We need at least 10 more requests to produce the answer.
0 / 10 have requested this problem solution
The more requests, the faster the answer.
- Consider matrix A² b) exp(at) 9 sinfat) + Cos (At) (use the results of the...
Need step by step solution, thanks!
Find matrix functions exp(At), sin(At) and cos(At) if A is 2
Find matrix functions exp(At), sin(At) and cos(At) if A is
2
[15] 8. (a) Check if the matrix A is defective or not. (b) Use the results of (a) to find the general solution to the system x' = Ax if A = =(24)
[15] 8. (a) Check if the matrix A is defective or not. (b) Use the results of (a) to find the general solution to the system x' = Ax if A= = (214)
[15] 8. (a) Check if the matrix A is defective or not. (b) Use the results of (a) to find the general solution to the system x' = Ax if 1-(2)
[15] 8. (a) Check if the matrix A is defective or not. (b) Use the results of (a) to find the general solution to the system x' = Ax if A= 1-2 14
(b) Consider the matrix differential equation for the vector x(t) d dt - B2+ where B= (69) 4 10 5 -1 (i) Find a particular solution to the matrix differential equation. (ii) Evaluate exp(Bt). (iii) Find the general solution to the matrix differential equation. Express the general solution in terms of the components of the vector (0).
(b) Consider the matrix differential equation for the vector x(t) d dt - B2+ where B= (69) 4 10 5 -1 (i) Find a particular solution to the matrix differential equation. (ii) Evaluate exp(Bt). (iii) Find the general solution to the matrix differential equation. Express the general solution in terms of the components of the vector (0).
2. Matrix B is defined as, -31 B=10-2 0 0-2 a. Find the Jordan form of matrix B b. Find exp (Jt), where J is the Jordan form of matrix B c. Find exp (Bt)
2. Matrix B is defined as, -31 B=10-2 0 0-2 a. Find the Jordan form of matrix B b. Find exp (Jt), where J is the Jordan form of matrix B c. Find exp (Bt)
9. Consider the matrix A = | 1-3 51 (a) Find A-1. (b) Use A-1 to solve the systems Ax = bı, Ax = b2 and Ax = b3, where b = [1]. bx= [] be= []; without using Gauss-Jordan elimination.
Convolution Integrals. For part A the solution I got was
t*exp(z*t) and for part B the solution I got was (exp(z2*t) -
exp(z1*t))/(z2-z1). I need help with the third part of the question
calculating (f * f)(t) without computing any integrals.
f(t -s)g(s)ds by hand for (a) and (b) below Calculate (a) f(t) g(t) = et where z is a constant e21t and g(t) e22t where z1 and z2 are constants (b) f(t) Use your results from parts (a) and...