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FET Biasing

FET Biasing. Introduction. For the JFET, the relationship between input and output quantities is nonlinear due to the squared term in Shockley’s equation. Nonlinear functions results in curves as obtained for transfer characteristic of a JFET.

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FET Biasing

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  1. FET Biasing

  2. Introduction • For the JFET, the relationship between input and output quantities is nonlinear due to the squared term in Shockley’s equation. • Nonlinear functions results in curves as obtained for transfer characteristic of a JFET. • Graphical approach will be used to examine the dc analysis for FET because it is most popularly used rather than mathematical approach • The input of BJT and FET controlling variables are the current and the voltage levels respectively

  3. Introduction JFETs differ from BJTs: • Nonlinear relationship between input (VGS) and output (ID) • JFETs are voltage controlled devices, whereas BJTs are current controlled

  4. Introduction Common FET Biasing Circuits • JFET – Fixed – Bias – Self-Bias – Voltage-Divider Bias • Depletion-Type MOSFET – Self-Bias – Voltage-Divider Bias • Enhancement-Type MOSFET – Feedback Configuration – Voltage-Divider Bias

  5. General Relationships • For all FETs: • For JFETs and Depletion-Type MOSFETs: • For Enhancement-Type MOSFETs:

  6. Fixed-Bias Configuration • The configuration includes the ac levels Vi and Vo and the coupling capacitors. • The resistor is present to ensure that Vi appears at the input to the FET amplifier for the AC analysis.

  7. Fixed-Bias Configuration • For the DC analysis, • Capacitors are open circuits • and • The zero-volt drop across RG permits replacing RG by a short-circuit

  8. Fixed-Bias Configuration Investigating the input loop • IG=0A, therefore VRG=IGRG=0V • Applying KVL for the input loop, -VGG-VGS=0 VGG= -VGS • It is called fixed-bias configuration due to VGG is a fixed power supply so VGS is fixed • The resulting current,

  9. Investigating the graphical approach. • Using below tables, we can draw the graph

  10. The fixed level of VGS has been superimposed as a vertical line at • At any point on the vertical line, the level of VG is -VGG--- the level of ID must simply be determined on this vertical line. • The point where the two curves intersect is the common solution to the configuration – commonly referrers to as the quiescent or operating point. • The quiescent level of ID is determine by drawing a horizontal line from the Q-point to the vertical ID axis.

  11. Output loop

  12. Example • Determine VGSQ, IDQ, VDS, VD, VG, VS

  13. Exercise • Determine IDQ, VGSQ, VDS, VD, VG and VS

  14. Self Bias Configuration • The self-bias configuration eliminates the need for two dc supplies. • The controlling VGS is now determined by the voltage across the resistor RS

  15. For the indicated input loop: • Mathematical approach: • rearrange and solve.

  16. Graphical approach • Draw the device transfer characteristic • Draw the network load line • Use to draw straight line. • First point, • Second point, any point from ID = 0 to ID = IDSS. Choose • the quiescent point obtained at the intersection of the straight line plot and the device characteristic curve. • The quiescent value for ID and VGS can then be determined and used to find the other quantities of interest.

  17. For output loop • Apply KVL of output loop • Use ID = IS

  18. Example • Determine VGSQ, IDQ,VDS,VS,VG and VD.

  19. Example • Determine VGSQ, IDQ, VD,VG,VS and VDS.

  20. Voltage-Divider Bias • The arrangement is the same as BJT but the DC analysis is different • In BJT, IB provide link to input and output circuit, in FET VGS does the same

  21. Voltage-Divider Bias • The source VDD was separated into two equivalent sources to permit a further separation of the input and output regions of the network. • IG = 0A ,Kirchoff’s current law requires that IR1= IR2 and the series equivalent circuit appearing to the left of the figure can be used to find the level of VG.

  22. Voltage-Divider Bias • VG can be found using the voltage divider rule : • Using Kirchoff’s Law on the input loop: • Rearranging and using ID =IS: • Again the Q point needs to be established by plotting a line that intersects the transfer curve.

  23. Procedures for plotting 1. Plot the line: By plotting two points: VGS = VG, ID =0 and VGS = 0, ID = VG/RS 2. Plot the transfer curve by plotting IDSS, VP and calculated values of ID. 3. Where the line intersects the transfer curve is the Q point for the circuit.

  24. Once the quiescent values of IDQ and VGSQ are determined, the remaining network analysis can be found. • Output loop:

  25. Effect of increasing values of RS

  26. Example • Determine IDQ, VGSQ, VD, VS, VDS and VDG.

  27. Example • Determine IDQ, VGSQ, VDS, VD and VS

  28. Depletion-Type MOSFETs Depletion-type MOSFET bias circuits are similar to JFETs. The only difference is that the depletion-Type MOSFETs can operate with positive values of VGS and with ID values that exceed IDSS.

