Review for the Final
exam
Final exam
is cumulative. It will cover sections from 5.1 -5.6, 6.1- 6.5, 6.7, 7.1-7.3.
The list of concepts and theorems below is complementary to the list you got
before the Midterm.
This is NOT
a substitution for reviewing your notes, homework and quizzes that you took,
but rather a complementary hand-out to help you organize the material that we
covered.
Definitions:
-
orthogonal
basis
-
orthonormal
set
-
orthonormal
basis
-
orthogonal
projection
-
orthogonal
matrix
-
least-squares
solution of a linear system
-
inner
product
-
inner
product space
-
length,
distance, orthogonality in an inner product space
-
symmetric
matrix
-
quadratic
form
-
positive
definite, negative definite and indefinite quadratic form
-
principal
axes of a quadratic form
Concepts:
-
Gram-Schmidt
process
-
QR
factorization
-
best
approximation
-
change
of variable in a quadratic form
-
constrained
optimization problem
Theorems:
-
Theorems 19 – 34c from class.
From the book (note that most of
them are duplicate to the ones we studied in class):
-
Theorem 8 (Orthogonal Decomposition theorem)
-
Theorem 9 (The Best Approximation theorem)
-
Theorem 10
- Theorem
11 (The Gram-Schmidt process)
-
Theorem 12 (QR factorization)
-
Theorem 13
- Theorem 16 (CS inequality)
- Theorem
17 (Triangle inequality)
-
Theorem
1\ - 6.
Skills:
you should be able to
-
Compute
orthogonal projection
-
Find
an orthogonal (or orthonormal) basis of a given vector space (i.e. perform
Gram-Schmitd process)
-
Compute
QR factorization
-
Find
best approximation to a vector within a given vectors subspace
-
Find
least squares solutions, compute errors
-
Diagonalize
symmetric matrices
-
Find
principal axis of a quadratic form
-
Make
a change of variable in a quadratic form
to get rid of the cross-product terms
-
Classify
a quadratic form (as positive definite, negative definite or neither)
-
Solve
a constrained optimization problem