ECEN 301Discussion #11 – Dynamic Circuits1 DateDayClass No. TitleChaptersHW Due date Lab Due date Exam 8 OctWed11Dynamic Circuits4.2 – 4.4 9 OctThu 10.

Slides:

Advertisements

Similar presentations

Therefore… What a Difference The Resurrection Makes!

Advertisements

Sinusoidal Waves. Objective of Lecture Discuss the characteristics of a sinusoidal wave. Define the mathematical relationship between the period, frequency,

Lesson 17 Intro to AC & Sinusoidal Waveforms

1Co 15:21 For since death is through man, the resurrection of the dead also is through Man. 1Co 15:22 For as in Adam all die, even so in Christ all will.

King Jesus will return soon for all who trust in Him!

Studies in 1 Corinthians (57) We Shall All Be Changed 1 Cor. 15:50-58.

ECEN 301Discussion #14 – AC Circuit Analysis1 DateDayClass No. TitleChaptersHW Due date Lab Due date Exam 20 OctMon14AC Circuit Analysis4.5 NO LAB 21 OctTue.

Announcements Assignment 0 solutions posted Assignment 1 due on Thursday DC circuit Lab reports due to Sajan today and tomorrow This week’s lab – AC circuits.

STEADY STATE AC CIRCUIT ANALYSIS

Announcements Be reading Chapters 1 and 2 from the book

Chapter 6(a) Sinusoidal Steady-State Analysis

Fundamentals of Electric Circuits Chapter 11

ECE 1100: Introduction to Electrical and Computer Engineering Notes 23 Power in AC Circuits and RMS Spring 2008 David R. Jackson Professor, ECE Dept.

Chapter 4 Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.

AC Circuits (Chapt 33) circuits in which the currents vary in time

Chapter 9 Sinusoidal Steady-State Analysis

Chapter 36 Viewgraphs AC Circuits. Most currents and voltages vary in time. The presence of circuit elements like capacitors and inductors complicates.

AC electric circuits 1.More difficult than DC circuits 2. Much more difficult than DC circuits 3. You can do it!

Chapter 7. First and second order transient circuits

Lecture 1 Signals in the Time and Frequency Domains

ELECTRICAL CIRCUIT ET 201 Define and explain characteristics of sinusoidal wave, phase relationships and phase shifting.

1 AC Electricity. Time variation of a DC voltage or current 2 I V Current Voltage time t.

ECEN 301Discussion #11 – Dynamic Circuits1 Lecture 11 – Dynamic Circuits Time-Dependent Sources.

EE2010 Fundamentals of Electric Circuits Lecture 13 Sinusoidal sources and the concept of phasor in circuit analysis.

Fundamentals of Electric Circuits Chapter 9

1 THE RISEN LORD Text: Luke 24: Luke 24:1-9 Now upon the first day of the week, very early in the morning, they came unto the sepulchre, bringing.

ELE130 Electrical Engineering 1 Week 5 Module 3 AC (Alternating Current) Circuits.

First Corinthians Sinners YET Saints

ECEN 301Discussion #8 – Network Analysis1 DateDayClass No. TitleChaptersHW Due date Lab Due date Exam 29 SeptMon8Network Analysis3.4 – 3.5 NO LAB 30 SepTue.

INC 112 Basic Circuit Analysis Week 7 Introduction to AC Current.

A popular saying in our culture… “The only things certain in life are death and taxes.” To this “list” we add a third “certainty”…

Questions About Heaven Where is heaven? How many heavens are there? 1.One 2.Two 3.Three 4.Seven What happens to you immediately when you die? 1.Transported.

A Matter Of Believing Hope: What’s Next?. A Matter Of Believing Jeremiah 29:11 1Thessalonians 4 Matthew 24 Revelation 19.

The Great resurrection

The Resurrection Day What can we expect on that great day? “Do not marvel at this; for the hour is coming in which all who are in the graves will hear.

Chapter 9 Sinusoids and Phasor

The Last Leg The Ups and Downs of Circuits Chapter 31.

Fundamentals of Electric Circuits Chapter 9 Copyright © The McGraw-Hill Companies, Inc. Permission required for reproduction or display.

The Ups and Downs of Circuits The End is Near! Quiz – Nov 18 th – Material since last quiz. (Induction) Exam #3 – Nov 23 rd – WEDNESDAY LAST CLASS –

ECEN 301Discussion #10 – Energy Storage1 DateDayClass No. TitleChaptersHW Due date Lab Due date Exam 6 OctMon10Energy Storage3.7, 4.1NO LAB 7 OctTue NO.

Admin: Assignment 6 is posted. Due Monday. Thevenin hint – the current source appears to be shared between meshes…. Until you remove the load... Assignments.

Chapter 15 AC Fundamentals.

 Voltage can be produced such that, over time, it follows the shape of a sine wave  The magnitude of the voltage continually changes.  Polarity may.

Dept of Aeronautical Enggineering S.M.M. Rahman MIST Direct Current Limitations: Transmission Loss No Amplification Power Distribution Lim.

