Homework Answers
See dear these all are different lengthy problems. According to HOMEWORKLIB RULES I have to solve only the first question when multiple questions are given. So I am solving first question. Hope similarly you can solve other questions.Rate it.
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(1 point) Calculate the eigenvalues of this matrix: [Note-- you'll probably want to use a calculator...
(1 point) Consider the system of differential equations dx dt = -1.6x + 0.5y, dy dt...
(1 point) Consider the system of differential equations dx dt = -1.6x + 0.5y, dy dt = 2.5x – 3.6y. For this system, the smaller eigenvalue is -41/10 and the larger eigenvalue is -11/10 [Note-- you may want to view a phase plane plot (right click to open in a new window).] If y' Ay is a differential equation, how would the solution curves behave? All of the solutions curves would converge towards 0. (Stable node) All of the solution...
(1 point) Given that ū = and are eigenvectors of the matrix -12 24 determine the...
(1 point) Given that ū = and are eigenvectors of the matrix -12 24 determine the corresponding eigenvalues. 21 = -1 12 = 1 (1 point) Solve the system -6 1 dx dt х -6 -1 with the initial value 0 x(0) = -2 x(t) = (1 point) Calculate the eigenvalues of this matrix: [Note-- you'll probably want to use a calculator or computer to estimate the roots of the polynomial which defines the eigenvalues. You also may want to...
(1 point) a. Find the most general real-valued solution to the linear system of differential equations...
(1 point) a. Find the most general real-valued solution to the linear system of differential equations x -8 -10 x. xi(t) = C1 + C2 x2(t) b. In the phase plane, this system is best described as a source / unstable node sink / stable node saddle center point / ellipses spiral source spiral sink none of these ОООООО (1 point) Calculate the eigenvalues of this matrix: [Note-- you'll probably want to use a calculator or computer to estimate the...
= 3x +0.75y, = 1.66667x + y. For this system, the smaller eigenvalue is 1/2 and...
= 3x +0.75y, = 1.66667x + y. For this system, the smaller eigenvalue is 1/2 and the larger eigenvalue is 7/2 [Note-- you may want to view a phase plane plot (right click to open in a new window).] If y' = Ay is a differential equation, how would the solution curves behave? All of the solutions curves would converge towards 0. (Stable node) All of the solution curves would run away from 0. (Unstable node) The solution curves would...
(1 point) Consider the systems of differential equations = 0.12 - 0.4y, = -0.4x + 0.7y....
(1 point) Consider the systems of differential equations = 0.12 - 0.4y, = -0.4x + 0.7y. For this system, the smaller eigenvalue is !!! and the larger eigenvalue is Use the phase plotter pplane9.m in MATLAB to determine how the solution curves behave. A. The solution curves converge to different points. B. All of the solution curves converge towards 0. (Stable node) C. All of the solution curves run away from 0. (Unstable node) D. The solution curves race towards...
(1 point) Solve the initial value problem dx -H x(0) х, dt Give your solution in...
(1 point) Solve the initial value problem dx -H x(0) х, dt Give your solution in real form. x(t) Use the phase plotter pplane9.m in MATLAB to determine how the solution curves (trajectories) of the system x' = Ax behave. A. The solution curves race towards zero and then veer away towards infinity. (Saddle) B. All of the solution curves converge towards 0. (Stable node) C. All of the solution curves run away from 0. (Unstable node) D. The solution...
(1 point) Solve the initial value problem dx 1.5 2. -1.5 1,5) X, x(0) = (-3)...
(1 point) Solve the initial value problem dx 1.5 2. -1.5 1,5) X, x(0) = (-3) dt -1 Give your solution in real form. 3e^(1/2) x(t) = -2e^(-1/2t) Use the phase plotter pplane9.m in MATLAB to determine how the solution curves (trajectories)of the system x' Ax behave. O A. The solution curves converge to different points. OB. The solution curves race towards zero and then veer away towards infinity (Saddle) C. All of the solution curves run away from 0....
I'm completely stumped on these. I don't know how to proceed once I get to the...
I'm completely stumped on these. I don't know how to proceed
once I get to the eigenvalue since my typical method for solving
would be to set Ax=x
, then solve. However, this would give me
-5x1=-5x1 and -5x2=-5x2
which makes A trivial. I just realized that means the eigenvectors
will be <1,0> and <0,1>, but I'm still stumped on parts
b and c.
Consider the following system. (A computer algebra system is recommended.) dx = -5 0x dt *...
Its question 15 that i am stuck with. I want to know how the model looks like and how to make it. 8.2 HC 15. As shown i...
Its question 15 that i am stuck with.
I want to know how the model looks like and how to make it.
8.2 HC 15. As shown in Figure 8.2.6 two large connected mixing tanks A and B initially contain 100 1liters of brine. Liquid is pumped in and out of the tanks as indicated in the figure; the mixture pumped between and out ofa tank is assumed to be well-stirred. (a) Construct a mathematical model in the form of...
