Course Information

Course Title:	Plane Geometry
Course Code:	None
Credits:	0 credits
Certificate Provider:	Westcott Courses
Grading Mode:	Standard letter grade
Proctored Final:	No

Textbook Requirement:
No outside textbook is needed. Our Omega Math^TM courses contain all the lessons, homework, solution manuals, quizzes, tests and the final. Our lessons start out with the easiest examples, and then move slowly to the more advanced problems. Between examples, there are interactive problems which make sure the student understands the concepts, as well as enables the student to store the information into long term memory.

Course Description

This course was designed to prepare students in the understanding of properties and applications in Euclidean geometry. Extensive use of definitions, postulates and theorems are used throughout this course to write proofs using deductive reasoning. Critical thinking skills are used in solving real world applications. Topics include angles, parallel and perpendicular lines, congruence, similar triangles, properties and applications of right triangles, introduction to trigonometry, constructions, transformations, polygons, circles, area, perimeter, surface area, volume, and three dimensional space.
Plane Geometry is an Omega Math^TM Course.

Note: This course is equivalent to one year of High School Plane Geometry or one semester of college Geometry.
^*Plane Geometry is a college course that offers three college semester credits; however, its course code is below 100. Thus, if you need this course for transfer you need to ask your school if they will accept the credits for MATU 098.

Prerequisite:   Suggested: Either a year of high school Algebra l or one semester of Elementary Algebra with a grade of C or better.

Approvals for this Course
Meets Common Core Requirements: Yes
UC Approved: Yes

Learning Outcomes

At the conclusion of this course, students should be able to:

1. Identify and apply the basic properties of triangles, quadrilaterals and polygons.
2. Understand and apply geometric constructions.
3. Apply definitions, postulates, and theorems to prove a wide variety of geometric properties and statements using deductive reasoning in a two-column format.
4. Classify quadrilaterals by their properties as rectangles, squares, parallelograms, rhombuses, kites and trapezoids.
5. Calculate measures of the angles, diagonals and altitudes of various quadrilaterals as well as other geometric figures.
6. Apply definitions, postulates, and theorems to set up and solve related geometric problems.
7. Apply the corresponding parts of congruent triangle theorem for sides and angles of a triangle to prove and solve related problems.
8. Apply properties for parallel and perpendicular lines to prove and solve related problems.
9. Solve problems using relationships among chords, secants, tangents, and inscribed angles of inscribed and circumscribed polygons.
10. Apply rigid and non-rigid motion transformations.
11. Solve triangles using the properties of similar triangles.
12. Calculate circumference, area, surface area, perimeter and volume to common geometric figures.
13. Understand and apply basic calculations using trigonometry to solve for an unknown angle or side of a right triangle.
14. Understand equations and graphs of conic sections.
15. Demonstrate proficiency in strategic competence, conceptual understanding and adaptive reasoning.
16. Express relationships among quantities using variables.
17. Demonstrate real-world problem solving skills. Analyze the problem and break it into parts, recognize the concepts applicable to the parts, recognize the relationship between the parts, write the concepts in proper geometric representations, solve the problem in symbols, interpret the final results.
18. Recognize a language description, geometric and algebraic representation, and be able to transfer from one form to the other.

Methods Of Evaluation

Homework quizzes 15%
Chapter tests 60%
Final Exam 25%
(You must get at least 60% on this final in order to pass the class with a C or better.)

Homework Quizzes: 15%

Homework assignments are essential in a mathematics course. It is not possible to master the course without a considerable amount of time being devoted to studying the concepts and solving problems. Each lesson contains a set of homework problems, and you are required to do all the odd problems for each section. Work out each problem, and then check the solution manual for a detailed solution. Do not continue to the next problem until you understand your mistake. Once you feel comfortable with the homework set, take the homework quiz for that section. The homework quizzes are revised problems from the homework sets. You may take each quiz twice, and the higher of the two scores is used to calculate your quiz grade. Once you take a quiz, figure out what you did wrong on the problems that you missed and then try the quiz again. It is important to figure what you did wrong before you push forward. If you figure out your errors at this step, you will be less likely to make the same error on the test or the final. The struggle to figure out what you did wrong stores the mathematics into your long-term memory, and aids in building abstract thinking.

