Solve the following system (d/dt)X=(3x3 matrix) (-1 -1 0; 1 -1 1; 0 1 1)X+(column matrix)...

Solve the system of differential equations using laplace transformation dy/dt-x=0,dx/dt+y=1,x(0)=-1,y(0)=1

Solve the system of differential equations using laplace transformation dy/dt-x=0,dx/dt+y=1,x(0)=-1,y(0)=1

Solve the following system of linear equations: 3x2−9x3 = −3 x1−2x2+x3 = 2 x2−3x3 = 0...

Solve the following system of linear equations: 3x2−9x3 = −3 x1−2x2+x3 = 2 x2−3x3 = 0 If the system has no solution, demonstrate this by giving a row-echelon form of the augmented matrix for the system. If the system has infinitely many solutions, your answer may use expressions involving the parameters r, s, and t. You can resize a matrix (when appropriate) by clicking and dragging the bottom-right corner of the matrix.

Solve the system -2x1+4x2+5x3=-22 -4x1+4x2-3x3=-28 4x1-4x2+3x3=30 a)the initial matrix is: b)First, perform the Row Operation 1/-2R1->R1....

Solve the system -2x1+4x2+5x3=-22 -4x1+4x2-3x3=-28 4x1-4x2+3x3=30 a)the initial matrix is: b)First, perform the Row Operation 1/-2R1->R1. The resulting matrix is: c)Next perform operations +4R1+R2->R2 -4R1+R3->R3 The resulting matrix is: d) Finish simplyfying the augmented mantrix down to reduced row echelon form. The reduced matrix is: e) How many solutions does the system have? f) What are the solutions to the system? x1 = x2 = x3 =

solve the given initial value problem dx/dt=7x+y x(0)=1 dt/dt=-6x+2y y(0)=0 the solution is x(t)= and y(t)=

solve the given initial value problem dx/dt=7x+y x(0)=1 dt/dt=-6x+2y y(0)=0 the solution is x(t)= and y(t)=

Solve the system of equations by method of the Laplace transform: 3 dx/dt + 3x +2y...

Solve the system of equations by method of the Laplace transform: 3 dx/dt + 3x +2y = e^t 4x - 3 dy/dt +3y = 3t x(0)= 1, y(0)= -1

Use the Laplace transform to solve the given system of differential equations. dx/dt=x-2y dy/dt=5x-y x(0) =...

Use the Laplace transform to solve the given system of differential equations. dx/dt=x-2y dy/dt=5x-y x(0) = -1, y(0) = 6

Use the Inverse to solve the column vector variable matrix or use Cramer’s Rule and solve...

Use the Inverse to solve the column vector variable matrix or use Cramer’s Rule and solve the same column vector variable matrix. 3x1+ 4x2 - 3x3 = 5 3x1 - 2x2+ 4x3 = 7 3x1+ 2x2 - x3 = 3

1. Solve the following initial value problem using Laplace transforms. d^2y/dt^2+ y = g(t) with y(0)=0...

1. Solve the following initial value problem using Laplace transforms. d^2y/dt^2+ y = g(t) with y(0)=0 and dy/dt(0) = 1 where g(t) = t/2 for 0<t<6 and g(t) = 3 for t>6

Solve the following system of ordinary differential equations. 2 dx/dt − 2 dy /dt − 3x...

Solve the following system of ordinary differential equations. 2 dx/dt − 2 dy /dt − 3x = e (n+1)t 2 dx/dt + 2 dy/dt + 3x + 8y = 2

Solve the following system of differential equations: dx/dt =x+2y dy/dt =−x+3y

Solve the following system of differential equations: dx/dt =x+2y dy/dt =−x+3y