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Post by ;) Vizthum on May 11, 2007 8:53:25 GMT -5
At Peary Middle School Math tends to be the lowest subject on the State tests. Today we will be looking at math skills 1. What were the names of the two ancient cultures that are believed to have first known about the existence of pi? mathforum.org/dr.math/faq/faq.pi.html2. What University have Jen Peck, Karen Rosser, and Carol Pifer worked for to develop webpages about the connections between mathematics and art, calculating grades, cooking, shopping, and travel: mathforum.org/dr.math/faq/faq.why.math.html3. By the end of what year had Sir Isaac Newton "worked out the corpuscular or emission theory" of how the effects of light are really produced? www.maths.tcd.ie/pub/HistMath/People/RBallHist.html4. What is the 14th way to reduce gender inequities in mathematics suggested by the American Association of University Women? www.ncrel.org/sdrs/areas/issues/content/cntareas/math/ma100.htm5. What is a hamiltonian path in a graph? www.c3.lanl.gov/mega-math/gloss/graph/grham.html6. What are two of the objectives of "Observation, sorting, predicting, using valentine candy?" What grades is this lesson appropriate for? ofcn.org/cyber.serv/academy/ace/math/elem.html7. What are two advantages student Ruthy Googins describes about using the internet in the classroom? mathforum.org/mathmagic/ToC.html8. What is a dodecagon? (Hint: Look under Archimedes' calculation of pi) www.ima.umn.edu/~arnold/graphics.html9. How does Gene Klotz believe the world-wide web has (and is continuing to) change the world of mathematics? (look under section 2, Conclusions.) mathforum.org/articles/epadel/
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Post by q on May 11, 2007 11:12:13 GMT -5
[color=Tealteal[/color]
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Post by galin on May 11, 2007 11:18:22 GMT -5
1.cowboys 2.U.S.C. 3.2002 4. 5.apath that passes through a vertex 6. 7. 8.something 9.i dont know
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Post by q on May 11, 2007 11:21:51 GMT -5
teal
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Post by Nayely Ortega on May 11, 2007 11:24:07 GMT -5
1) Egyptians and Babylonians 2) Richmond 3) 1727 4) 5) in a graph is a path that passes through every vertex 6) observe, predict 7) it interests the students 8)
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Post by Belen Eneque on May 11, 2007 11:26:17 GMT -5
1. Egyptians and the Babylonians 2.University of Richmond 3.1727
4.
5.a path that passes througha vertex
6.
7.They could actually see the other person: what they looked like, and what they wore to school. They were also able to hear each other speaking. It was almost like both students were actually classmates helping each other out in the classroom.
8.its a polygon with exactly twelve sides
9.Probably not in your academic life, even if you're at an Internet-challenged institution -- there's government pressure to get schools online and colleges are the recipients of all sorts of strange support (e.g. last year our admissions office discovered the Web and fired our president up to lead the charge to get us a Web page).
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Post by Jovana Hernandez on May 11, 2007 11:26:40 GMT -5
1.Babylonians and Egyptians. 2.Department of Mathematics and Computer Science at Saint Louis University.. 3.By the end of 1675 he had worked out the corpuscular or emission theory 4.Start teaching high-level mathematics in primary grades 5.A path that passes through every vertex in the graph exactly once. 6.Its appropriate for grades 1-4 7.It eliminates the boring black and white pages of an old beat up textbook. 8.12 sided polygon 9.
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Post by Cathy nguyen on May 11, 2007 11:26:57 GMT -5
1. Egyptians and Babylonians. 2. Department of Mathematics and Computer Science at Saint Louis University. 3. By the end of 1675. 4. Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability. 5. It is a path that passes through every vertex in the graph exactly once. 6. It is appropriate for grades 1-4. 7. An advantage of cyberspace is that it eliminates the boring black and white pages of an old, beat up textbook. Another advantage is that if students find it hard to pay for rooms and and board while in college, they can take AP classes on the computer with their teachers. 8. 12-sided polygons. 9.
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Post by Estrada Cenllase on May 11, 2007 11:27:25 GMT -5
- Egyptians and the Babylonians
2. What University have Jen Peck, Karen Rosser, and Carol Pifer worked for to develop webpages about the connections between mathematics and art, calculating grades, cooking, shopping, and travel:
- University of Richmond
3. By the end of what year had Sir Isaac Newton "worked out the corpuscular or emission theory" of how the effects of light are really produced?
