Construct a Simulink model of the following problem
5 xdot + sin x = f (t), x(0) = 0;
f(t) =
-5 | if ψ(t) <= -5 |
ψ(t) | if -5<=ψ(t)<=5 |
5 | if ψ(t)>=5 |
where ψ(t) = 10 sin 4t
Construct a Simulink model of the following problem 5 xdot + sin x = f (t), x(0) = 0; f(t) = -...
simulink
Problem 3: Create a Simulink model to plot the solution of the following equation for osts 3. +10x2 = 5 sin 3t x(0) = 1
Sketch the Simulink model to model: x = 3+5 *t+6/(t+1 ) y = t^2-1/(2+t) where t is the time in seconds. The outputs x, y and z needs to be displayed to a single scope.
Sketch the Simulink model to model: x = 3+5 *t+6/(t+1 ) y = t^2-1/(2+t) where t is the time in seconds. The outputs x, y and z needs to be displayed to a single scope.
Determine f(x).
f′′(x)=−cos(x)+sin(x), and
f(0)=1, f(π)=0.
Problem. f"(t) = -cos(T) + sin(), and f(0) = 1, f(1) = 0
Model and plot in Simulink the differential equation of a given system: ?̈−4?̇∗sin(?)+√?(?)∗?−3?(?)=0 with the time-dependent external input signal ?(?)=sin(2?) Build a Simulink model to: ➔ Model the given differential equation. ➔ Plot x and ?̇ arranged in subplots with one above the other (see concept graphic below) in the same scope with ?̇ on top, including a legend naming each curve and axes labels. Note: • Use an appropriate source block to model the input signal y(t) • You...
(USING MATLAB) Given two differential equations X= sin(t)(exp(cos(t))-2cos(4t)+sin(t/12)^5) And Y = cos(t)(exp(cos(t))-2cos(4t)+sin(t/12)^5) where 0<t<20pi is a vector of 5000 points created by using (linspace) command : Write script to plot X and Y with red color ?
5] Consider the following initial value problem 9utt = uzz-9r sin(t), (x,0) u(x,0' -oo < x < oo, t > 0, 0, otherwise 0, otherwise. Find the values of u(x,t) at the point x = 4, t = 3. Hint: Let u(x, t)- (x, t) + x sin(t). Write up the equation and the initial condi- tions satisfied by w. Find w(4,3) first
5] Consider the following initial value problem 9utt = uzz-9r sin(t), (x,0) u(x,0' -oo
9. Solve the wave problem: 0 < x < T, t> 0; Utt: t2 0; u(T, t) = 0, u(0, t) = 0, 0 SST. u(x,0) = sin(10r), u(x, 0) = sin(4æ) + 2 sin(6x), Answer: sin(10r) sin(10t). 10 sin(4r) cos(4t) + 2 sin(6x) cos(6t) + u(x, t) =
Let F(x) = Sý sin*(0) dt. Evaluate the following limit . Let F(x) = $* sin?(t) dt. Evaluate the following limit. 2022
5. Find a solution u(x,t) of the following problem Ute = 2uz, 0< x < 2 u(0, t) u(2, t) = 0 u(x, 0) = 0, u(x, 0) = sin Tx - 2 sin 3ra .
5. Find a solution u(x,t) of the following problem Ute = 2uz, 0
(3 + 2ry,12-3уг), 5. Find JeF . Tds, (et sin t, et cost),0 t where F(x,y) and C is given by r(t) - T.
(3 + 2ry,12-3уг), 5. Find JeF . Tds, (et sin t, et cost),0 t where F(x,y) and C is given by r(t) - T.