  29. Depletion-Type MOSFETs The DC Analysis • Same as the FET calculations • Plotting the transfer characteristics of the device • Plotting the at a point that VGS exceeds the 0V or more positive values • Plotting point when VGS=0VandID=0A • The intersection between Shockley characteristics and linear characteristics defined the Q-point of the MOSFET • The problem is that how long does the transfer characteristics have to be draw? • We have to analyze the input loop parameter relationship. • As RS become smaller, the linear characteristics will be in narrow slope therefore needs to consider the extend of transfer characteristics for example of voltage divider MOSFET, • The bigger values of VP the more positive values we should draw for the transfer characteristics

  30. Analyzing the MOSFET circuit for DC analysis • How to analyze dc analysis for the shown network? • It is a …. Type network • Find VG or VGS • Draw the linear characteristics • Draw the transfer characteristics • Obtain VGSQ and IDQ from the graph intersection

  31. 1. Plot line for VGS = VG, ID = 0 and ID = VG/RS, VGS = 0 2. Plot the transfer curve by plotting IDSS, VP and calculated values of ID. 3. Where the line intersects the transfer curve is the Q-point. Use the ID at the Q-point to solve for the other variables in the voltage-divider bias circuit. These are the same calculations as used by a JFET circuit.

  32. When RS change…the linear characteristics will change.. 1. Plot line for VGS = VG, ID = 0 and ID = VG/RS, VGS = 0 2. Plot the transfer curve by plotting IDSS, VP and calculated values of ID. 3. Where the line intersects the transfer curve is the Q-point. Use the ID at the Q-point to solve for the other variables in the voltage-divider bias circuit. These are the same calculations as used by a JFET circuit.

  33. Enhancement-Type MOSFET The transfer characteristic for the enhancement-type MOSFET is very different from that of a simple JFET or the depletion-typeMOSFET.

  34. Transfer characteristic for E-MOSFET and

  35. Feedback Biasing Arrangement IG =0A, therefore VRG = 0V Therefore: VDS = VGS Which makes

  36. Feedback Biasing Q-Point • 1. Plot the line using VGS = VDD, ID = 0 and ID = VDD / RD and VGS = 0 • Plot the transfer curve using VGSTh , ID = 0 and VGS(on), ID(on); all given in the • specification sheet. • 3. Where the line and the transfer curve intersect is the Q-Point. • 4. Using the value of ID at the Q-point, solve for the other variables in the bias circuit.

  37. DC analysis step for Feedback Biasing Enhancement type MOSFET • Find k using the datasheet or specification given; ex: VGS(ON),VGS(TH) • Plot transfer characteristics using the formula ID=k(VGS – VT)2. Three point already defined that is ID(ON), VGS(ON) and VGS(TH) • Plot a point that is slightly greater than VGS • Plot the linear characteristics (network bias line) • The intersection defines the Q-point

  38. Example • Determine IDQ and VDSQ for network below

  39. Voltage-Divider Biasing Again plot the line and the transfer curve to find the Q-point. Using the following equations: Input loop : Output loop :

  40. Voltage-Divider Bias Q-Point • Plot the line using VGS = VG = (R2VDD)/(R1 + R2), ID = 0 and ID = VG/RS • and VGS = 0 • 2. Find k • 3. Plot the transfer curve using VGSTh, ID = 0 and VGS(on), ID(on); all given in the specification sheet. • 4. Where the line and the transfer curve intersect is the Q-Point. • 5. Using the value of ID at the Q-point, solve for the other variables in the bias circuit.

  41. Example • Determine IDQ and VGSQ and VDS for network below

  42. - = = - - = = - ( + ) = + - = ( ) = - + - = + ( ) - = + = =

  43. - = = = = - - = - = = + = - ( ) + = - = = - = + - =

  44. Troubleshooting • N-channel VGSQ will be 0V or negative if properly checked • Level of VDS is ranging from 25%~75% of VDD. If 0V indicated, there’s problem • Check with the calculation between each terminal and ground. There must be a reading, RG will be excluded

  45. P-Channel FETs For p-channel FETs the same calculations and graphs are used, except that the voltage polarities and current directions are the opposite. The graphs will be mirrors of the n-channel graphs.

  46. Practical Applications • • Voltage-Controlled Resistor • • JFET Voltmeter • • Timer Network • • Fiber Optic Circuitry • • MOSFET Relay Driver

  47. JFET Voltmeter

  48. Advantages • High Input impedance for isolation. • Amount of power drawn from circuit under test is very small, so no loading effect. • Very high sensitivity. • Amplifier gain allows measurement in the mV range. • No damage due to overload because of amplifier saturation.

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