Course Syllabus
Welcome
Welcome to Calculus, First Half Unit.
We are pleased that you selected this self-paced course to fulfill your unique educational needs. You are now a member of the Mizzou Academy's large and diverse student body—a student body that comes from all parts of the United States and many parts of the world.
Although the freedom to choose when and where to study is a privilege, it is also a responsibility that requires motivation and self-discipline. To succeed at self-paced learning, you will need to develop a study plan by setting realistic goals and working toward them.
Calculus, First Half Unit, is designed to provide an overview of mathematical analysis through the study of functions. Functions have been introduced in your algebra classes. Graphing and functions are reviewed in the first lesson of this course. The course continues with the study of limits, a fundamental concept for calculus. Limits are then used to define a fundamental operation of calculus, differentiation. Several topics are covered that apply the use of differentiation. The Fundamental Theorem of Calculus is used for integration, the inverse operation of differentiation. The course ends with differentiation and integration of the natural logarithmic function. Course Overview
This course is designed to provide an overview of mathematical analysis through the study of functions, which were introduced in the algebra courses. Beginning with a review of graphing and functions, the course continues with the study of limits and differentiation. The Fundamental Theorem of Calculus is used for integration, the inverse operation of differentiation. The course also covers differentiation and integration of the natural logarithmic function.
Academic Integrity Policy
Our academic integrity policy at Mizzou Academy is based on our values of ethical behavior, learning, and giving all stakeholders the benefit of the doubt. Collaboration, research, and technical literacy are vital 21st-century skills when combined with academic integrity.
Definitions
Mizzou Academy's academic integrity policy is aligned with the University of Missouri’s academic integrity policy. The definitions of what constitutes "cheating" and "plagiarism"are posted on the Provost’s Advising Council’s webpage which can be found here: https://advising.missouri.edu/policies/academic-integrity.
Issues Involving Violations of Academic Integrity
If we evaluate an assignment or exam and find that it does not demonstrate academic integrity, consequences include partial or no credit given for that work. If you fall into a pattern of academic dishonesty, more serious consequences will follow.
Use of AI and Online Resources
Online resources, including ChatGPT and other generative artificial intelligence tools, should be used responsibly. Many assignments don’t necessitate the use of resources. For example, personal reflections, examples, and narratives, creative writing, and reflections and journal entries are meant to capture your unique experiences and ideas.
For some assignments, AI tools and online resources can assist you in your learning. They can help you develop and support your original work. That said, they cannot and should not replace your original work.
We view using online sources, much like collaborating with classmates. As a learner, you will often seek ideas from others by having conversations, exploring a variety of information sources, and doing more formal research. Likewise, online and AI tools can help you gather ideas, decide how to organize them, and find the best ways to support those ideas. We believe that learning how to use all the tools and resources available to you purposefully, effectively, and responsibly is a key skill for school and life.
If you use any ideas, information, or wording from your resources–including generative, collaborative, print, and online resources–you must give credit to those sources by honestly identifying which resources you used.
For more information about when and how to cite resources, as well as tips and examples of how to use them appropriately and effectively, please visit our Learning Library, Shelves 9 and 9.5.
Accessibility
If you anticipate barriers related to the format or requirements of this course, please let Mizzou Academy know as soon as possible. If disability-related accommodations are necessary (for example, a scribe, reader, extended time on exams, captioning), please contact Mizzou Academy.
About Exams at Mizzou Academy*
Your exams are online. It is your responsibility to schedule your exams.
During exams, unless otherwise noted, you are not allowed to navigate away from the exam or use any other resources. If you deviate from the exam guidelines without proper prior permission, it is considered cheating on an exam.
Scheduling Exams
Global Courses
Mizzou Academy values fair testing and assessment to determine that students master essential course concepts and skills. During a proctored exam, tests are supervised by an impartial individual (a proctor) to help ensure that all exams maintain academic integrity. You will need to use a Mizzou Academy approved proctor. Please see the Exam Proctoring webpage for more information.
- Choose a proctor and make arrangements for taking the exam.
- At least 2 weeks prior to taking your exam, submit your proctor information to Mizzou Academy
- You will be sent an email notice indicating if your chosen proctor has been approved or denied.
- Arrive at your proctor’s testing site at the scheduled time with a photo ID. At testing time, you will log into your Mizzou Academy account and select the exam for your proctor to access and administer.
Global Classroom Courses
If you are taking a global classroom course, work with your local teacher to identify your date of the exam and how you will be proctored. You do not need to request an exam date with the above form.
HOW TO PREPARE FOR EXAMS
- Complete and review all assignments.
- Review the learning objectives; make sure you can accomplish them.
- Be prepared to explain any key terms and concepts.
- Review all the lessons, exercises, and study questions.
- Review any feedback and/or comments on your assignments and previous exams; look up answers to any questions you missed.
Additional Course Policies and links
**Not applicable to World Language courses.
Pacing
This course can be completed in as few as six weeks or take up to 6 months (180 calendar days). The six weeks are counted from the date of the first lesson submission and not the date of enrollment.
Required Materials
Textbook
Larson, Ron, Robert P. Hostetler, Bruce H. Edwards, and David E. Heyd. Calculus of a Single Variable. (7th Edition). Boston: Houghton-Mifflin, 2002.
