please show steps and explain..... plot z(t)= -1/2y(2-t), y(t) is a triangular pulse
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please show steps and explain..... plot z(t)= -1/2y(2-t), y(t) is a triangular pulse
please show all steps , thank you 6. Consider the initial value problem y" + 2y' + 2y = (t – 7); y(0) = 0, y'(0) = 1. a. Find the solution to the initial value problem. (10 points) b. Sketch a plot of the solution for t E (0,37]. (5 points) c. Describe the behavior of the solution. How is this system damped? (5 points)
please explain steps in multisim Using Multisim, plot V. by applying the triangular waveform in (a) to the input of the circuit in (b). I 2 3 4 "(ms) (a) 20 ks 2 0.01 uF O + 10 HI
{Please plot y(t) by matlab} y" -2y' + 10y=0 y(0)=1, y'(0)=0
Please show all steps. Thanks! Problem C.10 Plot the function y = -2e-0.5tU(t – 2).
Let T є L(C3) be defined by T(r, y, z)-(y-2-2c, z-2-2y,1-2y-22). (a) Is span((1,1,1)) invariant under T? (b) Is U = { ( (c) Is U = {(x, y, z) : x + y + z = 0} invariant under T? (d) Is λ 2 an eigenvalue of T? Is T-21 injective? (e) Find all eigenvectors of T associated to the eigenvalue λ =-3. 4. r, y,r-y) : x, y E C} invariant under T?
Find the Fourier Transform of the triangular pulse _(1 + t for -1<t < 0 x(t) = (1 - t for 0 <t<1
1a) If z=f(x,y), with x=e^t, y= t^2+3t+2, upsidedown delta f=(2xy^2-y, 2x^2y-x) find z’(t) at t=0 b) parametrize surface (y-2)^2+(z-3)^2=4 Please answer asap for thumbs up, thanks
Problem 1 (4 points) Let h(t) be the triangular pulse shown in the Figure and let x(t) be the impulse train given with h(t) -1 2T-T T 27 Determine and sketch y(t)- x(t) * h(t) for the following values of T ·T=2 3 2
Al. Let T1(x, y, z) = (1-y+z, 2:0 – y + 2z, 2y + 2). (a). Is T1 one-to-one? (b). Is T onto?
Please explain steps: 1) Draw the circuit for the function f (x, y, z) -y +x z using only NAND gates