d2x dt2 + 9x = 2 sin(3t), x(0) = 5, x'(0) = 0

Solve the given initial-value problem. d2x dt2 + 4x = −5 sin(2t) + 9 cos(2t), x(0)...

Solve the given initial-value problem. d2x dt2 + 4x = −5 sin(2t) + 9 cos(2t), x(0) = −1, x'(0) = 1

Use the Laplace transform to solve the given system of differential equations. d2x dt2 + d2y...

Use the Laplace transform to solve the given system of differential equations. d2x dt2 + d2y dt2 = t2 d2x dt2 − d2y dt2 = 3t x(0) = 8, x'(0) = 0, y(0) = 0, y'(0) = 0

Solve the given initial value problem D^2x/dt^2 + 9x = 7sin(3t), x(0)=5 x’(0)=0

Solve the given initial value problem D^2x/dt^2 + 9x = 7sin(3t), x(0)=5 x’(0)=0

Calculate the double integral. R 9x sin(x + y) dA, R = (0, pi/6) x (0,pi/3)

Calculate the double integral. R 9x sin(x + y) dA, R = (0, pi/6) x (0,pi/3)

Evaluate the limit. (If an answer does not exist, enter DNE.) lim x→0+ (9x)sin(4x)

Evaluate the limit. (If an answer does not exist, enter DNE.) lim x→0+ (9x)sin(4x)

2 d2y/dt2 + 2 dy/dt + 2y = sin(2t) in steps please

2 d2y/dt2 + 2 dy/dt + 2y = sin(2t) in steps please

Question 4.Let C be the curve in three dimensions with the following parameterization for 0≤t≤2: (sin(πt71),t2−3t+...

Question 4.Let C be the curve in three dimensions with the following parameterization for 0≤t≤2: (sin(πt71),t2−3t+ 2,t3−3t). Find the value of ∫C (cos(x+y) +ze^xz)dx+ cos(x+y)dy+ (xe^xz+ 2)dz.

Eliminate the parameter to find a Cartesian equation of the curves: a) x=3t+2,y=2t−3 b) x=21​sin(t)−3,y=2cos(t)+5

Eliminate the parameter to find a Cartesian equation of the curves: a) x=3t+2,y=2t−3 b) x=21​sin(t)−3,y=2cos(t)+5

Q.3 (Applications of Linear Second Order ODE): Consider the ‘equation of motion’ given by ODE d2x...

Q.3 (Applications of Linear Second Order ODE): Consider the ‘equation of motion’ given by ODE d2x + ω2x = F0 cos(γt) dt2 where F0 and ω ̸= γ are constants. Without worrying about those constants, answer the questions (a)–(b). (a) Show that the general solution of the given ODE is [2 pts] x(t) := xc + xp = c1 cos(ωt) + c2 sin(ωt) + (F0 / ω2 − γ2) cos(γt). (b) Find the values of c1 and c2 if the...

Solve using Annihilator method : y''+4y=sin(3t) with y(0)=0 and y'(0)=0

Solve using Annihilator method : y''+4y=sin(3t) with y(0)=0 and y'(0)=0