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\textbf{\Large SINGLE VARIABLE CALCULUS II}\\
The University of Toledo\\ Mathematics \& Statistics Department, College of Natural Sciences and Mathematics\\ MATH1860-0XX, CRN XXXXX
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\textbf{Instructor:} & \footnotesize{(Insert Name)} & \textbf{Class Location:} & \footnotesize{(Insert Building/Room)}\\
\textbf{Email:} & \footnotesize{(Insert Email Address)} & \textbf{Class Day/Time:} & \footnotesize{(Insert Days/Time)}\\
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\textbf{Office Location:} & \footnotesize{(Insert Building/Office \#)} & \textbf{Lab Day/Time:} & \footnotesize{(Insert Days/Time, if applicable)}\\
\textbf{Office Phone:} & \footnotesize{(Insert Phone Number)} & \textbf{Credit Hours:} & 4\\
\textbf{Term:} & \footnotesize{(Insert Semester/Year)} & &\\
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\noindent {\bf COURSE DESCRIPTION}\\
Inverse functions, techniques and applications of integration, polar coordinates, sequences and series.\\
\noindent{\bf STUDENT LEARNING OUTCOMES}\\
The successful Calculus II student should be able to:
\begin{itemize}
\item {\bf\emph{Definite Integrals}}: Use antiderivatives to evaluate
definite integrals and apply definite integrals in a variety of applications to
model physical, biological or economic situations. Whatever applications (e.g.
determining area, volume of solids of revolution, arc-length, area of surfaces
of revolution, centroids, work, and fluid forces) are chosen, the emphasis
should be on setting up an approximating Riemann sum and representing its limit
as a definite integral.\vspace{-.1in}
\item {\bf\emph{Techniques of Integration}}: Employ a variety of integration
techniques to evaluate special types of integrals, including substitution,
integration by parts, trigonometric substitution, and partial fraction
decomposition.\vspace{-.1in}
\item {\bf\emph{Improper Integrals:}} Evaluate improper integrals, including integrals
over infinite intervals, as well as integrals in which
the integrand becomes infinite on the interval of integration.\vspace{-.1in}
\item {\bf\emph{Sequences and Series}}: Determine the existence of and find
algebraically the limits of sequences. Determine whether a
series converges by using appropriate tests, including the comparison, ratio,
root, and integral.\vspace{-.1in}
\item {\bf\emph{Power Series}}: Find the nth Taylor polynomial at a specified
center for a function and estimate the error term. Use appropriate techniques to
differentiate, integrate and find the radius of convergence for the power
series of various functions.\vspace{-.1in}
\item {\bf\emph{Parametric Curves}}: Analyze curves given parametrically and in polar
form and find the areas of regions defined by such curves.\vspace{-.1in}
\end{itemize}
\noindent {\bf PREREQUISITES}\\
Minimum grade of C- in MATH 1850 or equivalent.\\
\noindent{\bf TEXTBOOK:} {\it Calculus -- Volume II}, OpenStax (Print ISBN-13: 978-1-938168-06-2;
Digital ISBN-13: 978-1-947172-14-2), Senior Contributing Authors: Edwin ``Jed" Herman and Gilbert Strang.
The ebook is available for free at \url{https://openstax.org/details/books/calculus-volume-2};
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\medskip\noindent{\bf UNIVERSITY POLICIES:}\\
\noindent{\bf POLICY STATEMENT ON NON-DISCRIMINATION ON THE BASIS OF DISABILITY (ADA)}\\
The University is an equal opportunity educational institution. Please read The University's Policy
Statement on Nondiscrimination on the Basis of Disability Americans with Disability Act Compliance.\\
\noindent{\bf ACADEMIC ACCOMODATIONS}\\
The University of Toledo is committed to providing equal access to education for all students. If you
have a documented disability or you believe you have a disability and would like information regarding
academic accommodations/adjustments in this course please contact the Student Disbility Services Office
(Rocket Hall 1820; 419.530.4981; studentdisabilitysvs@utoledo.edu) as soon as possible for more
information and/or to initiate the process for accessing academic accommodations. For the full
policy see: \url{http://www.utoledo.edu/offices/student-disability-services/sam/index.html}\\
\medskip\noindent{\bf ACADEMIC POLICIES:}\\
\noindent{\bf STUDENT PRIVACY}\\
Federal law and university policy prohibits instructors from discussing a student's grades or class
performance with anyone outside of university faculty/staff without the student's written and
signed consent. This includes parents and spouses. For details, see the Confidentiality of Student
Records (FERPA) section of the University Policy Page
at \url{http://www.utoledo.edu/policies/academic/undergraduate/index.html}\\
\noindent{\bf MISSED CLASS POLICY}\\
If circumstances occur in accordance with The University of Toledo Missed Class Policy (found
at \url{http://www.utoledo.edu/policies/academic/undergraduate/index.html} ) result in a
student missing a quiz, test, exam or other graded item, the student must contact the instructor
in advance by phone, e-mail or in person, provide official documentation to back up his or her
absence, and arrange to make up the missed item as soon as possible.\\
\noindent{\bf ACADEMIC DISHONESTY}\\
Any act of academic dishonesty as defined by the University of Toledo policy on academic
dishonesty (found at \url{http://www.utoledo.edu/dl/students/dishonesty.html}) will result
in an F in the course or an F on the item in question, subject to the determination of the instructor.\\
\noindent{\bf GRADING AND EVALUATION}\\
Your syllabus should describe the methods
