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Find the closed-loop transfer function, T(s)-C(s)/R(s) for the following systems using block diagram reduction R(s)+ G1 G2 G8 C(s) G2 G4 G7 G3 G1 G2 G3 G4. C(s) R(s)+ G5 G6 G7
Use Mason's rule to find the transfer function of the signal-flow diagram shown in Figure below. Knowing that: G1=7 G2=1/s G3=2 G4=1/s G5=-5 G6=1/s G7=-4 G8=5 G9=2 G10=9 G11=6 G12=3 H1=-4 H2=-2 H3=2 H4=-3 H5=-6 H6=1 G9 G10 G8 G11 R(s) G: G2 G3 G4 G5 G6 Y(s) 5 HI H2 H3 Ha Hs G12 HG
USE MASONS RULE (MASONS LOOP GAIN) METHOD TO REDUCE TO EQUIVALENT TRANSFER FUNCTION G1 C(s) G6 R(s) + G5 G2 + G3 G4 G7 FIGURE P5.9
Reduce the block diagram shown to a single transfer function, T(s) C(s)/R(s) Gl (s) G2(s) G3(s) G4(s) C(s) G6(s) G7(s)
G1 = (A’+C’+D) (B’+A) (A+C’+D’) G2 = (ABC’) + (A’BC) + (ABD) G3 = (A+C) (A+D) (A’+B+0) G4 = (G1) (A+C) G5 = (G1) (G2) G6 = (G1) (G2) Determine the simplest product-of-sums (POS) expressions for G1 and G2. Determine the simplest sum-of-products (SOP) expressions for G3 and G4. Find the maxterm list forms of G1 and G2 using the product-of-sums expressions. Find the minterm list forms of G3 and G4 using the sum-of-products expression. Find the minterm list forms...
Hz(s) + R(s) Gi(s) G2(s) G3(s) G4(s) C(s) Hi(s) Consider the system described by the block diagram above. a. Find the transfer function of the system by reducing the diagram. b. Draw a signal-flow diagram for the given system. c. Using Mason's rule find the transfer function of the system. d. Compare your answers to part (a) and part (c). What do you notice? Explain.
s G1 = G2 = S-8 G2 s2+1 G3= G4 = R(s) C(s) S G1 G3 G4 H1 H2 si 28+3 H1 H2 a) Find the characteristic equation by subtracting the transfer function (C (s) / R (s)) of the system, whose block diagram is given above. b) Determine the stability of the given system with Routh-Hurwitz stability analysis method.
Derive the transfer function, vo/vi(s), in terms of G1, G2, G3, G4, G5 where Gį = 1/Zį. Z2 N Via Z1 Z3 ο νο a. Derive the transfer function, vo/vi(s), if Z1 = R1, Z2 = R2,23 = R3 (i.e., resistors) and 24 = 1/sC1,25 = 1/sC2 (i.e., capacitors). b. Using Excel/Matlab/Python, etc., to draw the Bode plot of the magnitude using the following design values: R1=180k22, R2=180k12, R3=100522, C1=100nF, C2=25nF. c. What are the values of w, and Q?
Find the transfer function Y(s)/R(s) in the given SFG. Use fx to input your answer. H2 Н. L L2 G2 G3 G4 R(S) Gs GS G6 G7 Y(S) L3 L4 Ho H7 Using SFG, find the transfer function C(s)/R(s). Use fx to input your answer here. R(S) C(s) X x G1 H1 H2 Find the transfer function C/R for the given SFG. Use fx to input your answer. G1 X1 G2 X2 R С -H Reduce into a single transfer...
PLEASE HELP WITH THE FOLLOWING R CODE! I NEED HELP WITH PART C AND D, provided is part a and b!!!! a) chiNum <- c() for (i in 1:1000) { g1 <- rnorm(20,10,4) g2 <- rnorm(20,10,4) g3 <- rnorm(20,10,4) g4 <- rnorm(20,10,4) g5 <- rnorm(20,10,4) g6 <- rnorm(20,10,4) mse <- (var(g1)+var(g2)+var(g3)+var(g4)+var(g5)+var(g6))/6 M <- (mean(g1)+mean(g2)+mean(g3)+mean(g4)+mean(g5)+mean(g6))/6 msb <- ((((mean(g1)-M)^2)+((mean(g2)-M)^2)+((mean(g3)-M)^2)+((mean(g4)-M)^2)+((mean(g5)-M)^2)+((mean(g6)-M)^2))/5)*20 chiNum[i] <- msb/mse } # plot a histogram of F statistics h <- hist(chiNum,plot=FALSE) ylim <- (range(0, 0.8)) x <- seq(0,6,0.01) hist(chiNum,freq=FALSE, ylim=ylim)...