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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 1 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Bruce Mayer, PE Registered Electrical & Mechanical Engineer BMayer@ChabotCollege.edu Engineering 43 2nd Order RLC Circuits
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 2 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Cap & Ind Physics Summary Under Steady-State (DC) Conditions Caps act as OPEN Circuits Inds act as SHORT Circuits Under Transient (time-varying) Conditions Cap VOLTAGE can NOT Change Instantly –Resists Changes in Voltage Across it Ind CURRENT can NOT change Instantly –Resists Changes in Curring Thru it
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 3 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis ReCall RLC VI Relationships ResistorCapacitor Inductor
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 4 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Transient Response The VI Relations can be Combined with KCL and/or KVL to solve for the Transient (time- varying) Response of RL, RC, and RLC circuits Kirchoff’s Current Law The sum of all Currents entering any Circuit-Node is equal to Zero Kirchoff’s Voltage Law The sum of all the Voltage- Drops around any Closed Circuit-Loop is equal to Zero
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 5 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Second Order Circuits Single Node-Pair By KCL By KVL Single Loop Differentiating
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 6 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Second Order Circuits Single Node-Pair By KCL Obtained By KVL Obtained Single Loop Make CoEfficient of 2 nd Order Term = 1 1∙(2 nd Order Term)
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 7 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis ODE for i L (t) in SNP Single-Node Ckt By KCL Note That Use Ohm & Cap Laws Recall v-i Relation for Inductors Sub Out v L in above
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 8 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis ODE Derivation Alternative Take Derivative and ReArrange Make CoEff of 2 nd Order Term = 1
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 9 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Single LOOP Ckt Importantly Thus the KVL eqn Cleaning Up
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 10 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Illustration Write The Differential Eqn for v(t) & i(t) Respectively The Forcing Function Parallel RLC Model In This Case So The Forcing Function Series RLC Model In This Case So
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 11 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis 2 nd Order Response Equation Need Solutions to the 2 nd Order ODE As Before The Solution Should to this Linear Eqn Takes This form If the Forcing Fcn is a Constant, A, Then Discern a Particular Soln Verify x p Where x p Particular Solution x c Complementary Solution For Any const Forcing Fcn, f(t) = A
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 12 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis The Complementary Solution The Complementary Solution Satisfies the HOMOGENOUS Eqn Nomenclature α Damping Coefficient Damping Ratio 0 Undamped (or Resonant) Frequency Need x c So That the “0 th ”, 1 st & 2 nd Derivatives Have the same form so they will CANCEL in the Homogeneous Eqn Look for Solution of the form ReWrite in Std form Where a 1 2α = 2 0 a 2 0 2
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 13 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Complementary Solution cont Sub Assumed Solution (x = Ke st ) into the Homogenous Eqn A value for “s” That SATISFIES the CHARACTERISTIC Eqn ensures that Ke st is a SOLUTION to the Homogeneous Eqn Units Analysis Canceling Ke st The Above is Called the Characteristic Equation
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 14 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Complementary Solution cont.2 Recall Homog. Eqn. Short Example: Given Homogenous Eqn Determine Characteristic Eqn Damping Ratio, Natural frequency, 0 Given Homog. Eqn Discern Units after Canceling Amps Coefficient of 2 nd Order Term MUST be 1
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 15 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Complementary Solution cont.3 Example Cont. Before Moving On, Verify that Ke st is a Solution To The Homogenous Eqn Then K=0 is the TRIVIAL Solution We need More
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 16 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Complementary Solution cont.4 If Ke st is a Solution Then Need Solve By Completing the Square The Solution for s Generates 3 Cases 1. >1 2. <1 3. =1
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 17 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Aside: Completing the Square Start with: ReArrange: Add Zero → 0 = y−y: ReArrange: Grouping The First Group is a PERFECT Square ReWriting:
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 18 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Initial Conditions Summarize the TOTAL solution for f(t) = const, A Find K 1 and K 2 From INITIAL CONDITIONS x(0) AND (this is important) [dx/dt] t=0 ; e.g.; Two Eqns in Two Unknowns Must Somehow find a NUMBER for
![ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 18 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Initial Conditions Summarize the TOTAL solution for f(t) = const, A Find K 1 and K 2 From INITIAL CONDITIONS x(0) AND (this is important) [dx/dt] t=0 ; e.g.; Two Eqns in Two Unknowns Must Somehow find a NUMBER for](http://images.slideplayer.com/22/6379622/slides/slide_18.jpg "ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 18 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Initial Conditions Summarize the TOTAL solution for f(t) = const, A Find K 1 and K 2 From INITIAL CONDITIONS x(0) AND (this is important) [dx/dt] t=0 ; e.g.; Two Eqns in Two Unknowns Must Somehow find a NUMBER for")
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 19 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Case 1: >1 → OVERdamped The Damped Natural Frequencies, s 1 and s 2, are REAL and UNequal The Natural Response Described by the Relation The TOTAL Natural Response is thus a Decaying Exponential plus a Constant
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 20 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Case 2: <1 → UNDERdamped Then The UnderDamped UnForced (Natural) Response Equation Where n Damped natural Oscillation Frequency α Damping Coefficient
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 21 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis UnderDamped Eqn Development Start w/ Soln to Homogeneous Eqn From Appendix-A; The Euler Identity Since K 1 & K 2 are Arbitrary Constants, Replace with NEW Arbitrary Constants Then Sub A 1 & A 2 to Obtain
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 22 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis UnderDamped IC’s Find Under Damped Constants A 1 & A 2 Given “Zero Order” IC With x p = D (const) then at t=0 for total solution Now dx/dt at any t For 1 st -Order IC Arrive at Two Eqns in Two Unknowns But MUST have a Number for X 1
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 23 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Case 3: =1 →CRITICALLY damped The Natural Response is a Decaying Exponential against The the Equation of a LINE Find Constants from Initial Conditions and TOTAL response The Damped Natural Frequencies, s 1 and s 2, are REAL and EQUAL The Natural Response Described by Relation EXERCISE VERIFY that the Above IS a solution to the Homogenous Equation
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 24 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Example: Case Analyses Recast To Std Form Characteristic Eqn Determine The General Form Of The Solution Factor The Char. Eqn Real, Equal Roots → Critically Damped (C3) Then The Undamped Frequency and Damping Ratio
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 25 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Example: Case Analyses cont. Then the Solution The Roots are Complex and Unequal → an Underdamped (Case 2) System Find the Damped Parameters For Char. Eqn Complete the Square
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 26 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis UnderDamped Parallel RLC Exmpl Find Damping Ratio and Undamped Natural Frequency given R =1 Ω L = 2 H C = 2 F The Homogeneous Eqn from KCL (1-node Pair) Or, In Std From Recognize Parameters
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 27 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Parallel RLC Example cont Then: Damping Factor, Damped Frequency Then The Response Equation If: v(0)=10 V, and dv(0)/dt = 0 V/S, Then Find: Plot on Next Slide
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 28 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 29 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Determine Constants Using ICs Standardized form of the ODE Including the FORCING FCN “A” Case-1 → OverDamped Case-2 → UnderDamped Case-3 → Crit. Damping
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 30 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis KEY to 2 nd Order → [dx/dt] t=0+ Most Confusion in 2 nd Order Ckts comes in the from of the First-Derivative IC If x = i L, Then Find v L MUST Find at t=0 + v L or i C Note that THESE Quantities CAN Change Instantaneously i C (but NOT v C ) v L (but NOT i L ) If x = v C, Then Find i C
![ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 30 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis KEY to 2 nd Order → [dx/dt] t=0+ Most Confusion in 2 nd Order Ckts comes in the from of the First-Derivative IC If x = i L, Then Find v L MUST Find at t=0 + v L or i C Note that THESE Quantities CAN Change Instantaneously i C (but NOT v C ) v L (but NOT i L ) If x = v C, Then Find i C](http://images.slideplayer.com/22/6379622/slides/slide_30.jpg "ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 30 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis KEY to 2 nd Order → [dx/dt] t=0+ Most Confusion in 2 nd Order Ckts comes in the from of the First-Derivative IC If x = i L, Then Find v L MUST Find at t=0 + v L or i C Note that THESE Quantities CAN Change Instantaneously i C (but NOT v C ) v L (but NOT i L ) If x = v C, Then Find i C")
