For the following systems, the origin is the equilibrium point.dxa) Write each system in matrix form = Ax.dtb)Determine the eigenvalues of A.c) State whether the origin is a stable or unstable equilibrium.d)State whether the origin is a node, saddle point, spiral point, or center.e)State the equations of the straight-line trajectories and tell whether they are goingtowards or away from the origin. If none exist, state so.f)If A has real eigenvalues, then determine the eigenvectors and use diagonalization tosolve the system. (See examples in Section 7.4)6.dxdtdydt= 2x - 8y= x - 2y

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Answered: the following systems, the origin is…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Q.2. A system of equations is given: x, – 2x, –x, = 3, 3x, – 6x, – 2x, =2. (a) Write the system of equations in matrix and vector equation forms. (b) Use the Row Reduction Algorithm to solve the system. (c) Write your solution in parametric vector form and describe it geometrically. (d) Write the solution of the homogeneous system that obtain from give system of equations. 1 1 2 Q.3. Let a, = 2. a, =-2|, a, = and b = 1 3 -2 -2 (a) Determine if bis a linear combination of a,, a, and a,. (b) Determine if the vectors a,, a, and a, are linear independent.
5. Find an equation involving g,h, and k that makes this augment matrix corre- spond to a consistent linear system: 1 -4 3 -5 h -2 5 -9 k
Mark each statement True or False. Justify each answer. a. A homogeneous system of equations can be inconsistent. Choose the correct answer below. O A. False. A homogeneous equation can be written in the form Ax = 0, where A is an mxn matrix and 0 is the zero vector in R". Such a system Ax = 0 always has at least one solution, namely x = 0. Thus, a homogeneous system of equations cannot be inconsistent. B. True. A homogeneous equation can be written in the form Ax = 0, where A is an mxn matrix and 0 is the zero vector in RM. Such a system Ax = 0 always has at least one solution, namely x = 0. Thus, a homogeneous system of equations can be inconsistent. OC. False. A homogeneous equation cannot be written in the form Ax = 0, where A is an mxn matrix and 0 is the zero vector in R". Such a system Ax = 0 does not have the solution x = 0. Thus, a homogeneous system of equations cannot be inconsistent. O D. True. A homogeneous equation cannot be written in the form Ax = 0, where A is an mxn…
Do 2b)
Write the system in vector matrix form: a) b) O d) O X² 4 1 12 KH KH -21 -e e -21 14 21 -22 4 e² 1 x₂ 2 e e -21 4 e' -2e7 -t -e 1 x₂ -2t 4 e 2e¹ f) O None of the above. + 4 e 2e² X₁ %1 -21 2e¹ x₂ [x₁=²¹x₁ +4e¹x₂, x=-e²2¹x₁ +2e¹x₂]
Please solve this question in handwriting. Again please need it in handwriting.
b) Consider the Linear System, find the value of x1, x2 and x3 using Inverse of a matrix b) I1 I2 I3 I1 + 13 =D4 I1 + 12 + I3
1) List all of the pivot variables in matrix A 2) List all of the free variables in matrix A

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