Community Tip - Need to share some code when posting a question or reply? Make sure to use the "Insert code sample" menu option. Learn more! X
Hello,
The problem is as following:
Find currents through R3 and R1 and voltages of R2, R1 and C1 in below circuit:
when:
a)
b)
Do you REALLY mean this:
Or is mW to be megohms?
Its ok as in yellow. Not megohms.
Isn't there a switch right after the generator? Or, since it is not there, should we consider the circuit for an indeterminate time in such conditions, i.e. in the state in which the transient was completed?
In principle no, we should not consider that transient was completed. You can try doing so If you want, but that will be not the complete solution.
What do you define as 'the voltage of R1'?
Anyway, with V2 the voltage across R2 and V3 the voltage across C1, we get:
gives:
so:
Now:
so:
And we find the time functions with:
Enter component values and plot:
When R1=200 mOhm:
For case b:
Following the same procedure as for case a:
And with R1=200 mOhm:
Success!
Luc
Now, lets say that someone wants to express voltage across R2 to be function of voltage across C1 and current through L1/R3. Could give the desired equation for this?
Using laplace we get same results by using IR3(s) and also by using VC1(s).
But you want to express vR2(t) to be the function of vC1(t) and iR3(t). So the rest part of s regions of above are used to evaluate their time functions. They are include delta(t) function, therefore, some techniques are used evaluate the combolution integrals.
Finally, we get the same results for all equations.
Second one is using digital convolution by * . At first digitize all signals of time domain. Also needs some treatment to the delta(t) function.
Finally, also get same results. So, this is the answers of your questions.
The network analysis (first case only) can also be done on the basis of the theory of network topology (see: Applied graph theory - W. K. Chen - North Holland ) and the formation of the TABLEAU for the node voltage method (see: Linear and non-Linear Circuits - L. O. Chua, C. A. Desoer, E. S. Kuh - Mc Graw Hill), see following photos: