3.12 Transfer functions

Fundamentals of electrical Page 1 / 1

Introduction of transfer function(frequency response).

The ratio of the output and input amplitudes for [link] , known as the transfer function or the frequency response , is given by

V_{out} V_{in} H f 1 2 f R C 1

Implicit in using the transfer function is that the input is a complex exponential, and the output is also a complexexponential having the same frequency. The transfer function reveals how the circuit modifies the input amplitude in creatingthe output amplitude. Thus, the transfer function completely describes how the circuit processes the input complex exponential to produce the outputcomplex exponential. The circuit's function is thus summarized by the transfer function. In fact, circuits are often designedto meet transfer function specifications. Because transfer functions are complex-valued, frequency-dependent quantities, wecan better appreciate a circuit's function by examining the magnitude and phase of its transfer function( [link] ).

This transfer function has many important properties and provides all the insights needed to determine how the circuit functions. First of all, note that we can compute the frequency response for both positive andnegative frequencies. Recall that sinusoids consist of the sum of two complex exponentials, one having the negative frequencyof the other. We will consider how the circuit acts on a sinusoid soon. Do note that the magnitude has even symmetry : The negative frequency portion is a mirror image of the positive frequency portion: $H f H f$ . The phase has odd symmetry : $H f H f$ . These properties of this specific example apply for all transfer functions associated withcircuits. Consequently, we don't need to plot the negative frequency component; we know what it is from the positivefrequency part.

The magnitude equals $12$ of its maximum gain (1 at $f 0$ ) when $2 f R C 1$ (the two terms in the denominator of the magnitude are equal). The frequency $f_{c} 1 2 R C$ defines the boundary between two operating ranges.

For frequencies below this frequency, the circuit does not much alter the amplitude of the complex exponentialsource.
For frequencies greater than $f_{c}$ , the circuit strongly attenuates the amplitude. Thus, when the source frequency is in this range, thecircuit's output has a much smaller amplitude than that of the source.

For these reasons, this frequency is known as the cutoff frequency . In this circuit the cutoff frequency depends only on the product of the resistance and the capacitance. Thus, a cutoff frequency of 1 kHz occurs when

1 2 R C 103

R C 1032 1.59 -4

. Thus resistance-capacitance combinations of 1.59 kΩ and 100 nF or 10 Ω and 1.59 μF result in the same cutoff frequency.

The phase shift caused by the circuit at the cutoff frequencyprecisely equals $4$ . Thus, below the cutoff frequency, phase is little affected, but athigher frequencies, the phase shift caused by the circuit becomes $2$ . This phase shift corresponds to the difference between a cosine and a sine.

We can use the transfer function to find the output when theinput voltage is a sinusoid for two reasons. First of all, a sinusoid is the sum of two complex exponentials, each having afrequency equal to the negative of the other. Secondly, because the circuit is linear, superposition applies. If the source isa sine wave, we know that

v_{in} t A 2 f t A 2 2 f t 2 f t

Since the input is the sum of two complex exponentials, we know that the output is also a sum of two similar complexexponentials, the only difference being that the complex amplitude of each is multiplied by the transfer functionevaluated at each exponential's frequency.

v_{out} t A 2 H f 2 f t A 2 H f 2 f t

As noted earlier, the transfer function is most conveniently expressed in polar form:

H f H f H f

. Furthermore,

H f H f

(even symmetry of the magnitude) and

H f H f

(odd symmetry of the phase). The output voltage expressionsimplifies to

v_{out} t A 2 H f 2 f t H f A 2 H f 2 f t H f A H f 2 f t H f

The circuit's output to a sinusoidal input is also a sinusoid, having a gain equal to the magnitude of thecircuit's transfer function evaluated at the source frequency and a phase equal to the phase of the transfer function at thesource frequency . It will turn out that this input-output relation description applies to any linearcircuit having a sinusoidal source.

This input-output property is a special case of a more general result. Show that if the source can be written asthe imaginary part of a complex exponential— $v_{in} t V 2 f t$ — the output is given by $v_{out} t V H f 2 f t$ . Show that a similar result also holds for the real part.

The key notion is writing the imaginary part as the difference between a complex exponential and its complexconjugate:

V 2 f t V 2 f t V 2 f t 2

The response to

V 2 f t

V H f 2 f t

, which means the response to

V 2 f t

V H f 2 f t

. As

H f H f

, the Superposition Principle says that the output to theimaginary part is

V H f 2 f t

. The same argument holds for the real part:

V 2 f t V H f 2 f t

Got questions? Get instant answers now!

The notion of impedance arises when we assume the sources arecomplex exponentials. This assumption may seem restrictive; what would we do if the source were a unit step? When we useimpedances to find the transfer function between the source and the output variable, we can derive from it the differentialequation that relates input and output. The differential equation applies no matter what the source may be. As we have argued, it isfar simpler to use impedances to find the differential equation (because we can use series and parallel combination rules) thanany other method. In this sense, we have not lost anything by temporarily pretending the source is a complex exponential.

In fact we can also solve the differential equation usingimpedances! Thus, despite the apparent restrictiveness of impedances, assuming complex exponential sources is actuallyquite general.

Questions & Answers

how did you get 1640

Noor Reply

If auger is pair are the roots of equation x2+5x-3=0

Peter Reply

Wayne and Dennis like to ride the bike path from Riverside Park to the beach. Dennis’s speed is seven miles per hour faster than Wayne’s speed, so it takes Wayne 2 hours to ride to the beach while it takes Dennis 1.5 hours for the ride. Find the speed of both bikers.