- 1675
4. What is the 14th way to reduce gender inequities in mathematics suggested by the American Association of University Women?
- Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability
5. What is a hamiltonian path in a graph?
- A path that passes through every vertex in the graph exactly once.
6. What are two of the objectives of "Observation, sorting, predicting, using valentine candy?" What grades is this lesson appropriate for?
- 1. observe, predict, sort, and classify
- 2. develop graphing skills such as counting and equations
- 3. gather and record data
- 4. interpret data
- 5. apply and generalize data
7. What are two advantages student Ruthy Googins describes about using the internet in the classroom?
- Quote: It, of course, has made life easier for many, but more importantly, it is making a huge impact on education. It makes learning much more fun, interesting, and ultimately more educational. I mean no disrespect to my pre-cal teacher, but I have to be honest. The thought of a guy in Hawaii tutoring me for a pre-cal test sounds quite interesting. Cyberspace gets students talking and interacting. The embarrassment of raising your hand to ask the teacher to "please explain that one more time" is gone. It's much easier to ask classmates.
- Quote: Another advantage of cyberspace is that it eliminates the boring black and white pages of an old, beat up textbook. Cyberspace can help students visualize what they are studying and help them get a better understanding of the material.
8. What is a dodecagon?
- twelve sided polygons
9. How does Gene Klotz believe the world-wide web has (and is continuing to) change the world of mathematics?
- She thinks it is helping us get better, or worse at math
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Post by Terrel Emerson on May 11, 2007 11:27:49 GMT -5
1.Egyptians and Babylonians
2.School of mathematics and computer science in ST.Louis
3.May 28,1665
4.Teaching high level mathematics
5.it is a path that passes through every vertex in the graph exactly once.A hamiltonain path does not necessarily pass through all the edges of the graph,however.
6.1-4 and observe,predict,sort ,and classify and develop graphing skills such as counting and equations,gather and record data,interpret data,and apply and generalize data
7.They can see each other and they can help teach each other
8.dodecagon-to get more precise estimates we use polygons with more sides.With dodecagons(12-sided polygons)
3.000<pi>3.215
9.Because it is a computeer and it gives you the answer while breaking it down
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Post by elizabeth sanchez on May 11, 2007 11:28:13 GMT -5
1. Egyptian and Babylonianas. 2. University of Richmond 3. 1675 4. Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability. 5. path that passes through every vertics of the graph exactly one 6. 1. observe, predict, sort, and classify
2. develop graphing skills such as counting and equations
3. gather and record data
4. interpret data
5. apply and generalize data
7. cyberspace is that it eliminates the boring black and white pages of an old, beat up textbook. Cyberspace can help students visualize what they are studying and help them get a better understanding of the material.
8. 12 sided polygons
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Post by Jeremy hewitt on May 11, 2007 11:28:22 GMT -5
1.Babylonians and Egyptians. 2.Department of Mathematics and Computer Science at Saint Louis University.. 3.By the end of 1675 he had worked out the corpuscular or emission theory 4.Start teaching high-level mathematics in primary grades 7.They could actually see the other person: what they looked like, and what they wore to school. They were also able to hear each other speaking. It was almost like both students were actually classmates helping each other out in the classroom. 8.its a polygon with exactly twelve sides 9.Probably not in your academic life, even if you're at an Internet-challenged institution -- there's government pressure to get schools online and colleges are the recipients of all sorts of strange support (e.g. last year our admissions office discovered the Web and fired our president up to lead the charge to get us a Web page).
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Post by Samantha Patino on May 11, 2007 11:28:31 GMT -5
1. The Egyptians and the Greeks.
2. ---.
3. 1675.
4. Eliminate health disparities.
5. Its a path in an undirected graph that visits each vertex exactly once.
6. Developing graphing skills and it's appropiate for grades 3-5.
7. ---.
8. It's a polygon with 12 sides.
9. ---.
