Use Millmans's theorem for nonideal voltage sources. E=(E1/Z1 + E2/Z2)/(1/Z1 + 1/Z2), Z= 1/(1/Z1 + 1/Z2) (parallel combination). Electronics Engineers' Handbook, First Edition Copyright 1975, McGraw-Hill, Donald G. Fink, Editor-in-Chief, Section 3-69, P. 3-59.

To me it looks straightforward: Vt=V1*R2//R3/(R1+R2//R3)+ V2*R1//R3/(R2+R1//R3), Rt=R1//R2//R3. Using example 1, you get Vt=5V, Rt=10k. Using example 2, you get Vt=7.5V, Rt=50k. Using example 3, you get Vt=5V, Rt=50k. In this last example V2= 0V is virtually just a short, so you are calculating a simple voltage divider. As I see the result as obvious, I have tried ex1 in PSPICE, just to ensure there are no tricks involved. I am a lecturer in electronics, and I know the worst thing we can do to our students at an examination is to put a simple question with a simple answer--like this--because the students will often waste lots of time to find the "correct, difficult solution"--it can't be so obviously easy, there must be something hidden, they think.

1) i1=i3=1/6 A, i2=0 A, vt=v2=5 V. Thevenin EQ: v = 5V, R = 30 Ohms, i = 1/6A. 2) v = 5V, i =1/40A, R = 200 Ohms. 3) v = 10V, i = 1/20A, R = 200 Ohms.

The Thevenin circuit consists of a voltage source in series with a resistor. The Resistor is = to the parallel combination of all three resistors (R1||R2||R3). The Voltage source is the sum of two voltages (using superposition): V1 * R3||R2/(R1 + R3||R2) + V2 * R3||R1/(R2 + R3||R1). Send my prize to: daverutkowski@yahoo.com.

The solution does not really depend on the resistor value--the fact that the resistors are equal (or that one is +Inf. in cases 2 and 3) is enough. Vt=(V1R2+V2R1)/(R1+R2+(R1R2/R3)). When R1=R2=R3, Vt = (V1+V2)/3; when R1=R2, and R3=+Inf, the formula is Vt= (V1+V2)/2. For the Norton question, the Ieq=V1/R1+V2/R2, and the Req=R1||R2||R3...

Vt=(V1/R1 + V2/R2)*(R1||R2||R3). This yields for 1: Vt=5v, Rt=10K. 2: Vt=7.5v, Rt=50K. 3: Vt=5v, Rt=50K.

The answer to this was so easy it took me all of about 3 minutes to get the solution. Vth = (R1R3V2 + R2R3V1)/[R1R2 + R1R3 + R2R3], Rth = R1||R2||R3. To get the Norton Equivalent, just do a source transformation.