of evaluation, whether by quizzes, exams or graded assignments. (There should be at least
two one-hour in-class exams. If quiz scores are not included in the final grade
computation, there should be three one-hour exams.) If a grading scale is used, it should
be clearly stated. A statement of the proportion that each evaluation component
contributes toward the final grade should also be included. A sample reasonable
distribution for this class would be:
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Midterm Exams & 40\% \\
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Final Exam & 30\% \\
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In scheduling quizzes and exams, it should be kept in mind that the last day to add/drop
the class is the end of the second week and the last day to withdraw is the end of the tenth
week. By these dates, students should have sufficient data
to realistically gauge their progress in the class. \\
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\noindent{\bf IMPORTANT DATES}\\
*The instructor reserves the right to change the content of the course material if he perceives
a need due to postponement of class caused by inclement weather, instructor illness, etc.,
or due to the pace of the course.\\
\noindent{\bf MIDTERM EXAM:}\\
{\bf FINAL EXAM:}\\
\noindent{\bf OTHER DATES}\\
The last day to drop this course is:\\
The last day to withdraw with a grade of ``W'' from this course is:\\
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\medskip\noindent{\bf STUDENT SUPPORT SERVICES}\\
Students should be made aware of the tutoring help
available during each week of the semester in the Mathematics Learning and Resource
Center, located in Rm B0200 in the lower level of Carlson Library (phone ext 2176). The
center operates on a walk-in basis. MLRC hours can be found on their web page at
\url{http://math.utoledo.edu/mlrc/MLRC.pdf.}\\
\medskip\noindent{\bf CLASS SCHEDULE}\\
The syllabus should provide a list of
sections to be covered and ideally, should indicate the material that might be
covered on each in-class examination. Please include in your syllabus a list of
important dates, including mid-term exam dates, the drop and withdrawal dates,
and the time and place of the final exam.
A recommended schedule of the class time to be devoted to each section is listed below.
While individual experiences may vary somewhat, the schedule is a template for completing
all of the topics in the course and it should be consulted periodically to ensure that you
are on track to complete the syllabus with an appropriate amount of time devoted to each
section. Most students passing this course will proceed to MATH 2850. (If you
are not
familiar with our calculus sequence, please consult the course coordinator.) \textbf{It
is critically important that you do not shortchange them or hamper MATH 2850
instructors by skipping important sections or by rushing through the
introduction to vectors and geometry of space because of poor planning.} \\
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\noindent {\bf SUGGESTED SCHEDULE}\hfill
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\noindent
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& & & \\
Chapter & 2 & \textbf{Applications of Integrals} & (total 6 hr)\\
&2.1 & \textbf{(Op.)} Areas between Curves; {\it Definite Integration} & \\
&2.2 & Determining Volumes by Slicing; {\it Definite Integration} & 2\\
&2.3 & Volumes of Revolution: Cylindrical Shells; {\it Definite Integration} & 2\\
&2.4 & Arc Length of a Curve and Surface Area & 1\\
&2.5 & Physical Applications & 1 \\
&2.6 & \textbf{(Op.)} Moments and Centers of Mass & \\
&2.7 & \textbf{(Op.)} Integrals, Exponential Functions, and Logarithms & \\
&2.8 & \textbf{(Op.)} Exponential Growth and Decay& \\
&2.9 & \textbf{(Op.)} Calculus of the Hyperbolic Functions & \\
& & & \\
Chapter & 3 & \textbf{Techniques of Integration} & (total 10 hr)\\
&3.1 & Integration by Parts; {\it Techniques of Integration} & 2\\
&3.2 & Trigonometric Integrals; {\it Techniques of Integration} & 1\\
&3.3 &Trigonometric Substitution; {\it Techniques of Integration} & 2\\
&3.4 &Partial Fractions; {\it Techniques of Integration} & 2\\
&3.5 & \textbf{(Op.)} Other Strategies for Integration & \\
&3.6 &\textbf{(Op.)} Numerical Integration & \\
&3.7 & Improper Integrals; {\it Improper Integrals} & 3\\
& & & \\
Chapter & 5 & \textbf{Sequences and Series} &(total 10 hr)\\
&5.1 & Sequences; {\it Sequences and Series} & 2 \\
&5.2 & Infinite Series; {\it Sequences and Series} & 2 \\
&5.3 & The Divergence and Integral Tests; {\it Sequences and Series} & 2\\
&5.4 & Comparison Tests; {\it Sequences and Series} & 1 \\
&5.5 & Alternating Series; {\it Sequences and Series} & 1\\
&5.6 & Ratio and Root Tests; {\it Sequences and Series} &2 \\
& & & \\
Chapter & 6 & \textbf{Power Series} & (total 7 hr) \\
&6.1 &Power Series and Functions; {\it Power Series} & 2 \\
&6.2 & Properties of Power Series; {\it Power Series} & 2 \\
&6.3 & Taylor and Maclaurin Series; {\it Power Series} & 2 \\
&6.4 & Working with Taylor Series; {\it Power Series} & 1 \\
& & & \\
Chapter & 7 & \textbf{Parametric Equations and Polar Coordinates} & (total 6 hr) \\
&7.1 & Parametric Equations; {\it Parametric Curves} & 1 \\
&7.2 & Calculus of Parametric Curves; {\it Parametric Curves} & 2\\
&7.3 & Polar Coordinates; {\it Parametric Curves} & 2 \\
&7.5 &Area and Arc Length in Polar Coordinates; {\it Parametric Curves} &1 \\
&7.6 &\textbf{(Op.)} Conic Sections & \\
& & & \\
& \\
& & Total Hours & 39
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