mathematical model of a mechanical system having two degrees of freedom is given below. If F(t) is a step input having magnitude 50 Newtons, find the Laplace transforms of x and θ.
R=0.2 m
m=10 kg
k=2000 N/m
c=20 Ns/m
State variables

15. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS
clc;clear
A=[ ; ; ; ];
syms s;
eig(A)
i1=eye(4);
sia=inv(s*i1-A);
pretty(sia)
If the initial conditions are zero, only the solution due to the input exists.
Eigenvalues:
System is stable since real parts of all eigenvalues are negative.

16. SYSTEM OF ORDINARY DIFFERENTIAL EQUATIONS