Difference between revisions of "ECE 280/Fall 2021/Final"
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(Created page with "This page lists the topics covered on the final exam for ECE 280 Fall 2021. This will cover everything through Homework 9 and all lecture material. Whil...") |
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#* Be able to determine a differential equation from a Laplace Transform-based transfer function and vice versa. | #* Be able to determine a differential equation from a Laplace Transform-based transfer function and vice versa. | ||
#* Be able to solve a differential equation with potentially non-zero initial conditions and potentially non-constant forcing functions. | #* Be able to solve a differential equation with potentially non-zero initial conditions and potentially non-constant forcing functions. | ||
+ | #* Be able to set up equations for a circuit using Unilateral Laplace Transform-based impedances and source representations (and solve if relatively simple). | ||
#* Be able to write transfer functions for inverting, reactive op-amp circuits | #* Be able to write transfer functions for inverting, reactive op-amp circuits | ||
− | + | ||
==Equation Sheet== | ==Equation Sheet== |
Latest revision as of 19:51, 6 December 2021
This page lists the topics covered on the final exam for ECE 280 Fall 2021. This will cover everything through Homework 9 and all lecture material. While there is no example final exam, there are sample tests for Dr. G at Test Bank.
Test II Coverage
- Everything on Test 1
- Everything on Test 2
- Laplace Transforms
- Understand that a Bilateral Laplace Transform is incomplete without its accompanying ROC or some statement that makes it possible to determine the correct ROC (i.e. "a causal signal..." or "a stable signal..."); the ROC for a Unilateral Laplace Transform is everything to the right of the right-most pole (if there is one) or the whole plane.
- Be able to determine Laplace and Inverse Laplace Transforms using the tables; for Inverses this also means being able to do partial fraction expansion, including for repeated roots.
- Know how to identify when a MOAT will be useful and how to get the coefficients for it.
- Understand how the ROC relates to system stability and causality as well as signal sidedness.
- Be able to determine a differential equation from a Laplace Transform-based transfer function and vice versa.
- Be able to solve a differential equation with potentially non-zero initial conditions and potentially non-constant forcing functions.
- Be able to set up equations for a circuit using Unilateral Laplace Transform-based impedances and source representations (and solve if relatively simple).
- Be able to write transfer functions for inverting, reactive op-amp circuits
Equation Sheet
The following equation sheet will be provided with the test. Equation Sheet
Specifically Not On The Test
- Maple
- MATLAB
- Python
- Turboencabulation