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Transcript
ABTU-EEE EEE 307-Analog Electronics EXPERIMENT 3. SINGLE TUNED AMPLIFIERS Introduction In this laboratory, characteristics of single tuned amplifiers will be examined. In this type of amplifiers, one parallel tuned circuit is used as a load. They have several limitations such as small bandwidth, small gain bandwidth product, and do not provide flatten response. On the other hand, their alignment is more straightforward than double tuned amplifiers. Theory Many communications system requirements exceed the high-frequency limits of op-amps. In cases such as these, tuned amplifiers are often used. The basic principle underlying the design of tuned amplifiers is the use of a parallel RLC (tank) circuit as the load, or at the input of a BJT or FET amplifier. Single tuned amplifier investigated in this experiment is a small signal voltage amplifier. The basic principle of single tuned amplifiers is illustrated using a BJT with tunedcircuit loads in Figure 1. Figure 1: A Basic BJT single tuned amplifier A single tuned amplifier is usually consists of an amplifier and a tuning stages. In the first stage, the input is amplified. The amplified signal may contain different frequency components. The tuning stage is transparent to the components which has frequencies falling in the passband of the circuit. For example, if the tuning circuit is tuned to Ο0, only the frequency component at Ο0 is reflected to the output while the others are rejected. Consider an ideal tuning circuit shown in Figure 2. ABTU-EEE EEE 307-Analog Electronics Figure 2: Ideal tuning stage If the input is π₯(π‘) = 7 cos(2π0 π‘) + 5πππ (π0 π‘) + 13πππ (7π0 π‘) Then the output is π¦(π‘) = 5π΄ cos(π0 π‘), where A is a constant depending on the component values of the tuning stage. In a single tuned amplifier, tuning stage is a simple narrowband resonant circuit, such as the one given in Figure 3. Figure 3: Parallel RLC (Tank) circuit Let Vo(s) and I(s) denote the Laplace Transforms of Vo(t) and i(t), respectively. The transfer function H(s) can be written as π π π½π (π) π πͺ π―(π) = = = π π π π π°(π) + + ππͺ ππ + π+ πΉ ππ³ πΉπͺ π³πͺ π π πͺ = (π β ππ )(π β ππ ) where ABTU-EEE EEE 307-Analog Electronics ππ,π = βπ ππΉπͺ β β( π π π ) β ππΉπͺ π³πͺ s1 and s2 are the poles of the transfer function. Zeros of the transfer function are at the origin and at infinity. Following conventional notations are used for H(s): πΌ= π0 = 1 2π πΆ 1 βπΏπΆ π½ = βπ02 β πΌ 2 π 1,2 = βπΌ β βπΌ 2 β π02 Depending on the values of πΌ and π0 the two poles may be either real or a complex conjugate pair. If π0 > πΌ or π > π0 πΏ/2 then the poles will be complex conjugate and can be written as: π 1,2 = βπΌ β πβπ02 β πΌ 2 The distance of the poles to the origin is π0 . If πΌ is increased (R is decreased) the poles move into the left half plane along the semicircular trajectory of radius w0 until they meet on the real axis for πΌ = π0 . Figure 4: The position of the poles in complex plane Sinusoidal steady state response for the tank circuit is obtained by inserting s=jw in H(s): ABTU-EEE EEE 307-Analog Electronics β1 ππ ππ πΆ π»(ππ) = 2 = 2 2 (ππ) + ππ + π0 πΆ(π0 β π 2 ) + π2πΌπ |π»(ππ)| = π πΆβ4πΌ 2 π 2 + (π02 β π 2 ) β π»(ππ) = π 2πΌπ β π‘ππβ1 2 2 π0 β π 2 π0 is the frequency at which the imaginary part of H(jw) is zero and hence it is real. At frequency π0 , H(jw)=R as seen in Figure 5. Figure 5: Amplitude of the impedance of capacitor and inductor, and the amplitude of the transfer function Figure 6: Phase of the transfer function The frequencies π1 and π2 are the Half Power or 3 dB cut-off frequencies. The real power dissipated by the tank circuit at π1 and at π2 is the half of that for π = π0 . Solving Eq. 1 for π1 and π2 π1 β π2 = 2πΌ π1 π2 = π02 ABTU-EEE EEE 307-Analog Electronics The tank circuit is frequency selective and this behavior can be seen in Figure 5. An ideal tank circuit passes only the frequency components in the interval [π1, π2 ]. The sharper the characteristics, the better the attenuation of unwanted frequency components. The quality factor (Q) determines how good a tnak circuit is. π= ππππ‘ππ πππππ’ππππ¦ π = 3 ππ΅ πππππ€πππ‘β 2πΌ In practice, inductors and capacitors used in tank circuits have some losses. These losses are represented as a series resistance for inductors and a parallel resistance for the capacitors. Capacitor leakage may be neglected but the series loss resistance of inductors has an equivalent parallel resistance around the resonant frequency π0 and it should be taken into account, as given in Figure 7. Figure 7: LC circuit with loss resistance The unloaded Q of the inductor is defined as: π= π0 π0 πΏ πΏ = = 2πΌ π π0 ππΆ If QL >10 then around π0 , the circuit in Figure 7a can be replaced by the equivalent model in Figure 7b. π π = ππΏ2 π = 1 πΏ = (π0 ππΆ)2 ππΆ Overall quality factor of the tank circuit when loaded with a parallel resistor RL is: ππ = π0 = π0 π ππ πΆ 2πΌ where π ππ = π π //π πΏ Consider the following single tuned amplifier configuration given in Figure 8. We want to obtain AC and DC load line equations of this configuration. To obtain DC load line equation short circuit the inductor and open circuit the capacitors. Then