CIRCUIT ANALYSIS 2. Design a second order high pass filter with a passband gain of 20...
Design a second-order high pass active filter with a cutoff frequency of 1Hz and a passband gain of 10. Show all calculations and provide a schematic of your design.
Design a second-order Butterworth low-pass filter to satisfy the specifications a. The dc gain is unity (zero dB); b. The gain is no smaller than -1 dB for frequencies between 0 and 2,000 Hz; and c. The gain is no larger than -40 dB for frequencies larger than 40 kHz. Determine a circuit realization as a series RLC low-pass filter. Pick reasonable values of R, L, and C. Design a second-order Butterworth low-pass filter to satisfy the specifications a. The...
For the low-pass filter circuit shown in Fig 2 3k Ω 200mil in out Fig 2 3.a. Use a 2.2nF capacitor to design a high-pass filter to have a cutoff frequency of Skn Draw a schematic of your design. Show all component values and voltages c. Sketch the frequency response of the voltage gain and phase shift Magnitude dB Frequency Hz Phase Frequency Hz For the low-pass filter circuit shown in Fig 2 3k Ω 200mil in out Fig 2...
(a) Design a first–order high-pass filter with a cutoff frequency fc = 1.5 kHz and a passband gain |Ao| = 20dB, using a capacitor C = 47nF. Include a compensation resistor and determine its value. (b) Sketch the frequency response for the circuit (i.e., magnitude vs. frequency and phase vs. frequency). On the magnitude response plot, indicate the cutoff frequency, bandpass gain, and bandstop rolloff slope. On the phase response plot, indicate the approximate value of the phase angle at...
Design a second-order Butterworth low-pass filter with a DC gain of 0 dB and a -3 dB frequency of 5.24 kHz. (include circuit design w/ component values)
Design a low pass filter with a cutoff frequency of 1 kHz +/- 100 Hz and a gain of 16.0 dB +/- 1.0 dB in the passband. The R2 and C components of the filter control the cutoff frequency, and are inversely proportional to the cutoff frequency. So decreasing the resistance or capacitance will increase the cutoff frequency. The R1 and Rf components determine the gain of the amplifier. Increasing the value of Rf will increase the gain. Increasing the...
Design a first order high-pass Butterworth filter that achieves the following specifications: Cutoff frequency = 770 Hz Stop-band corner frequency = 132 Hz dB slope = 20dB / decade Gain at 132 Hz ≈ -14.9 dB Show working for all determined values of R and C
200 HZ. 6.25) Design a cascading LC low-pass filter with maxi- mally flat magnitude response. Use a passband of 0 to 5 kHz with 5 kHz cutoff frequency and filter to attenuate all frequencies at and above 10 kHz by at least 30 dB. Use R R1 = 50 2 200 HZ. 6.25) Design a cascading LC low-pass filter with maxi- mally flat magnitude response. Use a passband of 0 to 5 kHz with 5 kHz cutoff frequency and filter...
A. Design a low-pass filter (op-amp based cascade design) that meets the following (30) requirements 1. Cutoff frequency: 3.4 KHz 2. Passband gain: 20 dB 3. Stopband gain: -40 dB/decade 4. All resistors must be 1.0 k2 or higher. You have completed the design and implementation of the LP filter and are ready to deliver the filter for production. However, you are informed that the customer made a mistake and actually needed a stopb you have used in your design)....
please show all steps and matlab plot , 5) Design a one-pole, one-zero passive filter to have a low-frequency gain of -32 dB, a high-frequency gain of 0 dB, and a cutoff frequency of 2,000 Hz. Specify the circuit and all component values. Use Matlab to plot the magnitude and phase frequency response for your filter. 5) Design a one-pole, one-zero passive filter to have a low-frequency gain of -32 dB, a high-frequency gain of 0 dB, and a cutoff...