EE213 (Fall 2013)
Homework 2 Due on Oct. 31, 2013
1) Use Gaussian elimination to solve Ax = b, where
&1 4 7 #
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$2 5 8 !, b = $1!
A=$
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$3 6 10 !
$1!
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(Show all steps.)
2) (a) Find the LU decomposition of A using Doolittles method.
(b) Check th
EE213 (Fall 2013)
Homework #1 Due Oct 17, 2013
Question 1
Use the element stamp method to build the MNA equations for the following RLC circuit:
Question 2
The 2-port shown below is defined in terms of its h-parameters
The h-parameters are defined as
v1
i
EE213
Homework #3 Due date: Nov. 14, 2013
(1) (25pts) The Jacobi iteration for solving Ax = b is defined as
Dx ( k +1) = ( L + U ) x ( k ) + b
where D, L, U are formed respectively from the diagonal, the lower triangle, and upper triangle
part of A. Let J
Homework #4 Due date: Nov. 28, 2013
(1) Apply the Newton-Raphson algorithm to the solution of the two diode network shown in Fig.
1. Write the down the Jacobi matrix using the stamping method for the nonlinear device. Let each
diode be represented by id =