Chapter 232
The Baroque in Northern Europe
Peter Paul Rubens SELFPORTRAIT WITH ISABELLA BRANDT
16091610. Oil on canvas, 5'9" 4'5" (1.78 1.36 m).
Alte Pinakothek, Munich. [Fig. 2324]
Peter Paul Rubens THE RAISING OF THE CROSS
Made for the Church of St.
Company Summary
Review
Lets focus
Three areas of focus
Organize into topic headers and sub headers
Cite in text MLA
Writing in Business tone
Organization
General Information/History

Business Category

Markets

Products

Company Summary
What is expected
What is it about?
Develop business research and writing competencies.
Work as a Team member to deliver a well written/researched
Business Summary as part of Team writing submission.
Company Summary to Include:
1. General
CALCULUS I  EXAM 2  PRACTICE EXAM 2
PAUL SIEGEL, INSTRUCTOR
Problem 1 (Section 2.7). Use the definition of the derivative to differentiate the function f (x) =
(You must use the definition of the derivative; no credit will be given for using other techn
CALCULUS I  EXAM 2  PRACTICE EXAM 1
PAUL SIEGEL, INSTRUCTOR
Problem 1 (Section 2.7). Use the definition of the derivative to differentiate the function f (x) =
must use the definition of the derivative; no credit will be given for using other techniques
Homework , due April ,
Homework
Linear Algebra, Dave Bayer, due April ,
Uni:
Name:
[1]
[2]
[3]
Total
If you need more that one page for a problem, clearly indicate on each page where to look next for
your work.
[1] Find the inverse of the matrix
212
1 2 0
Homework , due March
,
Homework
Linear Algebra, Dave Bayer, due March
,
Uni:
Name:
[1]
[2]
[3]
Total
If you need more that one page for a problem, clearly indicate on each page where to look next for
your work.
[1] Find the determinant of the matrix
1
1
1
Homework , due February
,
Homework
Linear Algebra, Dave Bayer, due February
,
Uni:
Name:
[1]
[2]
[3]
Total
If you need more that one page for a problem, clearly indicate on each page where to look next for
your work.
[1] Find the 2 2 matrix A such that
A
Exam 2, March 6, 2014
Exam 2
Linear Algebra, Dave Bayer, March 6, 2014
Name: HillJib Uni:
If you need more that one page for a problem, clearly indicate on each page where to look next for
your work.
[1] Find the row space and the column space of the
Exam , November
,
Exam
Linear Algebra, Dave Bayer, November
,
Name:
Uni:
[1]
[2]
[3]
[4]
[5]
Total
If you need more than one page for a problem, clearly indicate on each page where to look next for
your work.
[1] Find the determinant of the matrix
2
1
2
1
Final Exam, December
Final Exam
Linear Algebra, Dave Bayer, December
,
[1] Find the intersection of the following two a ne subspaces of R3 .
x
1
10
y = 1 + 1 1 a
b
1
01
z
x
1
10
y = 2 + 0 1 c
d
z
2
01
,
Final Exam, December
,
[2] Find an orthogonal basis
2 2 Exercise Set A (distinct roots), November
2 2 Exercise Set A (distinct roots)
Linear Algebra, Dave Bayer, November
,
[1] Find An where A is the matrix
1 1
3 3
A=
= 2, 0
An =
(2)n
2
1 1
3 3
+
0n
2
3 1
3 1
[2] Find An where A is the matrix
A=
= 2, 2
A
Exam , February
,
Exam
Linear Algebra, Dave Bayer, February
,
Name:
Uni:
[1]
[2]
[3]
[4]
[5]
Total
If you need more that one page for a problem, clearly indicate on each page where to look next for
your work.
[1] Using matrix multiplication, count the num
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