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Unit 2 WebQuest Project
Who is behind this geometry idea anyway?
Introduction
| Task
| Process
| Guidance
| Conclusion
| Questions
Introduction
Have you ever wondered who first developed some of the ideas you are
learning in your geometry class? Today, many students use the Internet
for learning and research. In this project, you will be using the Internet
to research a topic in geometry. You will then prepare a portfolio or
poster to display your findings.
The Task
Your school is having a Mathematics Appreciation
Day. One event for the day is a competition for the best research project
on a mathematical topic. Since you are currently studying geometry,
your teacher wants each student in your class to research a topic in
geometry. She wants the topic to be related to Unit 2 in your textbook.
You will need to prepare a portfolio or poster to display the results
of your research. If you prefer, you can prepare a Web page with this
information that others can view. Be sure that your portfolio or Web
page contains the following information:
- a description of the geometry topic you are researching, for example,
the Pythagorean Theorem or fractals;
- the names of at least two people in history that contributed to
this topic;
- a written description of the contributions that each of the two
people made to your chosen topic;
- a problem relating to your topic that was proposed or solved by
one of the people you have chosen.
The Process
To successfully complete this project, you will
need to complete the following items.
- Select a geometry topic from Unit 2 in your Geometry textbook
to research. For help, try these Web sites.
www-groups.dcs.st-and.ac.uk/~history/
www2.bw.edu/~dcalvis/history.html
aleph0.clarku.edu/~djoyce/mathhist/mathhist.html
mathforum.org/isaac/mathhist.html
www.tmeg.com/bab_mat/bab_mat.htm
metalab.unc.edu/expo/vatican.exhibit/exhibit/d-mathematics/Greek_math.html
www.amug.org/~jpaul/math.html
archives.math.utk.edu/topics/history.html
- Find two people who contributed to or studied this topic.
The people can be from many years ago, such as a famous
Greek mathematician or they can be researching the topic
today.
- Write at least a one-page summary of the contributions
that the two people you selected made to the topic you have
chosen.
- Display one problem that one of your chosen people proposed
or solved.
- Be creative. Add some additional data, information, or
even pictures to your portfolio or Web page.
Guidance
Here
are some additional questions and ideas you may want to consider for
your project.
- Make a timeline for the geometric topic that you have chosen to
research. Mark the dates of important contributions to the topic.
- Write a complete history of the topic you have chosen.
- Research how the study of the geometric topic you have chosen has
helped in other fields. For example, how has the study of fractals
contributed to science?
- Research chaos theory. How does it relate to fractals?
- Research several careers that depend heavily upon mathematics.
What mathematics courses do you need to take in high school to prepare
for these careers?
Conclusion
Here are some ideas for concluding your project.
- Present your project to your class or at a family night. Have parents
and students work on a historic problem relating to the topic you chose
to research.
- Present the information on a Web page. Have other students critique
your project and help you to make improvements to your project.
- Write a one-page summary of your project, including what you have
learned from researching the history of a geometric topic.
Questions
Lesson 4–6
Hans is looking on the Internet for geometry
topics in Chapter 4. In his research he finds that Thales of Miletus,
a Greek mathematician and philosopher, is credited with three important
geometric ideas from Chapter 4 of his textbook.
1) The base angles of an isosceles triangle are equal.
2) Two triangles are congruent if they have two angles and the included
side equal.
3) An angle in a semicircle is a right angle.
Hans plans to include a proof of 3, as shown below, in his geometry
project.
- Complete the proof by filling in the reason for each statement.
Lesson 5–1
In his Internet research, Paulo found a history
of the Nine-Point Circle. This geometric figure has sometimes been attributed
to mathematician Leonhard Euler in the 1700s. However, others attribute
it to Karl Feuerbach, who published a proof about the circle in 1822.
Paulo plans to include the construction of a Nine-Point Circle in his
geometry project.
- Carefully follow the steps below to construct your own Nine-Point
Circle. After you have located and labeled the points in each step,
erase any extra lines to avoid confusion.
- Draw a large, acute, scalene triangle and label the vertices X,
Y, and Z.
- Construct the perpendicular bisectors of the sides of the triangle.
Label the midpoints of the sides A, B, and D. Label
the point where the perpendicular bisectors intersect as C,
the circumcenter.
- Using the midpoints A, B, and D, draw
the medians of the triangle. Label the point where the medians intersect
as E, the centroid.
- Construct the altitude from each vertex to the opposite side.
Label the points where the altitudes intersect the sides as H,
J, and K. Label the point where the altitudes meet
as O, the orthocenter.
- Draw the segments
  
- Construct the angle bisector of each angle of
 XYZ.
Label the point of intersection of the angle bisectors as I,
the incenter.
- Draw
- Draw a circle with center T and radius AT.
- If you have done the constructions very carefully, the points
A, B, D, H, J, K, L, M, and N should lie on (or
very close to the circle).
- Construct two more Nine-Point Circles, one for a right triangle
and one for an obtuse triangle.
- Write several sentences comparing the Nine-Point Circle for an
acute, a right, and an obtuse triangle.
Lesson 6–6
Mercedes is researching fractals for her project.
She has learned that Warclaw Sierpinski, a Polish mathematician, is
credited with introducing the Sierpinski Triangle, or gasket, in 1916.
Later, Benoit Mandelbrot worked further with this well-known fractal.
Mercedes plans to include a problem about the Sierpinski Triangle in
her project. To make a Sierpinski Triangle, start with an equilateral
triangle (Figure 1). Connect the midpoints of the sides of the triangle.
Remove the middle triangle (white), leaving three colored triangles
(Figure 2). Repeat this process. The four figures below show how the
process continues.
- Suppose the area of the first triangle is 16 square units. Find
the total area of the colored triangles for the next three figures
shown above. (Hint: Notice that in the second figure, one-fourth
of the large triangle is to be cut out.)
- How does the area of the colored triangles change as more and more
triangles are cut out of the original triangle?
- Suppose the side length of the first triangle is 8 units. Find
the total perimeter of the colored triangles for each of the four figures
shown above.
- How does the perimeter of the colored triangles change as more
and more triangles are cut out of the original triangle?
Lesson 7–1
Shonny has decided to research geometric mean
for her project. She discovers that the ancient Greeks, possibly even
Pythagoras, used a mean called the golden mean (also called the golden
ratio or golden section.) A rectangle formed using the golden mean was
often used in art and architecture as it was thought to be pleasing
to the eye. The diagram shows a line segment that has been divided such
that the ratio of the shorter portion to the longer portion is the golden
ratio.
- For the above segment, let x represent the longer segment.
To find the golden ratio, write a proportion such that the longer of
the two segments is the geometric mean between the shorter segment
and the entire segment.
- Use the Quadratic Formula to solve the proportion for x.
Find the value in both radical and decimal form.
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