MATTHEW Reply

420

Sharon

from theory: distance [miles] = speed [mph] × time [hours] info #1 speed_Dennis × 1.5 = speed_Wayne × 2 => speed_Wayne = 0.75 × speed_Dennis (i) info #2 speed_Dennis = speed_Wayne + 7 [mph] (ii) use (i) in (ii) => [...] speed_Dennis = 28 mph speed_Wayne = 21 mph

George

Let W be Wayne's speed in miles per hour and D be Dennis's speed in miles per hour. We know that W + 7 = D and W * 2 = D * 1.5. Substituting the first equation into the second: W * 2 = (W + 7) * 1.5 W * 2 = W * 1.5 + 7 * 1.5 0.5 * W = 7 * 1.5 W = 7 * 3 or 21 W is 21 D = W + 7 D = 21 + 7 D = 28

Salma

Devon is 32 32 years older than his son, Milan. The sum of both their ages is 54 54. Using the variables d d and m m to represent the ages of Devon and Milan, respectively, write a system of equations to describe this situation. Enter the equations below, separated by a comma.

Aaron Reply

find product (-6m+6) ( 3m²+4m-3)

SIMRAN Reply

-42m²+60m-18

Salma

what is the solution

bill

how did you arrive at this answer?

bill

-24m+3+3mÁ^2

Susan

i really want to learn

Amira

I only got 42 the rest i don't know how to solve it. Please i need help from anyone to help me improve my solving mathematics please

Amira

Hw did u arrive to this answer.

Aphelele

Bajemah

-6m(3mA²+4m-3)+6(3mA²+4m-3) =-18m²A²-24m²+18m+18mA²+24m-18 Rearrange like items -18m²A²-24m²+42m+18A²-18

Salma

complete the table of valuesfor each given equatio then graph. 1.x+2y=3

Jovelyn Reply

x=3-2y

Salma

y=x+3/2

Salma

Enock

given that (7x-5):(2+4x)=8:7find the value of x

Nandala

3x-12y=18

Kelvin

please why isn't that the 0is in ten thousand place

Grace Reply

please why is it that the 0is in the place of ten thousand

Grace

Send the example to me here and let me see

Stephen

A meditation garden is in the shape of a right triangle, with one leg 7 feet. The length of the hypotenuse is one more than the length of one of the other legs. Find the lengths of the hypotenuse and the other leg

Marry Reply

how far

Abubakar

cool u

Enock

state in which quadrant or on which axis each of the following angles given measure. in standard position would lie 89°

Abegail Reply

hello

BenJay

Method

I am eliacin, I need your help in maths

Rood

how can I help

Sir

hmm can we speak here?

Amoon

however, may I ask you some questions about Algarba?

Amoon

Enock

what the last part of the problem mean?

Roger

The Jones family took a 15 mile canoe ride down the Indian River in three hours. After lunch, the return trip back up the river took five hours. Find the rate, in mph, of the canoe in still water and the rate of the current.

cameron Reply

Shakir works at a computer store. His weekly pay will be either a fixed amount, $925, or $500 plus 12% of his total sales. How much should his total sales be for his variable pay option to exceed the fixed amount of $925.

mahnoor Reply

I'm guessing, but it's somewhere around $4335.00 I think

Lewis

12% of sales will need to exceed 925 - 500, or 425 to exceed fixed amount option. What amount of sales does that equal? 425 ÷ (12÷100) = 3541.67. So the answer is sales greater than 3541.67. Check: Sales = 3542 Commission 12%=425.04 Pay = 500 + 425.04 = 925.04. 925.04 > 925.00

Munster

difference between rational and irrational numbers

Arundhati Reply

When traveling to Great Britain, Bethany exchanged $602 US dollars into £515 British pounds. How many pounds did she receive for each US dollar?

Jakoiya Reply

how to reduced echelon form

Solomon Reply

Jazmine trained for 3 hours on Saturday. She ran 8 miles and then biked 24 miles. Her biking speed is 4 mph faster than her running speed. What is her running speed?

Zack Reply

d=r×t the equation would be 8/r+24/r+4=3 worked out

Sheirtina

Got questions? Join the online conversation and get instant answers!

Jobilize.com Reply

<< Chapter < Page Page > Chapter >>

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

Source: OpenStax, Fundamentals of electrical engineering i. OpenStax CNX. Aug 06, 2008 Download for free at http://legacy.cnx.org/content/col10040/1.9

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Fundamentals of electrical engineering i' conversation and receive update notifications?

Ask

	NCE Ch 11 Counseling Families, Diagnosis... By Anh Dao Start Quiz
	1 Timeshare 1 By Jams Kalo Start Quiz
	24 AP Key Terms 24 Metabolism Nutrition By OpenStax Start Key Terms
	4 Physiotherapy Flashcards Set 4 By Rhodes Start Flashcards
	NCE Ch 05 Theories in Counseling Helping... By Anh Dao Start Exam
	4 BOD Hemolymphatic -Dr. Han By Brooke Delaney Start Exam
	7 Sociology 07 Deviance, Crime, Social Control MCQ By OpenStax Start Quiz
	4 Microeconomics 04 Labor Financial Markets By OpenStax Start Flashcards
	Introduction to sociology 2e By OpenStax Read Online Course
	3 Sociology 03 Culture MCQ By OpenStax Start Quiz

3.12 Transfer functions

Simple circuit

Magnitude and phase of the transfer function

Questions & Answers

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!