1. y" + 2y' + y = e^(-t) cos(t) 2. y" + 4y' + 4y =...

3. For each of the following equations find a particular solution yp(t). (a) y"+4y= e^(5t) (b)...

3. For each of the following equations find a particular solution yp(t). (a) y"+4y= e^(5t) (b) 4y"+4y'+y = 3t(e^t) (c) y"+4y'+2y=t^2 (d) y"+9y = cos(3t) +4sin(3t)

Non homogeneous eq w constant; undetermined coefficients Find the general solution: 1) y" + 4y' +...

Non homogeneous eq w constant; undetermined coefficients Find the general solution: 1) y" + 4y' + 4y = xe^−x. 2) y" + 2y' + 5y = e^2x cos x. Determine a suitable form for a particular solution z = z(x) of the given equations 1) y" + 2y' = 2x + x^2e^−3x + sin 2x. 2) y" − 5y' + 6y = 2e^2x cos x − 3xe^3x + 5. 3) y" + 5y' + 6y = 2e^2x cos x −...

(1 point) Match the following nonhomogeneous linear equations with the form of the particular solution yp...

(1 point) Match the following nonhomogeneous linear equations with the form of the particular solution yp for the method of undetermined coefficients.   ?    A    B    C    D      1. y′′+y=t(1+sint)   ?    A    B    C    D      2. y′′+4y=t2sin(2t)+(5t−7)cos(2t)   ?    A    B    C    D      3. y′′+2y′+2y=3e−t+2e−tcost+4e−tt2sint   ?    A    B    C    D      4. y′′−4y′+4y=2t2+4te2t+tsin(2t) A. yp=t(A0t2+A1t+A2)sin(2t)+t(B0t2+B1t+B2)cos(2t) B. yp=A0t2+A1t+A2+t2(B0t+B1)e2t+(C0t+C1)sin(2t)+(D0t+D1)cos(2t) C. yp=Ae−t+t(B0t2+B1t+B2)e−tcost+t(C0t2+C1t+C2)e−tsint D. yp=A0t+A1+t(B0t+B1)sint+t(C0t+C1)cost

Find the general solution to y'' - 4y' + 3y = e^t + 3t^2 - 2t...

Find the general solution to y'' - 4y' + 3y = e^t + 3t^2 - 2t + 3

Find a Particular Solution of y'''-4y'=t+3cos(t)+e-2t

Find a Particular Solution of y'''-4y'=t+3cos(t)+e-2t

Question : y'' = 4y' + 13y =0 , (y''+ 2y' + 2y)^2 = 0 ,...

Question : y'' = 4y' + 13y =0 , (y''+ 2y' + 2y)^2 = 0 , y'' - y' - 2y = cosx , y'' + 3y' + 2y = x^2 - e^2x

In Exercises 16-25, use any method to solve each nonhomogeneous equation. y'''+3y''+2y'=cos(t) Answer is apparently y=(1/10)...

In Exercises 16-25, use any method to solve each nonhomogeneous equation. y'''+3y''+2y'=cos(t) Answer is apparently y=(1/10) sin(t)-(3/10)cos(t)+c1e^(-2t)+c2e^(-t)+c3

Differential equation for y'=2y-t+g(y) that has a solution y(t)=e^(2t)

Differential equation for y'=2y-t+g(y) that has a solution y(t)=e^(2t)

solve for x(t) and y(t): x'=-3x+2y; y'=-3x+4y x(0)=0,y(0)=2

solve for x(t) and y(t): x'=-3x+2y; y'=-3x+4y x(0)=0,y(0)=2

1.Show that cos 2t, sin 2t, and e^5t are linearly independent and form a fundamental set...

1.Show that cos 2t, sin 2t, and e^5t are linearly independent and form a fundamental set of solutions for the equation: y ′′′ − 5y ′′ + 4y ′ − 20y = 0 2.Find the general solution to the equation: y ′′′ − y ′′ − 4y ′ + 4y = 0