MATERIALS
- You will need a graphing calculator (preferably a Ti-83 or Ti-84).
- Students will need Microsoft Word to render MathType
Technical Requirements
The most up-to-date requirements can be found here:
- Computer Requirements
- Browser Requirements
- Proctoring Requirements
- Microphone (external or internal)
- Webcam
Additional requirements for the course are below:
- audio and video recording capabilities (e.g. smartphone, camera)
Quizzes & Assignments
You should submit all assigned work in sequence (Lesson 1, then Lesson 2, etc.) Assignments for the course are listed in the lesson modules.
Quizzes
The work you will submit for this course consists of 10 computer-evaluated quizzes that are scored instantaneously. They appear in each lesson. Quizzes are open-book assignments that test your knowledge and understanding of the course material presented in a particular lesson's commentary or textbook reading assignment. You may use any assigned readings, your notes, and other course-related materials to complete these assignments. The points you earn on your submitted work count toward your final course grade. Each quiz consists of 20 multiple-choice and true/false questions worth 1 point each for a total of 20 points.
Quizzes are taken online. After you submit them, you’ll quickly receive a report on how you did. Unlike exams, you may use any assigned readings, your notes, and other course-related materials to complete graded quizzes and assignments.
Exams
You are required to take two proctored exams for this course.
Midterm Exam (through Lessons 5) | Final Exam (through Lesson 10) | |
---|---|---|
When to request an exam | after you receive your feedback for Lesson 5 | after you receive your feedback for Lesson 10 |
Questions and Type | 35 multiple-choice | 35 multiple-choice |
Points Possible | 175 points | 175 points |
Time Limit | 150 minutes | 150 minutes |
Allowed Materials | Pencil, Scratch/Graph Paper, Calculator, Formula Packet | Pencil, Scratch/Graph Paper, Calculator, Formula Packet |
See the "About Exams" in the policies section for additional information on exams at Mizzou Academy.
Grades
Your final grade will be based on the number of points you earn on quizzes and exams.
Source | Available Points |
---|---|
Progress Evaluations | 200 |
Midterm Exam | 175 |
Final Exam | 175 |
Total | 550 |
You will be able to see your exam percentage in the "Exams" column in your grade book.
Grade | Percentage |
---|---|
A | 90–100 |
B | 80–89 |
C | 70–79 |
D | 60–69 |
F | 0–59 |
After completing the course, unofficial transcripts will be available in the Tiger Portal. See this page for information on requesting official transcripts.
Getting Started Resources (Canvas and Other Resources)
Explore the resources below to learn more about each element and how they work in your Mizzou Academy Canvas course.
Canvas and Technical Support
Canvas will be used as the primary platform for accessing course materials and assignments for this class.
- Access Canvas through the Tiger Portal https://cehd.missouri.edu/mizzou-academy/
- View Canvas Guides by Mobile App
- Getting Started with Canvas
- For Canvas, Passwords, or any other computer-related technical support create a ticket in Canvas or contact Mizzou Academy Support.
- How do I get help with Canvas as a student?
- Mizzou AcademySupport Phone: +1 855 256-4975
- Mizzou Academy Email - MizzouAcademy@missouri.edu
Credits and Attributions
Course Credits
- Developer
- Brennan Ransdell with Mizzou Academy
- Instructional Editor
- Kimberly Small
- Copyeditor
- Adrian Corman
Image and Multimedia Attributions
- Title graphic
- The image in the background of the title graphic is © iStockphoto/rubenhi.
- Calculator images
- All images of calculators and calculator windows are courtesy of Texas Instruments.
- Check Your Understanding icon
- Image is © Microsoft Office Online Clip Art and Media.
- Lesson 1: Preparation for Calculus
- Figure 1.1, the dollar sign, was obtained from Wikimedia Commons courtesy of Anonymoususer and was released into the public domain by its author.
- Lesson 2: Limits and Their Properties
- Figure 2.1, the speed limit sign, was obtained from Wikimedia Commons courtesy of Ltljltlj and was released into the public domain by its author.
- Lesson 3: The Derivative and Differentiation Rules
- Figure 3.1, the bouncing basketball, was obtained from Wikimedia Commons courtesy of Richard Bartz and is licensed under the Creative Commons Attribution ShareAlike 3.0 Unported license.
- Lesson 4: The Chain Rule, Implicit Differentiation, and Related Rates
- Figure 4.1, the hourglass, was obtained from Wikimedia Commons courtesy of S Sepp and is licensed under the GNU Free Documentation license.
- Lesson 5: Finding Extrema on an Interval and the First Derivative Test
- Figure 5.1, the speedometer, was obtained from Wikimedia Commons courtesy of FlickreviewR and is licensed under the Creative Commons Attribution 2.0 Generic license.
- Lesson 8: Integration
- Figure 8.1, the theme park, was obtained from Wikimedia Commons courtesy of Angcr and is licensed under the Creative Commons Attribution 3.0 Unported license.
Rights holders of any materials not credited on this page or cited within the course should contact Mizzou K-12 Online / MU High School.
Course Summary:
Date | Details | Due |
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