Chapter Tests: 60%

After you have completed a chapter, and understand everything in the lessons, homework sets and quizzes, take the chapter test. The chapter tests are revised problems from the quizzes. You may take each chapter test twice, and the higher of the two scores is used to calculate your chapter test grade. Once you take a chapter test, figure out what you did wrong on the problems that you missed and then try the chapter test again. It is important to figure what you did wrong before you push forward. If you figure out your errors at this step, you will be less likely to make the same error on the final.

Assessment

A 90-100 A Clearly stands out as excellent performance and, exhibits mastery of learning outcomes.
B 80-89 B Grasps subject matter at a level considered to be good to very good, and exhibits partial mastery of learning outcomes.
C 70-79 C Demonstrates a satisfactory comprehension of the subject matter, and exhibits sufficient understanding and skills to progress in continued sequential learning.
D 60-69 D Quality and quantity of work is below average and exhibits only partial understanding and skills to progress in continued sequential learning.
F 0-59 F Quality and quantity of work is below average and not sufficient to progress.

Instructional Process

In this course we will explore mathematical concepts, methods and applications from life issues, business and finance, social and environmental issues. Civic and social issues will be used as problems to apply the subject principles. Using the civic, social, and life related examples will help students understand the subject at a deeper level. After an introduction in each section, problems will be solved that start with the easiest examples and move slowly to the more advanced problems with Student Interactive Problems (SIP) in between. The SIPs are important! They give you a chance to slow down and make sure you understand the material. If you get the problem correct, continue on with the next example. If you get the problem wrong, you will be taken to a page that works out the problem in detail. The SIPs play a large part in storing the topics along with their procedures into your long-term memory. Each homework set contains applications for that lesson. These real life applications create a better understanding of math in our world and how it applies to every day life.

Course Content Menu

Chapter 1 - Introduction to Geometry, Logic and Proofs

Lessons	Homework	Quiz
1.1 - Defining Terms, Distance & Midpoint Formulas	1.1	1.1
1.2 - Angles	1.2	1.2
1.3 - Logic Statements	1.3	1.3
1.4 - Algebra Properties	1.4	1.4
1.5 - Introduction to Proofs	1.5	1.5
1.6 - Angles Formed by Transversal, Parallel and Perpendicular Lines	1.6	1.6
1.7 - Slopes & Linear Equations	1.7	1.7
Chapter 1 Test ( 26 questions )

Chapter 2 - Triangles

Lessons	Homework	Quiz
2.1 - Segments in a Triangle	2.1	2.1
2.2 - Similar Triangles	2.2	2.2
2.3 - Corresponding Parts and Congruency of Triangles	2.3	2.3
2.4 - Right Triangle and Pythagorean Theorem	2.4	2.4
2.5 - Isosceles and Equilateral Triangles	2.5	2.5
2.6 - Proof by Contradiction	2.6	2.6
Chapter 2 Test ( 21 questions )

Chapter 3 - Introduction to Trigonometry

Lessons	Homework	Quiz
3.1 - Special Right Triangles	3.1	3.1
3.2 - Trigonometry	3.2	3.2
3.3 - Applications of Trigonometry	3.3	3.3
3.4 - Law of Cosines	3.4	3.4
3.5 - Law of Sines	3.5	3.5
Chapter 3 Test ( 23 questions )

Chapter 4 - Polygons

Lessons	Homework	Quiz
4.1 - Defining Polygons	4.1	4.1
4.2 - Quadrilaterals	4.2	4.2
4.3 - Sum of Interior and Exterior Angles	4.3	4.3
Chapter 4 Test ( 18 questions )

Chapter 5 - Circles

Lessons	Homework	Quiz
5.1 - Defining Circles	5.1	5.1
5.2 - Circle Pairs	5.2	5.2
5.3 - Objects in a Circle	5.3	5.3
5.4 - Angles in a Circle	5.4	5.4
Chapter 5 Test ( 25 questions )

Chapter 6 - Constructions and Transformations

Lessons	Homework	Quiz
6.1 - Constructions	6.1	6.1
6.2 - Transformations - Rigid Motion	6.2	6.2
6.3 - Transformations - Non-Rigid Motion	6.3	6.3
Chapter 6 Test ( 15 questions )