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Post by amanda ruiz on May 11, 2007 11:29:02 GMT -5
1.Egyptians and Babylonians. 2.Richmond university 3.1675 4.Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability. 5.path that passes through every vertex in the graph exactly once. 6.observe,predict,sort,and classify. develop graphic skills such as counting and equations.grades 1-4 7.Another advantage of cyberspace is that it eliminates the boring black and white pages of an old, beat up textbook. Cyberspace can help students visualize what they are studying and help them get a better understanding of the material. 8.12 sided polygons
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Post by Tamia Leavell on May 11, 2007 11:29:47 GMT -5
1. The Egyptians and the Babylonians. 2. The University of Richmond. 3. The year of 1665. 4. Involve parents as partners in the mathematical education of their children. 5. A path that passes through every vertex in the graph exactly once. 6. Gather and record data; interpret data; and appropriate for grades 1-4. 7. Decisive influence on student interest in not only mathematics, but in reading and writing. 8. 12-sided polygon. 9. There's government pressure to get schools online and colleges are the recipients of all sorts of strange support.
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Post by sedale thompson on May 11, 2007 11:31:34 GMT -5
1.Egyptians and the Babylonians 2.Saint Louis University 3.1675 4. 5.a path that passes through every vertex in the graph exactly once 6. 1.observe, predict, sort, and classify2.develop graphing skills such as counting and equations 7.it is provided before, during, and after school. Tutoring is provided in the evening. 8. 9.
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Post by mayela roman on May 11, 2007 11:32:46 GMT -5
1.Egyptians and the Babylonians
2.university of richmond
3.1727
4.The 14th way is:"Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability.''
5. Path that passes through a vertex
6.It is appropriate for grades 1-4.
7.An advantage of cyberspace is that it eliminates the boring black and white pages of an old, beat up textbook. Another advantage is that if students find it hard to pay for rooms and and board while in college, they can take AP classes on the computer with their teachers.
8.12-sided polygons.
9.
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Post by alan manalang on May 11, 2007 11:34:37 GMT -5
1. Egyptians and the Babylonians 2. the department of mathematics and computer science at St. Louis University 3. by the end of 1675 4. Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability 5. A hamiltonian path in a graph is a path that passes through every vertex in the graph exactly once. 6. observe, predict, sort, classify, develop graphong skills such as counting and equations, gather and record data, interpret data, and apply and generalize data B) grades 1-4 7. an advantage for using the internet is that it eliminates the boring, black and white pages of an old textbook, and another advantage is students can visualize the material to better understand the material 8. a dodecagon is a 12 sided polygon 9. Probably not in your academic life, even if you're at an Internet-challenged institution -- there's government pressure to get schools online and colleges are the recipients of all sorts of strange support
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Post by Guzman Omar on May 11, 2007 11:34:56 GMT -5
1) What were the names of the two ancient cultures that are believed to have first known about the existence of pi? - The two ancient cultures are Egyptians And Babylonians.
2) What University have Jen Peck, Karen Rosser, and Carol Pifer worked for to develop web pages about the connections between mathematics and art, calculating grades, cooking, shopping, and travel: - The department of mathematics and computer science and St. Louis.
3) By the end of what year had Sir Isaac Newton "worked out the corpuscular or emission theory" of how the effects of light are really produced? - By the end of 1675.
4) What is the 14th way to reduce gender inequities in mathematics suggested by the American Association of University Women? - Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability.
5) What is a hamiltonian path in a graph? - A path that passes through every vertex in the graph exactly once.
6) What are two of the objectives of "Observation, sorting, predicting, using valentine candy?" What grades is this lesson appropriate for? - develop graphing skills such as counting and equations. gather and record data. interpret data. apply and generalize data. - 1-4
7) What are two advantages student Ruthy Googins describes about using the internet in the classroom? - He said, "Advantage of cyberspace is that it eliminates the boring black and white pages of an old, beat up textbook." - The other advantage is that they can help the m visualize better and understand better. 8) What is a dodecagon? - 12 sided polygon
9) How does Gene Klotz believe the world-wide web has change the world of mathematics? - "Probably not in your academic life, even if you're at an Internet-challenged institution -- there's government pressure to get schools online and colleges are the recipients of all sorts of strange support."
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Post by keirra v on May 11, 2007 11:35:44 GMT -5
1.egiptions and babylionians
2.saint louis university
3.1642-1742
4.study
5.a graph is a path that passes throu every vertex in a graph exacly once.
6.sleeping
7.math and work.
