Consider the following system.dxdtdydt= 6x + 5yK == -2x + 8yFind the eigenvalues of the coefficient matrix A(t). (Enter your answers as a comma-separated list.)λ = 7-3i, 7 + 3iFind an eigenvector corresponding to the eigenvalue with positive imaginary part.Find the general solution of the given system.(x(t), y(t)) = Consider the following system.dxdtdydt= 8x + 13yK = t= -2x+10yFind the eigenvalues of the coefficient matrix A(t). (Enter your answers as a comma-separated list.)λ = 9+5i,9 - 5iFind an eigenvector1 - 5i29 - 5i, 9 + 5icorresponding to the eigenvalue with positive imaginary part.(1 - 5i, 2)XFind the general solution of the given system.(x(t), y(t)) = C₁cos 5t + Сäsin 5tC₁ (cos(5t) +5 sin(5t), 2 cos (5t)) et + C₂ (sin(5t) - 5 cos(5t), 2 sin(5t))eºtX

As per guidelines of bartleby we solve only one problem

Answered: Consider the following system. dx dt dy…

Calculus: Early Transcendentals

8th Edition

ISBN:9781285741550

Author:James Stewart

Publisher:James Stewart

Chapter1: Functions And Models

Section: Chapter Questions

Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...

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Consider the second-order equation d 2y/dt 2 + p dy/dt +qy = 0 a. If p=q=1, compute the eigenvalues and eigenvectors of the coefficient matrix. What would be the long-term behavior of the solutions in this case? b. If p=0 and q=2 determine the general solution.
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Linear algebra: please correctly and handwritten
Apply the eigenvalue method to find a general solution of the given system. Use a computer system or graphing calculator to construct a direction field and typical solution curves for the given system. x₁ = 9x₁ - 10x₂, x 2 = 8x₁ + x₂ What is the general solution in matrix form? x(t) = F More e
) Consider the linear system X₁ = Y a. Find the eigenvalues and eigenvectors for the coefficient matrix. 18 v1 = b. Find the real-valued solution to the initial value problem {{{ = -3 -2 5 -3] Use t as the independent variable in your answers. y₁ (t) Y₂ (t) - 3y1 - 2y2, 5y1 + 3y2, y." , and X₂ = V2 y₁ (0) = 9, Y₂ (0) = -10. ||
Evaluate the derivative
Consider the system of equations vec(x′) = Ax, where A is a 2×2 matrix. If λ=2+i is an eigenvalue of A with corresponding eigenvector vec{v} = (1, −1−i), express the solution to the system of equations in terms of real-valued functions.
Consider the linear system -3 = 5 a. Find the eigenvalues and eigenvectors for the coefficient matrix. λ₁ = v₁ = = b. Find the real-valued solution to the initial value problem Use t as the independent variable in your answers. y₁ (t) = y2(t) = and ₂ = = = -3y1 - 2y2, y₁ (0) = 0, = 5y1 + 3y2, y2 (0) = 5.
Find the general solution of the system x'(t) = Ax(t) for the given matrix A. A = -1 1 0 1 4 1 0 131 What are the eigenvalues of the matrix A? The eigenvalues are -1, -3,6. (Type an integer or a fraction. Use a comma to separate answers as needed.) What is the general solution of the system? x(t)= (Do not use d, D, e, E, i, or I as arbitrary constants since these letters already have defined meanings.)
Find the General Solution of the given systems. Make sure to indicate your Eigenvalues and Eigenvectors.

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