16.513 Control Systems (Lecture note #6)
Last Time: Linear algebra review
Linear algebraic equations, solutions
Parameterization of all solutions
Similarity transformation: companion form
Eigenvalues
10/9/2016
Math3191Spring2000CheatSheetFinal
next
up
previous
Next:Aboutthisdocument.
Math3191Spring2000CheatSheet
Final
JanMandel
Elementaryrowoperations:1.addamultipleofarowtoanotherrow(doesnotchan
University of Massachusetts Lowell
Department of Electrical and Computer Engineering
16.413 Linear Feedback
Problem set 1
Posted: 2-10-2014
Due: 2-17-2014
FIGURE 1
FIGURE 2
(A)
(B)
M
B0
U0
U0
U
B0
V
K
16.513 Control Systems
Lecture Note #5
Last time:
The base of a linear space: Basis
Representations of a vector in terms of a basis
Relationship among representations for different bases
Generalizat
16.513 Control Systems, Lecture Note #4
Last Time:
Modeling of Selected Systems (2.5, 2.6):
Electrical circuits, Mechanical systems, simple financial
systems
Linear Algebra,
Linear spaces over a f
\ . (Hy3am) + (-sA) - o
(Ai3)(/hi)(/\-I) H :0 (A+3)(A1L/\¢A -| 4.; so
aw» AM!) + (m) 0
The rank 0f(A-/1]I) is 2, the nullin is 1, less than raw) = O
the multiplicity. There is a generalizedleigenvecto