signal flow group presentation - copy.pptx
TRANSCRIPT
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SIGNAL FLOW GRAPH REPRESENTATION
EESHAN DEOSTHALE 111020015 PRANAY SHAH 111020012 SAMAY SHAH 111020010 DIVESH JUMANI 111020013 PRAMOD PAWAR 111020014
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OUTLINE
1. BACKGROUND2. PROPERTIES3. TERMINOLOGIES4. METHODS TO OBTAIN SFG5. BLOCK DIAGRAM AND SFG
COMPARISON6. MASON’S GAIN FORMULA7. EXAMPLES
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BACKGROUND1. Alternative method to presenting set of equations describing
system developed by S.J.Mason2. The graphical representation of the variables of a set of linear
algebraic equations representing the system is called signal flow graph representation.
3. Consider exampleV=IR
I R V4. Each node represents a separate variable.5. Lines joining nodes are branches.6. Branches are always unidirectional.7. The arrow in the branch denotes the direction of the signal
flow.
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PROPERTIES1. Applicable to only to linear time invariant system.2. Signal flows along the branches along
arrowheads.3. Signal gets multiplied by Branch Gain.4. Value represented by node is algebraic sum of
all signals entering at node.5. Value represented by each node is available to
all branches leaving node.6. Signal flow graph is not unique property of
system.
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TERMINOLOGY• An input node or source contain only the outgoing branches. i.e., X1
• An output node or sink contain only the incoming branches. i.e., X4
• A path is a continuous, unidirectional succession of branches along which
no node is passed more than ones. i.e.,
• A forward path is a path from the input node to the output node. i.e.,
X1 to X2 to X3 to X4 , and X1 to X2 to X4 , are forward paths.
• A feedback path or feedback loop is a path which originates and terminates
on the same node. i.e.; X2 to X3 and back to X2 is a feedback path
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A self-loop is a feedback loop consisting of a single branch. i.e.; A33 is a
self loop.
The gain of a branch is the transmission function of that branch.
The path gain is the product of branch gains encountered in traversing a
path. i.e. the gain of forwards path X1 to X2 to X3 to X4 is A21A32A43
The loop gain is the product of the branch gains of the loop. i.e., the
loop gain of the feedback loop from X2 to X3 and back to X2 is A32A23.
Two loops, paths, or loop and a path are said to be non-touching if they have no nodes in common.
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a) Input node.b) Output node.c) Forward paths.d) Feedback paths (loops).e) Determine the loop gains of the feedback loops.f) Determine the path gains of the forward paths.g) Non-touching loops
CONSIDER THE SIGNAL FLOW GRAPH BELOW AND IDENTIFY THE FOLLOWING
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There are two forward path gains:
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There are four loops:
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Nontouching loop gains:
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METHODS TO OBTAIN SFG
Two methods to obtain SFG: 1. From given system equations 2. From block diagram
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FROM SYSTEM EQUATIONS1. Represent each variable by separate
node.2. Use property that that the value of
variable represented by a node is the algebraic sum of all signals entering at that node.
3. Represent coefficients of variables in equations as branch gains.
4. Show input output variables separately.
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FROM SYSTEM EQUATIONS
34
203
312
2101
hxxgxfxxexdxx
cxbxaxx
b
x4x3x2x1x0
f
e
d
c
a g h
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FROM BLOCK DIAGRAM1. Name all the summing points and take off
points in the block diagram.2. Represent each take off point and summing
point by separate node in SFG.3. Connect by branches indicating block
transfer functions as gains of corresponding branches.
4. Show input and output nodes separately.
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G1G4G3
FROM BLOCK DIAGRAM
--
-C(s)R(s)
G1 G2
H2
H1
G4G3
H3
E(s) X1
X2
X3
R(s) C(s)
- H2
- H1
- H3
X1 X2 X3E(s)1 G2
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COMPARISON BETWEEN BLOCK DIAGRAM AND SFG
BLOCK DIAGRAM SIGNAL FLOW GRAPH Basic importance is given to the
elements & their transfer functions.
Each element is represented by a block.
T.F. is shown inside corresponding block.
Summing and take off points are separate.
Basic importance is given to the variables of the system.
Each variable is represented by a node.
T.F. is shown along branches connecting the nodes.
Summing & take off points are absent. A node can have any number of incoming & outgoing branches.
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BLOCK DIAGRAM SIGNAL FLOW GRAPH
Feedback path is from o/p to i/p.
Block diagram reduction rules can be used to obtain the T.F.
Concept of self loop does not exist.
Applicable only to linear time invariant systems.
Various feedback loops are considered
The Mason’s gain formula can be used directly get resultant T.F.
Self loops can exist.
Applicable to linear time invariant systems.
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MASON’S GAIN FORMULA• The block diagram reduction technique requires successive
application of fundamental relationships in order to arrive at
the system transfer function.
• On the other hand, Mason’s rule for reducing a signal-flow
graph to a single transfer function requires the application of
one formula.
• The formula was derived by S. J. Mason when he related the
signal-flow graph to the simultaneous equations that can be
written from the graph.
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Mason’s Rule:• The transfer function, C(s)/R(s), of a system represented by a signal-
flow graph is;
Where
n = number of forward paths.TK= the K th forward-path gain.∆ = Determinant of the system∆K = Determinant of the Kth forward path
• ∆ is called the signal flow graph determinant or characteristic function.
Δ
ΔT
R(s)C(s)
n
1K
KK
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Mason’s Rule:
∆ = 1- (sum of all individual loop gains) + (sum of the products of the gains of all possible two loops that do not touch each other) – (sum of the products of the gains of all possible three loops that do not touch each other) + … and so forth with sums of higher number of non-touching loop gains
∆K = value of Δ for the part of the block diagram that does not touch the K-th forward path (ΔK = 1 if there are no non-touching loops to the K-th path.)
n
K
KKT
sRsC 1
)()(
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Systematic approach
1. Calculate forward path gain Pk for each forward path k.
2. Calculate all loop transfer functions3. Consider non-touching loops 2 at a time4. Consider non-touching loops 3 at a time5. Calculate Δ from steps 2,3,4.6. Calculate Δk as portion of Δ not touching
forward path k
21
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2211 PPRCTherefore,
24313242121411 HGGGLHGGGLHGGL ,,
There are three feedback loops
EXAMPLE
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∆ = 1- (sum of all individual loop gains)
There are no non-touching loops, therefore
3211 LLL
243124211411 HGGGHGGGHGG
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∆1 = 1- (sum of all individual loop gains)+...
Eliminate forward path-1
∆1 = 1
∆2 = 1- (sum of all individual loop gains)+...
Eliminate forward path-2
∆2 = 1
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x 2s y 3
-4
z 2
-3
s
-5
uw 1
Y=(2s)x-(4)z-(5)uZ= (3)y-(3)wW=(2)zU=(1)w+(s)z
OBTAIN BLOCK DIAGRAM FROM SFG
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2sYX
4
5
From z
From u
Y=(2s)x-(4)z-(5)u
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Z= (3)y-(3)w
W=(2)z
3
3
z
From w
y
2z w
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U=(1)w+(s)z
w
sFrom z
u
+
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2s 3 2x
y z w u
5
3
s4
+
ANSWER:
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THANK YOU