Chapter 7 - Perimeter of a Plane Figure

Lessons	Homework	Quiz
7.1 - Perimeter of a Polygon	7.1	7.1
7.2 - Circumference of a Circle	7.2	7.2
Chapter 7 Test ( 14 questions )

Chapter 8 - Area of a Plane Figure

Lessons	Homework	Quiz
8.1 - Area of a Triangle	8.1	8.1
8.2 - Area of a Triangle using Trigonometry	8.2	8.2
8.3 - Area of a Polygon	8.3	8.3
8.4 - Area of a Circle	8.4	8.4
8.5 - Applications Involving Area	8.5	8.5
Chapter 8 Test ( 25 questions )

Chapter 9 - Surface Area

Lessons	Homework	Quiz
9.1 - Surface Area of a Polyhedron	9.1	9.1
9.2 - Surface Area of a Cylinder, Cone & Sphere	9.2	9.2
Chapter 9 Test ( 16 questions )

Chapter 10 - Volume

Lessons	Homework	Quiz
10.1 - Volume of a Straight Solid	10.1	10.1
10.2 - Volume of a Pointed Solid	10.2	10.2
10.3 - Volume of a Sphere	10.3	10.3
Chapter 10 Test ( 18 questions )

Chapter 11 - Conic Sections

Lessons	Homework	Quiz
11.1 - Circles	11.1	11.1
11.2 - Parabolas	11.2	11.2
11.3 - Ellipses	11.3	11.3
11.4 - Hyperbolas	11.4	11.4
Chapter 11 Test ( 15 questions )
Plane Geometry Final Exam

Time on Task

This course is online and your participation at home is imperative. A minimum of 8 - 10 hours per week of study time is required for covering all of the online material to achieve a passing grade. You must set up a regular study schedule. You have five months of access to your online account with a thirty-day extension at the end if needed. If you do not complete the course within this time line, you will need to enroll in a second term.

Schedule

Below is the suggested time table to follow to stay on a 17 week schedule for the course. The following schedule is the minimum number of sections that need to be completed each week if you would like to finish in a regular semester time frame. You do not have to adhere to this schedule. You have five months of access plus a 30 day extension at the end if needed. You can finish the course as soon as you are able, with a minimum coursework time of at least four weeks. (Teachers can ask for an exception to the 6 wk rule.)

Week	Complete Sections
2	1.1 - 1.3
2	1.4 - 1.5
3	1.6 - 2.1
4	2.2 - 2.4
5	2.5 - 2.6
6	3.1 - 3.3
7	3.4 - 4.1
8	4.2 - 4.3
9	5.1 - 5.3
10	5.4 - 6.2
11	6.3 - 7.2
12	8.1 - 8.3
13	8.4 - 9.1
14	9.2 - 10.2
15	10.3 - 11.2
16	11.3 - 11.4
Final Exam

Code of Conduct:

It is the student's responsibility and duty to read the information below and become acquainted with all provisions of what constitutes academic misconduct involving cheating and plagiarism. Students are required to read each statement below, and the given repercussion. There are no exceptions to these policies, and the pretext of not reading each part will not be deemed as a reasonable excuse to contest the policies.

Code of Ethics:

Regulations and rules are necessary to implement for classroom as well as online course behavior. Students are expected to practice honesty, integrity and respect at all times. It is the student's responsibility and duty to become acquainted with all provisions of the code below and what constitutes misconduct.

Respectful communications:

When contacting Westcott Courses, you agree to be considerate and respectful. Communications from a student which are considered by our staff to be rude, insulting, disrespectful, harassing, or bullying via telephone, email, or otherwise will be considered a disrespectful communication and will result in a formal warning.

We reserve the right to refuse service. If we receive multiple disrespectful communications from person(s) representing the student, or the student themselves, the student will be excluded from taking future courses at Westcott Courses.

Grading information and proctored final policies:

The grading rules are put in place to protect the integrity of online education by stopping grade inflation, which is done by demanding a display of competency in exchange for a grade. By agreeing to the terms of service agreement, you agree to read the 'Grading' Policy from within your account, and the 'Proctored Final Information' page, if applicable. You have 24 hours after your first log-in to notify us if you do not agree to the grading policy and proctored final policy ( if applicable ) outlined in the pages inside of your account, otherwise it is assumed that you agree with the policies. There are no exceptions to these policies, and the pretext of not reading the pages will not be deemed as a reasonable excuse to contest the policies.

