Dear Charles, yes I did compute it with all of those values, however the computation I perform with a 1KΩ gives me a current that is too high for my diode, thus I know that I need a resistor with higher resistance. I will attempt to use the online DESMO software and see what that will give me...
Homework Statement
Determining the best resistance for my simple circuit consisting of a diode, battery, and resistor. Doing this using Load- Line Analysis
Homework Equations
ID = VD - V / R - Given by KVL[/B]
(I can disregard n-pretend )
The Attempt at a Solution
[/B]
Here I have...
You are right, I have not done any circuits in a while and completely missed the fact that I have to subtract my voltage drops across the sink elements! As far as the voltage drop across the capacitor I attempted to perform something that I guess is incorrect, I thought of the capacitor as not...
Ok so far, I have that V0 cos(2π ft) + R1C dV/dt = V1 cos(2π ft + φ) . Is it correct to assume that R2 should not be considered ?
With this in mind I do know that my final relation should show me what V1/V0 is equal to.
Update:
I have that V0 cos(2π ft) + (R1 + R2) C dV/dt = V1 cos(2π ft +...
Because I need the output voltage in terms of the frequency and not time as it states, at least that's what it means to me. Doing this I am left with the a function in time not frequency...
Maybe I am just over thinking this as well
I was going to do this approach, however once I relate V0 and V1, I am still left with equations in which are of the time domain and not frequency domain
Thank you, it was originally under General Math, and someone moved it to Calculus. Its not really related to "Calculus" as you have said. I will take your suggestion for the solution, thank you!
Homework Statement
Given a sine-wave generator of frequency f having internal resistance R1 connected to a high-pass filter. If the generator shown in the dotted outlined box produces a voltage V0(t) = V0 cos(2π ft) with no load, derive an expression for the output voltage V1(t) = V1 cos(2π ft...
I am attempting to understand how I can derive a new expression as a function of another variable in this existing expression. This is a college undergraduate course but I can't recall doing this much before, maybe in high school. I have taken all the way up to ODE's and PDE's.
The confusion...