Fundamentals of Electric Circuits Chapter 9

1 ELECTRICAL TECHNOLOGY EET 103/4  Define and explain sine wave, frequency, amplitude, phase angle, complex number  Define, analyze and calculate impedance,

Chapter 13 – Sinusoidal Alternating Waveforms Lecture 12 by Moeen Ghiyas 23/11/

COVERAGE TOPICS 1. AC Fundamentals AC sinusoids AC response (reactance, impedance) Phasors and complex numbers 2. AC Analysis RL, RC, RLC circuit analysis.

Alternating-Current Circuits Physics Alternating current is commonly used everyday in homes and businesses throughout the word to power various.

1 Corinthians 15 Ronnie Norman. 1 Corinthians But Christ has indeed been raised from the dead, the firstfruits of those who have fallen asleep.

AC SINUSOIDS Lecture 6 (I). SCOPE Explain the difference between AC and DC Express angular measure in both degrees and radians. Compute the peak, peak-peak,

Changed In only a moment, in the twinkling of an eye, at the sound of the trumpet, we will see Him come we will see Him come.

BASIC INSTRUMENTS - oscilloscopes

1/14 The Trumpet Shall Sound 1 The Trumpet Shall Sound (I Corinthians 15:51-52,52-54)

“I Believe In The Resurrection of the Body And the Life Everlasting” 1 Corinthians 15:42-58.

Announcements Midterm Exam next Friday In class, ~1 hr. Closed book, one page of notes Bring a calculator (not phone, computer, iPad, etc.) Practice problems.

1 AC Circuit Theory. 2 Sinusoidal AC Voltage Waveform: The path traced by a quantity, such as voltage, plotted as a function of some variable such as.

Sermon RESURRECTION BENEFITS Matthew 28:1-8; 1 Cor 15 Introduction.

Lesson 14: Introduction to AC and Sinusoids

SYLLABUS AC Fundamentals AC Analysis AC power Three phase circuit

COVERAGE TOPICS AC Fundamentals AC Analysis AC power

Sinusoidal Functions, Complex Numbers, and Phasors

The Resurrection & You.

Sinusoidal Waveform Phasor Method.

Alexander-Sadiku Fundamentals of Electric Circuits

Earthy v heavenly Two kinds of bodies

Mechatronics Engineering

Physics 312: Electronics (1) Lecture 7 AC Current I Fundamentals of Electronics Circuits (with CD-ROH) By: Charles Alexander, Hathew Sadika, McGraw Hill.

Presentation transcript:

ECEN 301Discussion #11 – Dynamic Circuits1 DateDayClass No. TitleChaptersHW Due date Lab Due date Exam 8 OctWed11Dynamic Circuits4.2 – OctThu 10 OctFri Recitation HW 5 11 OctSat 12 OctSun 13 OctMon12Exam 1 Review LAB 4 EXAM 1 14 OctTue 15 OctWed13AC Circuit Analysis4.5 Schedule…

ECEN 301Discussion #11 – Dynamic Circuits2 Change 1 Corinthians 15: Behold, I shew you a mystery; We shall not all sleep, but we shall all be changed, 52 In a moment, in the twinkling of an eye, at the last trump: for the trumpet shall sound, and the dead shall be raised incorruptible, and we shall be changed. 53 For this corruptible must put on incorruption, and this mortal must put on immortality. 54 So when this corruptible shall have put on incorruption, and this mortal shall have put on immortality, then shall be brought to pass the saying that is written, Death is swallowed up in victory. 55 O death, where is thy sting? O grave, where is thy victory? 56 The sting of death is sin; and the strength of sin is the law. 57 But thanks be to God, which giveth us the victory through our Lord Jesus Christ.

ECEN 301Discussion #11 – Dynamic Circuits3 Lecture 11 – Dynamic Circuits Time-Dependent Sources

ECEN 301Discussion #11 – Dynamic Circuits4 Time Dependent Sources uPeriodic signals: repeating patterns that appear frequently in practical applications ÙA periodic signal x(t) satisfies the equation:

ECEN 301Discussion #11 – Dynamic Circuits5 Time Dependent Sources uSinusoidal signal: a periodic waveform satisfying the following equation: A – amplitude ω – radian frequency φ – phase A -A T φ/ωφ/ω

ECEN 301Discussion #11 – Dynamic Circuits6 Sinusoidal Sources uHelpful identities:

ECEN 301Discussion #11 – Dynamic Circuits7 Sinusoidal Sources uWhy sinusoidal sources? Sinusoidal AC is the fundamental current type supplied to homes throughout the world by way of power grids Current war: late 1880’s AC (Westinghouse and Tesla) competed with DC (Edison) for the electric power grid standard Low frequency AC ( Hz) can be more dangerous than DC Alternating fluctuations can cause the heart to lose coordination (death) High frequency DC can be more dangerous than AC causes muscles to lock in position – preventing victim from releasing conductor DC has serious limitations DC cannot be transmitted over long distances (greater than 1 mile) without serious power losses DC cannot be easily changed to higher or lower voltages

