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76.26.3 problem 3

Internal problem ID [17835]
Book : Differential equations. An introduction to modern methods and applications. James Brannan, William E. Boyce. Third edition. Wiley 2015
Section : Chapter 6. Systems of First Order Linear Equations. Section 6.4 (Nondefective Matrices with Complex Eigenvalues). Problems at page 419
Problem number : 3
Date solved : Tuesday, January 28, 2025 at 11:03:41 AM
CAS classification : system_of_ODEs

\begin{align*} \frac {d}{d t}x_{1} \left (t \right )&=-2 x_{2} \left (t \right )-x_{3} \left (t \right )\\ \frac {d}{d t}x_{2} \left (t \right )&=x_{1} \left (t \right )-x_{2} \left (t \right )+x_{3} \left (t \right )\\ \frac {d}{d t}x_{3} \left (t \right )&=x_{1} \left (t \right )-2 x_{2} \left (t \right )-2 x_{3} \left (t \right ) \end{align*}

Solution by Maple

Time used: 0.133 (sec). Leaf size: 73 

dsolve([diff(x__1(t),t)=0*x__1(t)-2*x__2(t)-1*x__3(t),diff(x__2(t),t)=1*x__1(t)-1*x__2(t)+1*x__3(t),diff(x__3(t),t)=1*x__1(t)-2*x__2(t)-2*x__3(t)],singsol=all)
\begin{align*} x_{1} \left (t \right ) &= {\mathrm e}^{-t} \left (c_{1} +\sin \left (2 t \right ) c_{2} +\cos \left (2 t \right ) c_{3} \right ) \\ x_{2} \left (t \right ) &= -{\mathrm e}^{-t} \left (c_{2} \cos \left (2 t \right )-c_{3} \sin \left (2 t \right )-c_{1} \right ) \\ x_{3} \left (t \right ) &= {\mathrm e}^{-t} \left (\cos \left (2 t \right ) c_{3} +\sin \left (2 t \right ) c_{2} -c_{1} \right ) \\ \end{align*}

Solution by Mathematica

Time used: 0.014 (sec). Leaf size: 137 

DSolve[{D[x1[t],t]==0*x1[t]-2*x2[t]-1*x3[t],D[x2[t],t]==1*x1[t]-1*x2[t]+1*x3[t],D[x3[t],t]==1*x1[t]-2*x2[t]-2*x3[t]},{x1[t],x2[t],x3[t]},t,IncludeSingularSolutions -> True]
\begin{align*} \text {x1}(t)\to \frac {1}{2} e^{-t} ((c_1+c_3) \cos (2 t)+(c_1-2 c_2-c_3) \sin (2 t)+c_1-c_3) \\ \text {x2}(t)\to \frac {1}{2} e^{-t} ((-c_1+2 c_2+c_3) \cos (2 t)+(c_1+c_3) \sin (2 t)+c_1-c_3) \\ \text {x3}(t)\to \frac {1}{2} e^{-t} ((c_1+c_3) \cos (2 t)+(c_1-2 c_2-c_3) \sin (2 t)-c_1+c_3) \\ \end{align*}

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