Differential equation class. Please show steps to the solutions. Section 3.3 Exercises To Solutions For all exercises...
Differential equation class. Please show steps to the
solutions.
Section 3.3 Exercises To Solutions For all exercises in this section you will be working with the equation dt for various values of m, β and k. but always with f(t)-0. 1. (a) Solve the initial value problem consisting of Equation (1) withm-5, B- and k 80, and initial conditions y(02, y(0)-6. Give your answer in the form y Cesin(wt and all numbers in decimal form, rounded to the nearest tenth....
(1 point) Consider the system of differential equations dx dt = -1.6x + 0.5y, dy dt = 2.5x – 3.6y. For this system, the smaller eigenvalue is -41/10 and the larger eigenvalue is -11/10 [Note-- you may want to view a phase plane plot (right click to open in a new window).] If y' Ay is a differential equation, how would the solution curves behave? All of the solutions curves would converge towards 0. (Stable node) All of the solution...
(1 point) Given that ū = and are eigenvectors of the matrix -12 24 determine the corresponding eigenvalues. 21 = -1 12 = 1 (1 point) Solve the system -6 1 dx dt х -6 -1 with the initial value 0 x(0) = -2 x(t) = (1 point) Calculate the eigenvalues of this matrix: [Note-- you'll probably want to use a calculator or computer to estimate the roots of the polynomial which defines the eigenvalues. You also may want to...
(1 point) a. Find the most general real-valued solution to the linear system of differential equations x -8 -10 x. xi(t) = C1 + C2 x2(t) b. In the phase plane, this system is best described as a source / unstable node sink / stable node saddle center point / ellipses spiral source spiral sink none of these ОООООО (1 point) Calculate the eigenvalues of this matrix: [Note-- you'll probably want to use a calculator or computer to estimate the...
= 3x +0.75y, = 1.66667x + y. For this system, the smaller eigenvalue is 1/2 and the larger eigenvalue is 7/2 [Note-- you may want to view a phase plane plot (right click to open in a new window).] If y' = Ay is a differential equation, how would the solution curves behave? All of the solutions curves would converge towards 0. (Stable node) All of the solution curves would run away from 0. (Unstable node) The solution curves would...
(1 point) Consider the systems of differential equations = 0.12 - 0.4y, = -0.4x + 0.7y. For this system, the smaller eigenvalue is !!! and the larger eigenvalue is Use the phase plotter pplane9.m in MATLAB to determine how the solution curves behave. A. The solution curves converge to different points. B. All of the solution curves converge towards 0. (Stable node) C. All of the solution curves run away from 0. (Unstable node) D. The solution curves race towards...
(1 point) Solve the initial value problem dx -H x(0) х, dt Give your solution in real form. x(t) Use the phase plotter pplane9.m in MATLAB to determine how the solution curves (trajectories) of the system x' = Ax behave. A. The solution curves race towards zero and then veer away towards infinity. (Saddle) B. All of the solution curves converge towards 0. (Stable node) C. All of the solution curves run away from 0. (Unstable node) D. The solution...
(1 point) Solve the initial value problem dx 1.5 2. -1.5 1,5) X, x(0) = (-3) dt -1 Give your solution in real form. 3e^(1/2) x(t) = -2e^(-1/2t) Use the phase plotter pplane9.m in MATLAB to determine how the solution curves (trajectories)of the system x' Ax behave. O A. The solution curves converge to different points. OB. The solution curves race towards zero and then veer away towards infinity (Saddle) C. All of the solution curves run away from 0....
I'm completely stumped on these. I don't know how to proceed
once I get to the eigenvalue since my typical method for solving
would be to set Ax=x
, then solve. However, this would give me
-5x1=-5x1 and -5x2=-5x2
which makes A trivial. I just realized that means the eigenvectors
will be <1,0> and <0,1>, but I'm still stumped on parts
b and c.
Consider the following system. (A computer algebra system is recommended.) dx = -5 0x dt *...
Its question 15 that i am stuck with.
I want to know how the model looks like and how to make it.
8.2 HC 15. As shown in Figure 8.2.6 two large connected mixing tanks A and B initially contain 100 1liters of brine. Liquid is pumped in and out of the tanks as indicated in the figure; the mixture pumped between and out ofa tank is assumed to be well-stirred. (a) Construct a mathematical model in the form of...
Differential equation class. Please show steps to the
solutions.
Section 3.3 Exercises To Solutions For all exercises in this section you will be working with the equation dt for various values of m, β and k. but always with f(t)-0. 1. (a) Solve the initial value problem consisting of Equation (1) withm-5, B- and k 80, and initial conditions y(02, y(0)-6. Give your answer in the form y Cesin(wt and all numbers in decimal form, rounded to the nearest tenth....
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