ECEN 301Discussion #11 – Dynamic Circuits8 Measuring Signal Strength uMethods of quantifying the strength of time- varying electric signals: ÙAverage (DC) value Mean voltage (or current) over a period of time ÙRoot-mean-square (RMS) value Takes into account the fluctuations of the signal about its average value

ECEN 301Discussion #11 – Dynamic Circuits9 Measuring Signal Strength uTime – averaged signal strength: integrate signal x(t) over a period (T) of time

ECEN 301Discussion #11 – Dynamic Circuits10 Measuring Signal Strength uExample1: compute the average value of the signal – x(t) = 10cos(100t)

ECEN 301Discussion #11 – Dynamic Circuits11 Measuring Signal Strength uExample1: compute the average value of the signal – x(t) = 10cos(100t)

ECEN 301Discussion #11 – Dynamic Circuits12 Measuring Signal Strength uExample1: compute the average value of the signal – x(t) = 10cos(100t) NB: in general, for any sinusoidal signal

ECEN 301Discussion #11 – Dynamic Circuits13 Measuring Signal Strength uRoot–mean–square (RMS): since a zero average signal strength is not useful, often the RMS value is used instead ÙThe RMS value of a signal x(t) is defined as: NB: the rms value is simply the square root of the average (mean) after being squared – hence: root – mean – square NB: oftennotation is used instead of

ECEN 301Discussion #11 – Dynamic Circuits14 Measuring Signal Strength uExample2: Compute the rms value of the sinusoidal current i(t) = I cos(ωt)

ECEN 301Discussion #11 – Dynamic Circuits15 Measuring Signal Strength uExample2: Compute the rms value of the sinusoidal current i(t) = I cos(ωt) Integrating a sinusoidal waveform over 2 periods equals zero

ECEN 301Discussion #11 – Dynamic Circuits16 Measuring Signal Strength uExample2: Compute the rms value of the sinusoidal current i(t) = I cos(ωt) The RMS value of any sinusoid signal is always equal to times the peak value (regardless of amplitude or frequency)

ECEN 301Discussion #11 – Dynamic Circuits17 Network Analysis with Capacitors and Inductors (Dynamic Circuits) Differential Equations

ECEN 301Discussion #11 – Dynamic Circuits18 Dynamic Circuit Network Analysis Kirchoff’s law’s (KCL and KVL) still apply, but they will now produce differential equations. + R – iRiR +C–+C– iCiC v s (t) +–+– ~

ECEN 301Discussion #11 – Dynamic Circuits19 Dynamic Circuit Network Analysis Kirchoff’s law’s (KCL and KVL) still apply, but they will now produce differential equations. + R – iRiR +C–+C– iCiC v s (t) +–+– ~

ECEN 301Discussion #11 – Dynamic Circuits20 Dynamic Circuit Network Analysis Kirchoff’s law’s (KCL and KVL) still apply, but they will now produce differential equations. + R – iRiR +C–+C– iCiC v s (t) +–+– ~

ECEN 301Discussion #11 – Dynamic Circuits21 Sinusoidal Source Responses uConsider the AC source producing the voltage: v s (t) = Vcos(ωt) + R – iRiR +C–+C– iCiC v s (t) +–+– ~ The solution to this diff EQ will be a sinusoid:

ECEN 301Discussion #11 – Dynamic Circuits22 Sinusoidal Source Responses uConsider the AC source producing the voltage: v s (t) = Vcos(ωt) + R – iRiR +C–+C– iCiC v s (t) +–+– ~ Substitute the solution form into the diff EQ:

ECEN 301Discussion #11 – Dynamic Circuits23 Sinusoidal Source Responses uConsider the AC source producing the voltage: v s (t) = Vcos(ωt) + R – iRiR +C–+C– iCiC v s (t) +–+– ~ For this equation to hold, both the sin(ωt) and cos(ωt) coefficients must be zero

ECEN 301Discussion #11 – Dynamic Circuits24 Sinusoidal Source Responses uConsider the AC source producing the voltage: v s (t) = Vcos(ωt) + R – iRiR +C–+C– iCiC v s (t) +–+– ~ Solving these equations for A and B gives:

ECEN 301Discussion #11 – Dynamic Circuits25 Sinusoidal Source Responses uConsider the AC source producing the voltage: v s (t) = Vcos(ωt) + R – iRiR +C–+C– iCiC v s (t) +–+– ~ Writing the solution for v C (t): NB: This is the solution for a single-order diff EQ (i.e. with only one capacitor)

ECEN 301Discussion #11 – Dynamic Circuits26 Sinusoidal Source Responses v c (t) has the same frequency, but different amplitude and different phase than v s (t) v s (t) v c (t) What happens when R or C is small?

ECEN 301Discussion #11 – Dynamic Circuits27 Sinusoidal Source Responses In a circuit with an AC source: all branch voltages and currents are also sinusoids with the same frequency as the source. The amplitudes of the branch voltages and currents are scaled versions of the source amplitude (i.e. not as large as the source) and the branch voltages and currents may be shifted in phase with respect to the source. + R – iRiR +C–+C– iCiC v s (t) +–+– ~ 3 parameters that uniquely identify a sinusoid: frequency amplitude phase