please make sure u solve in clear steps and 100% correct 4. (21 pts) Laplace Transforms...
1) (40 pts total) Solving and order ODE using Laplace Transforms: Consider a series RLC circuit with resistor R, inductor L, and a capacitor C in series. The same current i(t) flows through R, L, and C. The voltage source v(t) is removed at t=0, but current continues to flow through the circuit for some time. We wish to find the natural response of this series RLC circuit, and find an equation for i(t). Using KVL and differentiating the equation...
Sheet1 Control 1. Solve the following differential equations using Laplace transforms. Assume zero initial conditions dx + 7x = 5 cos 21 di b. + 6 + 8x = 5 sin 31 dt + 25x = 10u(1) 2. Solve the following differential equations using Laplace transforms and the given initial conditions: de *(0) = 2 () = -3 dx +2+2x = sin21 di dx di dx di 7+2 x(0) = 2:0) = 1 ed + 4x x(0) = 1:0) =...
Q4. Laplace Transforms a) (20 points) Solve the differential equation using Laplace transform methods y" + 2y + y = t; with initial conditions y(0) = y(O) = 0 |(s+2) e-*) b) (10 points) Determine L-1 s? +S +1
Solve the system of equations with Laplace Transforms:
(differential equations)
all parts please
Solve the system of equations with Laplace Transforms: x' + y' = 1, x(0) = y(0) = x'(0) = y'(0) = 0. y" = x' Let X(s) = LT of x(t) and Y(s) = LT of y(1). First obtain expressions for X(s) and Y(s) and list them in the form ready for obtaining their inverses. a. Y(s) = X(s) = %3D b. Now obtain the inverse transforms....
Using the Laplace transform, solve the partial differential
equation.
Please with steps, thanks :)
Problem 13: Solving a PDE with the Laplace Transform Using the Laplace transform, solve the equation 山 given the initial and boundary conditions a(x, 0)=1 ifx> 0, u(0, t) -1 if t 2 0.
Problem 13: Solving a PDE with the Laplace Transform Using the Laplace transform, solve the equation 山 given the initial and boundary conditions a(x, 0)=1 ifx> 0, u(0, t) -1 if t...
Question 7: Solve the entire problem using Laplace Transforms. Recall the DE for our two-vessel water clock ах - Ax, where A dt k(0)= DE IC: -1] Let X(s) denote the Laplace transform of x(t). Then x(s) = (sl-A)-1 (0) There is no forcing term, so this is just the zero-input or homogeneous solution. Solve for X(s) and record your answer in the answer template. The first component has been given for you Question 7: The solution in the transform...
Please help me and show all the steps and please make sure it's
correct 4&6
[ 7 pts.] 4. Use an appropriate trig substitution to integrate x dx | ? -67 +5 [ 5 pts.] 6. Write L(t) as an improper integral and show all integration and evaluation steps to find this Laplace Transformation,
Laplace transfer functions and ODE?
1) Here is a differential equation. Please find the Laplace
transfer function C(s)/R(s). Note that Initial conditions are
zero.
***answer provided, please show work
ANS:
2) Here is a Laplace transfer function. Please find the
corresponding ODE.
ANS:
dct) 9, ... - 4 20rc and²c(t) , - dt2 CE) 2 dct) dr(t) . - + 20r(t) + 5 - 2- d+3 dt dt² 57년 5월 S P(s) = C(9) = 52+4 R(S) (s*+1) dic tur...
Please help solving all parts to this problem and show
steps.
(1 point) Use the Laplace transform to solve the following initial value problem: x' = 5x + 3y, y = -2x +36 x(0) = 0, y0) = 0 Let X(s) = L{x(t)}, and Ys) = L{y(t)}. Find the expressions you obtain by taking the Laplace transform of both differential equations and solving for YS) and X (s): X(S) = Y(s) = Find the partial fraction decomposition of X(s) and...
Please solve these question by clear write and font and
steps
4.) Find the amplitudes of each of the following harmonic synchronous oscillations and the phase angle between the oscillations. (20 pts) xi(t) = 3cos(20t) - 4sin(20) x:(t)= 1.5sin(20t - 1/6) - 2cos(20t) 5.) Represent the two harmonics from problem #4 in the time domain, frequency domain, using phasors and complex numbers. (20 pts) 6.) Calculate the amplitude and the phase of the oscillation that results from the composition of...