The definition of academic cheating is an act of dishonesty in order to obtain a higher grade in the course, and to gain an advantage over other students in the course.

To maintain academic standards, students are expected to practice honesty, integrity and respect at all times. Students who violate the policies of cheating, plagiarizing, or other academic misconduct will result in following actions.

1)   Cheating in any way on the final exam results in an F on the final and an F in the class. This includes, but is not limited to any form of collaboration, use of unauthorized materials, receiving or providing unpermitted assistance on the exam, using outside digital assistance such as a cell phone, tablet, ETC. to communicate with others or access outside websites, having someone else take the exam for you, taking an exam for another student, failing to stop working on the exam when the time is up.

Final exams are secure tests and the intellectual property of Westcott Courses. Taking screen shots of a digital final or copying a paper test is stealing our intellectual property and cheating. It is equivalent to stealing a copy of the final exam off an instructor's desk. When one student obtains the questions on a final, it means that other students who don't have the questions on the final are at a disadvantage. Once a final exam has been compromised it is no longer secure, and the exam is unfair for those who have not performed an act of dishonesty to gain the advantage.

Each of the infractions above represents a result of performing an act of dishonesty in order to obtain a higher grade in the course, and to gain an advantage over other students in the course. The result of any of the above offenses is an F in the course. Students who violate the above policy may retake the course after a first offense; however, a second offense will result in expulsion and students will no longer be able to take other courses at Westcott Courses.

Students are responsible for clicking on the “Proctored Final Information” link (which is on student’s Main Menu), and reviewing the list of Authorized Materials for each course's final exam. Since each course is different, the “Authorized Materials” for each final is different. For example, some courses permit notes, while others do not.

2)   Plagiarism: All of the following are considered plagiarism, and will result in a zero on the plagiarized assignment, and there are no opportunities to redo the assignment.

Merriam-Webster defines plagiarism as “the act of using another person's words or ideas without giving credit to that person” Plagiarism includes, but is not limited to:

• having somebody else write your assignment for you
• turning in an assignment that contains work that is not your own
• changing words in phrases, sentences and/or blocks of text without giving credit to the source (paraphrase)
• copying ideas, phrases, sentences or entire blocks of text without giving credit to the source
• not crediting the correct source by providing incorrect information

Plagiarism is an act of fraud, and can usually be avoided by using quotation marks and citing the source of the material. Instructors apply plagiarism software to find assignments that contain plagiarized material. Again, assignments that contain one of the above infractions will receive a zero on the assignment and the student will not have the opportunity to redo the assignment.

It is important to note that saving all your assignments to the end of the course, and then turning in multiple assignments that have been plagiarized will result in zeros on all of those assignments. This may mean that you no long have enough points in the course to pass the class. Thus, turning in assignments one at a time and waiting for instructor feedback in-between is important for learning and making sure that you maximize your possible points.

If you have questions, please read more information about plagiarism at plagiarism.org, or ask your instructor.

Other Examples of Academic Misconduct:

1)   Other forms of cheating include altering an exam and submitting it for regarding, providing false excuses to postpone due dates, fabricating data or references, claiming that Westcott Courses lost your test and/or quiz scores, sending emails to Westcott claiming you did not know what you were doing was cheating.
2)   Unauthorized collaboration - working with others on graded course work without specific permission of the instructor, including homework assignments, programs, quizzes and tests.
3)   Copying Westcott Courses content and posting it on the internet. This includes assignments, quizzes, and tests.

By signing up for a course, you are legally signing a contract that states that the person who is named taking this course is the actual individual doing the course work and all examinations. You also agree that for courses that require proctored testing, that your final will be taken at a college testing center, a Sylvan Learning center, or at home using the online proctor. Also, the individual signed up for this course will be the one taking the test. Failure to do so will be considered a breach of Westcott Courses policies.

Important Notes:

This syllabus is subject to change and / or revision during the academic year. Students with documented learning disabilities should notify our office upon enrollment, as well as make sure we let the testing center know extended time is permitted. Valid documentation involves educational testing and a diagnosis from a college, licensed clinical psychologist or psychiatrist.