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 31 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis [dx/dt] t=0+ [dx/dt] t=0+ → Find i C (0 + ) i C (0 + ) & v L (0 + ) If this is needed Then Find a CAP and determine the Current through it If this is needed Then Find an IND and determine the Voltage through it
![ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 31 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis [dx/dt] t=0+ [dx/dt] t=0+ → Find i C (0 + ) i C (0 + ) & v L (0 + ) If this is needed Then Find a CAP and determine the Current through it If this is needed Then Find an IND and determine the Voltage through it](http://images.slideplayer.com/22/6379622/slides/slide_31.jpg "ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 31 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis [dx/dt] t=0+ [dx/dt] t=0+ → Find i C (0 + ) i C (0 + ) & v L (0 + ) If this is needed Then Find a CAP and determine the Current through it If this is needed Then Find an IND and determine the Voltage through it")
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 32 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis WhiteBoard → Find v O (t)
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 33 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 34 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 35 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 36 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 37 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 38 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 39 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Numerical Example For The Given 2 nd Order Ckt Find for t>0 i o (t), v o (t) From Ckt Diagram Recognize by Ohm’s Law KVL at t>0 The Char Eqn & Roots Taking d(KVL)/dt → ODE The Solution Model KVL
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 40 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Numerical Example cont Steady State for t<0 The Analysis at t = 0+ Then Find The Constants from ICs Then di 0 /dt by v L = Ldi L /dt Solving for K 1 and K 2 KVL at t=0+ (v c (0+) = 0)
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 41 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Numerical Example cont.2 Return to the ODE Yields Char. Eqn Roots Write Soln for i 0 And Recall i o & v o reln So Finally
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 42 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis General Ckt Solution Strategy Apply KCL or KVL depending on Nature of ckt (single: node-pair? loop?) Convert between V I using Ohm’s LawCap LawInd Law Solve Resulting Ckt Analytical-Model using Any & All MATH Methods
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 43 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis 2 nd Order ODE SuperSUMMARY-1 Find ANY Particular Solution to the ODE, x p (often a CONSTANT) Homogenize ODE → set RHS = 0 Assume x c = Ke st ; Sub into ODE Find Characteristic Eqn for x c a 2 nd order Polynomial Differentiating
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 44 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis 2 nd Order ODE SuperSUMMARY-2 Find Roots to Char Eqn Using Quadratic Formula (or Sq-Completion) Examine Nature of Roots to Reveal form of the Eqn for the Complementary Solution: Real & Unequal Roots → x c = Decaying Constants Real & Equal Roots → x c = Decaying Line Complex Roots → x c = Decaying Sinusoid
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 45 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis 2 nd Order ODE SuperSUMMARY-3 Then the TOTAL Solution: x = x c + x p All TOTAL Solutions for x(t) include 2 UnKnown Constants Use the Two INITIAL Conditions to generate two Eqns for the 2 unknowns Solve for the 2 Unknowns to Complete the Solution Process
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 46 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis All Done for Today 2 nd Order IC is Critical!
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 47 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Complete the Square -1 Consider the General 2 nd Order Polynomial a.k.a; the Quadratic Eqn Where a, b, c are CONSTANTS Solve This Eqn for x by Completing the Square First; isolate the Terms involving x Next, Divide by “a” to give the second order term the coefficient of 1 Now add to both Sides of the eqn a “quadratic supplement” of (b/2a) 2
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 48 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Complete the Square -2 Now the Left-Hand-Side (LHS) is a PERFECT Square Solve for x; but first let Use the Perfect Sq Expression Finally Find the Roots of the Quadratic Eqn
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 49 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Derive Quadratic Eqn -1 Start with the PERFECT SQUARE Expression Take the Square Root of Both Sides Combine Terms inside the Radical over a Common Denom
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 50 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Derive Quadratic Eqn -2 Note that Denom is, itself, a PERFECT SQ Next, Isolate x But this the Renowned QUADRATIC FORMULA Note That it was DERIVED by COMPLETING the SQUARE Now Combine over Common Denom
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BMayer@ChabotCollege.edu ENGR-43_Lec-04b_2nd_Order_Ckts.pptx 51 Bruce Mayer, PE Engineering-43: Engineering Circuit Analysis Complete the Square
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