8.pi
9.because of math
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Post by Raul Ocegueda on May 11, 2007 11:36:24 GMT -5
1. What were the names of the two ancient cultures that are believed to have first known about the existence of pi? - The two ancient cultures that are believed to have the first known about the existence of pi are Egyptians and the Babylonians.
2. What University have Jen Peck, Karen Rosser, and Carol Pifer worked for to develop webpages about the connections between mathematics and art, calculating grades, cooking, shopping, and travel: - Department of Mathematics and Computer Science at Saint Louis University
3. By the end of what year had Sir Isaac Newton "worked out the corpuscular or emission theory" of how the effects of light are really produced? - By the end of 1675 Sir Isaac Newton worked out the emission theory
4. What is the 14th way to reduce gender inequities in mathematics suggested by the American Association of University Women? - Start teaching high-level mathematics in primary grades; use specific terms, such as geometry and probability.
5. What is a hamiltonian path in a graph? - A hamiltonian path in a graph is a path that passes through every vertex in the graph exactly once
6. What are two of the objectives of "Observation, sorting, predicting, using valentine candy?" What grades is this lesson appropriate for? - It is appropriate for grades 1-4
7. What are two advantages student Ruthy Googins describes about using the internet in the classroom? - It eliminates the boring black and white pages of an old, beat up textbook. All locations being the same distance in cyberspace, the student would be in a classroom virtually without walls
8. What is a dodecagon? - A dodecagon is a polygon with 12 sides
9. How does Gene Klotz believe the world-wide web has (and is continuing to) change the world of mathematics? (look under section 2, Conclusions.) - There's government pressure to get schools online and colleges are the recipients of all sorts of strange support.
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Post by Sarahi Cordero on May 11, 2007 11:41:51 GMT -5
1.Were the names of the ancient cultures are know as that ancient Egyptians and the Babylonians. 2.Jen Peck, Karen Rosser, and also Carol Pifer, Math Education students at the Unverstity of Richmond,have put together a series of Web pages called " What Good is Math?" talking about the connections between mathmatics and art,cacluating grade, cooking, shopping,sports,and travel. 3.Mathmactics science then studied, as well as to create some new sujects,1665,and 1686. 4.It takes many goals and actions implem ntation. 5.A hamiltonian path that passes through every vertex in the graph excatly onc. 6.a. observe,predict,sort,and classify b. develop graphing skills such as counting and equations c. gather and record data d.interpet data e. apply and generalize data.
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Post by DauNisha on May 11, 2007 11:47:39 GMT -5
1.The names of the two ancient cultures are the Egyptians and the Babylonians. 2.They have worked for the University of Richmond. 3.Sir Isaac Newton worked out the emission theory by the end of 1675. 4.The 14th way to reduce gender inquities in math suggested by the AAUW is 5.A hamiltonian path in a graph is a path that passes through every vertex in the graph exactly once. 6.Two of the objectives of observation,sorting,and using valentine candy is gather and record data.This lesson is appropriate for grades 1-4. 7.Two advantages Ruthy Googins describes are students communicating with each other on the computer and they could see each other. 8.A dodecagon is a twelve-sided polygon. 9.
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Post by Sergio Cervantes on May 18, 2007 11:30:50 GMT -5
1. What were the names of the two ancient cultures that are believed to have first known about the existence of pi? - The two ancient cultures that are believed to have the first known about the existence of pi are Egyptians and the Babylonians. 2. What University have Jen Peck, Karen Rosser, and Carol Pifer worked for to develop webpages about the connections between mathematics and art, calculating grades, cooking, shopping, and travel: - Department of Mathematics and Computer Science at Saint Louis University 3. By the end of what year had Sir Isaac Newton "worked out the corpuscular or emission theory" of how the effects of light are really produced? - By the end of 1675 Sir Isaac Newton worked out the emission theory .May 28,1665 4.Teaching high level mathematics 5.it is a path that passes through every vertex in the graph exactly once.A hamiltonain path does not necessarily pass through all the edges of the graph,however. 6.observe,predict,sort,and classify. develop graphic skills such as counting and equations.grades 1-4 7.Another advantage of cyberspace is that it eliminates the boring black and white pages of an old, beat up textbook. Cyberspace can help students visualize what they are studying and help them get a better understanding of the material. 8.12 sided polygons
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