USE MASONS RULE (MASONS LOOP GAIN) METHOD TO REDUCE TO EQUIVALENT TRANSFER FUNCTION
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USE MASONS RULE (MASONS LOOP GAIN) METHOD TO REDUCE TO
EQUIVALENT TRANSFER FUNCTION
G1 C(s) G6...
Find the closed-loop transfer function, T(s)-C(s)/R(s) for the following systems using block diagram reduction R(s)+ G1...
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....
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
Reduce the block diagram shown to a single transfer function, T(s) C(s)/R(s) Gl (s) G2(s) G3(s)...
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)
Find the flow graph G8 C(s) R(S) GI G5 G6 G2 G4 G7 G3
Find the flow graph
G8 C(s) R(S) GI G5 G6 G2 G4 G7 G3
Q4. (a) Reduce the block diagram shown in Figure Q4a to a single mathematical expression suitable for implementation in MATLAB. Each letter represents a transfer function in the s-domain. (...
Q4. (a) Reduce the block diagram shown in Figure Q4a to a single mathematical expression suitable for implementation in MATLAB. Each letter represents a transfer function in the s-domain. (10) G1 G2 G3 G4 G5 G6 Figure Q4a (b) Describe the process of generating the Nyquist plot. (c) Discuss how you would investigate the stability of a control system using the Nyquist plot and gain and phase margins of stability. (7) Q4 Total Marks [25] educe the block diagram shown...
Find the transfer function Y(s)/R(s) in the given SFG. Use fx to input your answer. H2...
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...
s G1 = G2 = S-8 G2 s2+1 G3= G4 = R(s) C(s) S G1 G3...
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.
Control Systems 3. Y(s) Derive the transfer function G(s) = rule. U(S) of the following system...
Control Systems
3. Y(s) Derive the transfer function G(s) = rule. U(S) of the following system using Mason's gain (18 marks) G9 G Gs Gi G2 G3 G4 GS G6 UO юү Hi H2 H3
Ex. 192. Refer to the system in Fig. 192 Determine the closed loop transfer function C/R...
Ex. 192. Refer to the system in Fig. 192
Determine the closed loop transfer function C/R = (As+B)/(s+D) where
G1=41, G2=1/(s+30), G3=17. Determine A,B,D. ans:3
Figure 192 G1 - G2 --) R (s) C(s) BLOCK DIAGRAM R 1 G1 G2 C SIGNAL-FLOW GRAPH -G3
PLEASE HELP WITH THE FOLLOWING R CODE! I NEED HELP WITH PART C AND D, provided...
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)...
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
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)
Find the flow graph
G8 C(s) R(S) GI G5 G6 G2 G4 G7 G3
Q4. (a) Reduce the block diagram shown in Figure Q4a to a single mathematical expression suitable for implementation in MATLAB. Each letter represents a transfer function in the s-domain. (10) G1 G2 G3 G4 G5 G6 Figure Q4a (b) Describe the process of generating the Nyquist plot. (c) Discuss how you would investigate the stability of a control system using the Nyquist plot and gain and phase margins of stability. (7) Q4 Total Marks [25] educe the block diagram shown...
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...
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.
Control Systems
3. Y(s) Derive the transfer function G(s) = rule. U(S) of the following system using Mason's gain (18 marks) G9 G Gs Gi G2 G3 G4 GS G6 UO юү Hi H2 H3
Ex. 192. Refer to the system in Fig. 192
Determine the closed loop transfer function C/R = (As+B)/(s+D) where
G1=41, G2=1/(s+30), G3=17. Determine A,B,D. ans:3
Figure 192 G1 - G2 --) R (s) C(s) BLOCK DIAGRAM R 1 G1 G2 C SIGNAL-FLOW GRAPH -G3
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)...
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