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Agenda and Notes Today, during class! 9:30 a.m. Boeing Space and Intelligence Systems (Matt and Matt) 4 extra credit assignments available at the bottom of http://hibp.ecse.rpi.edu/~connor/educat ion/EILinks.html Friday, Oct. 3 (EMPAC!), Open shop 2:00-5:00 p.m Electronic Instrumentation Experiment 4 (continued) Part A. Op Amp Basics Review Part B. Adder and Differential Op Amp Part C. Op Amp Limitations What is an op amp? An inexpensive, versatile, integrated circuit that is another basic building block to electronics (made of resistors and transistors) Amplifier that has • Large open loop gain (intrinsic) • Differential input stage, inverting input (-) and non-inverting input (+) • One output • Uses components in the feedback network to control the relationship between the input and output What does an Op-Amp do? Performs “operations” on an input signal • • • • Amplification Buffering Integration/Differentiation Addition/Subtraction Open Loop/Closed Loop and Feedback Open loop • Very high gain (intrinsic gain) • Poor stability • Open loop gain assumed to be infinite for ideal op amps Closed loop • Uses feedback to add stability • Reduces gain of the amplifier • Output is applied back into the inverting (-) input • Most amplifiers are used in this configuration Feedback Open loop Vout Vin Σ + gain Golden Rules of Op-Amp Analysis Rule 1: VA = VB • The output attempts to do whatever is necessary to make the voltage difference between the inputs zero. • The op-amp “looks” at its input terminals and swings its output terminal around so that the external feedback network brings the input differential to zero. Rule 2: IA = IB = 0 • The inputs draw no current • The inputs are connected to what is essentially an open circuit Steps in Analyzing Op-Amp Circuits 1) Remove the op-amp from the circuit and draw two circuits (one for the + and one for the – input terminals of the op amp). 2) Write equations for the two circuits. 3) Simplify the equations using the rules for op amp analysis and solve for Vout/Vin Why can the op-amp be removed from the circuit? • There is no input current, so the connections at the inputs are open circuits. • The output acts like a new source. We can replace it by a source with a voltage equal to Vout. The Inverting Amplifier Vout Rf Rin Vin A Rf Rin The Non-Inverting Amplifier Rf Vout 1 R g Rf A 1 Rg Vin The Voltage Follower High input impedance Low output impedance Buffer circuit Vout A 1 Vin Ideal Differentiator Time domain (like oscilloscope) Vout dVin R f Cin dt Amplitude changes by a factor of RfCin analysis : Zf Rf Vout j R f Cin 1 Vin Z in j Cin Frequency domain (like AC sweep) Comparison of ideal and non-ideal Both differentiate in sloped region. Both curves are idealized, real output is less well behaved. A real differentiator works at frequencies below c=1/RinCin Ideal Integrator Time domain (like oscilloscope) Vout 1 Vindt ( VDC ) RinC f What happens to a capacitor at DC? analysis : Zf Vout Vin Z in 1 j C f Rin Amplitude changes by a factor of 1/RinCf 1 j RinC f Frequency domain (like AC sweep) Miller (non-ideal) Integrator If we add a resistor to the feedback path, we get a device that behaves better, but does not integrate at all frequencies. Comparison of ideal and non-ideal Both integrate in sloped region. Both curves are idealized, real output is less well behaved. A real integrator works at frequencies above c=1/RfCf Comparison original signal Differentiaion v(t)=Asin(t) Integration v(t)=Asin(t) mathematically dv(t)/dt = Acos(t) v(t)dt = -(A/cos(t) mathematical phase shift mathematical amplitude change H(j electronic phase shift electronic amplitude change +90 (sine to cosine) -90 (sine to –cosine) 1/ H(jjRC -90 (-j) H(jjRC = j/RC +90 (+j) RC RC The op amp circuit will invert the signal and multiply the mathematical amplitude by RC (differentiator) or 1/RC (integrator) In Class Problem 1. Which op amp below has a gain of +5? a) 2. b) Op amp Analysis 1. 