ππΆπΈ = ππΆπΆ β πΌπΆ (π πΈ + π) ABTU-EEE EEE 307-Analog Electronics Figure 8: Tuned amplifier To find AC load line, find the equivalent parallel resistance RP of the inductor, short circuit CS, CL, CE and assume L and C are in resonance. Put the small signal model of the transistor into the amplifier configuration (Figure 9). Figure 9: Small signal model AC load line: πΌπΆ = (πΌπΆπ + ππΆπΈπ ππΆπΈ )β π ππ π ππ where π ππ = π π //π πΏ Obviously, slope of DC load line is -1/(RE+r) while that of AC load line is -1/Rac. In general, Rac>>RE+r, which means AC load line intersects the VCE axis at a voltage larger than VCC (Figure 10). ABTU-EEE EEE 307-Analog Electronics Figure 10: DC and AC load lines Preliminary work 1. Each of the students is tested before starting experiment by research assistant. This test may be written or oral examination. Theoretical knowledge of the experiment that should be gotten from experimental sheet and other sources (lecture notes, books etc.). The theoretical information about experiment is not limited to study only experimental sheet, students have to research other sources to get enough knowledge. 2. Students should know the purpose of the experiment. They should know how the experiment can be done and which measuring elements can be used. They should also get measuring elements catalog information. 3. In the following, there are two video recordings about the use of oscilloscope with Agilent Vee. https://drive.google.com/open?id=0B24exSh3SWAqNm9XS2NnSE92bFU https://drive.google.com/open?id=0B24exSh3SWAqQm9wMng5eFdIZVE Each student have to watch these videos (If necessary several times) and take some necessary notes for working properly with agilent vee oscilloscope. PLEASE NOTE THAT: During the lab, there WONβT be an introductory section about how to work with agilent vee and oscilloscope. 4. The response y(t) of a linear time invariant system with a transfer function h(t) to a sinusoidal input x(t) is given as π₯(π‘) = π΄πππ (π0 π‘) ABTU-EEE EEE 307-Analog Electronics π¦(π‘) = π΄|π»(ππ0 )|πππ (π0 π‘ + β π»(ππ0 )) Find the response of the same system to the following inputs a. π₯(π‘) = π΄πππ (π1 π‘) + π΅πππ (π2 π‘) b. π₯(π‘) = ββ π=0 ππ πππ (ππ0 π‘) c. Discuss what would be observed at the output if the above system were a tank circuit with center frequency π0 and high Q, and the input is a square wave of frequency π0 5. Find the Norton equivalent of the voltage source and 100 kβ¦ resistor and find the equivalent parallel resistance of the circuit given below (Figure 11). Simulate the circuit given in Figure 11, plot the magnitude-frequency response and phase-frequency response of the tank circuit on the scale for requencies from f 0-5 kHz up to f0+5 kHz in 100 Hz steps by assuming that the impedance of the loaded tank circuit is much smaller than the parallel resistor of the Norton current source. Find f 0, Q, and the bandwidth. Comment on the results. Figure 11: Tuned circuit 6. For the circuit given in Figure 12 a. Calculate ICQ, VCQ, and VCEQ. Draw the DC load line. b. Draw the small signal model. Draw the AC load line. c. Calculate π0 , f0, QT, and bandwidth. d. Find the gain of the circuit at the resonant frequency, and calculate V o(t) for Vin(t)=0.001cos(π0 t). ABTU-EEE EEE 307-Analog Electronics Figure 12: Tuned amplifier Experiment 1. Construct the circuit of Figure 11. Set the input to 200 mV peak-to-peak. a. Find the center frequency f0 b. Find and plot magnitude- and phase-frequency responses in steps of 100 Hz beginning from f0-5 kHz up to f0+5 kHz by using VEE program you designed in the preliminary work. 2. Construct the circuit given in Figure 12 with a BD 135 transistor. Measure ICQ, VCQ, and VCEQ. Apply a sine wave of 200 mV peak-to-peak and then change the input level to have a maximum output peak-to-peak swing at the center frequency. a. Calculate the magnitude-frequency response. b. Calculate half-power frequencies and the values of the magnitude-frequency response at these frequencies. c. Plot the magnitude- and phase-frequency responses using the VEE program you designed. To plot β H(jw) you should use the oscillioscope. Both of the signals should be seen clearly at the screen of the scope (there should be no clipping). The program will measure the phase difference between the two signals. Compare the values calculated in a and b with the values you observed from the plot. 3. Using the same circuit as in the previous step, a. Apply a square wave at resonance frequency to the input. You should observe a signal very close to a sine wave. Why? Adjust the input level such that the ABTU-EEE EEE 307-Analog Electronics output has a maximum peak to peak swing. Observe the emitter and collector voltages. a. Decrease the square wave at resonance frequency towards f0/2 and see how the output voltage waveform changes. Adjust the input frequency around f 0/2 to obtain the maximum undistorted swing at the output. Observe the emitter and collector voltages. Comment on what you have observed. SINGLE TUNED AMPLIFIERS NAMES: 1. 2. SECTION: 1. f0= Comment: ABTU-EEE EEE 307-Analog Electronics 2. ICQ= VCQ= a) |H(jw0)|= b) |H(jw1)|= ang H(jw1) c) Comment: |H(jw2)|= ang H(jw2) VCEQ= ABTU-EEE 3. a) b) Comment: EEE 307-Analog Electronics
