Question

2 X with x(0) = 27 4. Consider the linear system of initial value problems: X' = Then (1) is: [ 2e2 – 2e5 (a) L-e²+ 6es - 2e² + 2e 5 (b) 1-e² – 6e-5 2e2 – 2e-57 (c) L-e²+ 6e-5] -2e2 +2e-57 (d) - 2 – 6e-5

Answer 1

1 >> we've given + X'=A8; 8101=[-2.] A>['3-4] To find the son of this como: De we'll ist hind eigen value & eigen vector of a Eigenisalue 1-1 2 (A-111=0 2 1²-3 1-10=0 (1-2)(4+5)= 0 P1= Now to find eigen vechor correspond. to di & da For d=2! let X1 = [X1329]? be -- [A7] "1-341-15-2] - - !A-1,13%,+ 0 => [% +2134)=(:] = x 2 X 2 = 0 Take xg t = x1= 2t. X) = [2 JT ; teir (for) For d = 5! let X2 be eigen vector .. [A-dg7] [ $?] ]"12 - [A-d27]*2=0 + [% 11%)=0 a 391 + ₂ =0 Let Yazt a Y = -4/3 :: X2= [-113 1]' i eigen vector O т

we've -5% ور E *10 (2, [3]) & (-59[-13) 1. Som is akt = Ceny the X2 e24+5[***]e 20, e e2?_ulf2e57 (cie 2x + estch • 860)=(- - [ 33- [ 297€ .. we get + 2C1- C2 - 0 3 ► 2010 - C2/3 *C1=C2 & Cita = -7 -> (2 +C =-2 -1 62 =-6] :.; = -1 from a 2x XCOF -222726-5%, L-021 6 6 5x -2e2+24 5 option (b) Idare comech
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