2. 3. What are the golden rules for op amp analysis? For the circuit to the right draw two circuits (one for – input and one for + input) Write the equation for each circuit c) In Class Problem 1. Which op amp below has a gain of +5? All of them! Topology may look different but the functionality is the same! 2. Op amp Analysis 1. 2. 3. What are the golden rules for op amp analysis? For the circuit to the right draw two circuits (one for – input and one for + input) Write the equation for each circuit Z3 + V Z2Z3 V 2 V1V V V out Z1 Zf -- -- Op Amps to know Inverting Non-inverting Voltage Follower Differentiator Integrator Adder Differential (Subtracting) Adders Output signal is the sum of the input signals (V1 and V2). V1 V2 Vout R f R1 R2 Rf Vout if R1 R2 then V1 V2 R1 Weighted Adders Unlike differential amplifiers, adders are also useful when R1 ≠ R2. This is called a “Weighted Adder” A weighted adder allows you to combine several different signals with a different gain on each input. You can use weighted adders to build audio mixers and digital-to-analog converters. Analysis of weighted adder I1 If I2 I f I1 I 2 V1 VA I1 R1 V2 VA I2 R2 VA Vout V1 VA V2 VA Rf R1 R2 Vout V1 V2 Rf R1 R2 Vout VA Vout If Rf VA VB 0 V1 V2 R f R1 R2 Differential (or Difference) Amplifier Vout Rf (V2 V1 ) Rin A Rf Rin Analysis of Difference Amplifier(1) 1) : : Analysis of Difference Amplifier(2) 2) : i V1 VB VB Vout Rin Rf : VA Rf Rin R f Note that step 2(-) here is very much like step 2(-) for the inverting amplifier and step 2(+) uses a voltage divider. V2 V1 Vout Rin R f 3) solve for VB : VB 1 1 Rin R f VA VB : Rf Rin R f Rf Vout V2 V1 Rin V2 Rf R f Rin R f V1 RinVout VB Rin R f R f Rin VB Rf R f Rin V1 Rin R f V1 Rin Vout R f Rin R f V2 R f V1 RinVout Rin Vout R f Rin Op-Amp Limitations Model of a Real Op-Amp Saturation Current Limitations Slew Rate Internal Model of a Real Op-amp +V V2 Zin Vin = V1 - V2 V1 Zout + AolVin Vout + - -V • Zin is the input impedance (very large ≈ 2 MΩ) • Zout is the output impedance (very small ≈ 75 Ω) • Aol is the open-loop gain Saturation Even with feedback, • any time the output tries to go above V+ the op-amp will saturate positive. • Any time the output tries to go below V- the op-amp will saturate negative. Ideally, the saturation points for an op-amp are equal to the power voltages, in reality they are 1-2 volts less. V Vout V Ideal: -9V < Vout < +9V Real: -8V < Vout < +8V Additional Limitations Current Limits If the load on the op-amp is very small, • • • • Most of the current goes through the load Less current goes through the feedback path Op-amp cannot supply current fast enough Circuit operation starts to degrade Slew Rate • The op-amp has internal current limits and internal capacitance. • There is a maximum rate that the internal capacitance can charge, this results in a maximum rate of change of the output voltage. • This is called the slew rate. Analog Computers (circa. 1970) Analog computers use op-amp circuits to do real-time mathematical operations (solve differential equations). Using an Analog Computer Users would hard wire adders, differentiators, etc. using the internal circuits in the computer to perform whatever task they wanted in real time. Analog vs. Digital Computers In the 60’s and 70’s analog and digital computers competed. Analog • Advantage: real time • Disadvantage: hard wired Digital • Advantage: more flexible, could program jobs • Disadvantage: slower Digital wins • they got faster • they became multi-user • they got even more flexible and could do more than just math Now analog computers live in museums with old digital computers: Mind Machine Web Museum: http://userwww.sfsu.edu/%7Ehl/mmm.html Analog Computer Museum: http://dcoward.best.vwh.net/analog/index.html