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© 2013, by Teacher to Teacher Press www. t t tpress . com
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© 2013 by Teacher to Teacher Press. All rights reserved. As a purchaser of this handout, you have a single-‐user license. You may duplicate student activity pages for your own classroom use only. Any unauthorized duplication of these materials by physical or electronic means or any public performance and demonstration of these materials without prior written consent of Teacher to Teacher Press are strictly prohibited. If you should need written permission, you may contact Teacher to Teacher Press at their website, www.tttpress.com.
© 2013, by Teacher to Teacher Press www. t t tpress . com
þ High interest discovery teaching þ Generalizing arithmetic þ Finding patterns þ Using variables þ Writing algebraic proofs þ Practicing operations with integers
Getting to Know You
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PO Box 233, Millville, CA 96062 Phone: (530) 547-‐4687 Fax: (530) 547-‐4317
By Brad Fulton Educator of the Year
(Voted by the California League of Schools – 2005)
brad@tttpress .com
The Venn Diagram Project
© 2013, by Teacher to Teacher Press www. t t tpress . com
Known throughout the country for motivating and engaging teachers and students, Brad has co-authored over a dozen books that provide easy-to-teach yet mathematically rich activities for busy teachers while teaching full time for over 30 years. In addition, he has co-authored over 40 teacher training manuals full of activities and ideas that help teachers who believe mathematics must be both meaningful and powerful.
Seminar leader and trainer of mathematics teachers ♦ 2005 California League of Middle Schools Educator of the Year ♦ California Math Council and NCTM national featured presenter ♦ Lead trainer for summer teacher training institutes ♦ Trainer/consultant for district, county, regional, and national workshops
Author and co-author of mathematics curriculum ♦ Simply Great Math Activities series: six books covering all major strands ♦ Angle On Geometry Program: over 400 pages of research-‐based geometry instruction ♦ Math Discoveries series: bringing math alive for students in middle schools ♦ Teacher training seminar materials handbooks for elementary, middle, and secondary school
Available for workshops, keynote addresses, and conferences All workshops provide participants with complete, ready-‐to-‐use activities that require minimal preparation and give clear and specific directions. Participants also receive journal prompts, homework suggestions, and ideas for extensions and assessment. Brad's math activities are the best I've seen in 38 years of teaching! Wayne Dequer, 7th grade math teacher, Arcadia, CA “I can't begin to tell you how much you have inspired me!” Sue Bonesteel, Math Dept. Chair, Phoenix, AZ “Your entire audience was fully involved in math!! When they chatted, they chatted math. Real thinking!” Brenda McGaffigan, principal, Santa Ana, CA “Absolutely engaging. I can teach algebra to second graders!” Lisa Fellers, teacher
References available upon request
Brad Fulton E d u c a t o r o f t h e Y e a r
♦ Consultant ♦ Educator ♦ Author ♦ Keynote presenter ♦ Teacher trainer ♦ Conference speaker
PO Box 233, Millville, CA 96062
(530) 547-‐4687 b r a d @ t t t p r e s s . c o m
B r a d F u l t o n
© 2013, by Teacher to Teacher Press www. t t tpress . com
Fast Facts and Fractions: Help students master their multiplication facts and learn simple strategies for taming fractions. Hundreds Magic: An engaging exploration of arithmetic, number sense, algebra, and mathematical reasoning. Number Line: Help students compare and order fractions, decimals, and percents while developing reasoning skills. Safely Navigating Social Networks: Help your students stay safer at home and school. Great for parents and staff Solving Linear Equations: Simple steps and strategies to help your students find success with equations. Multiplying and Factoring Polynomials: Help students learn the seamless way to tackle polynomials. Take Your Places: A rich and engaging activity integrating number sense, operations, probability, and algebra. Integer Strategies: Help students overcome integer operations with these classroom-tested strategies. Teaching 2-Digit Multiplication: Use Conceptual Layering to maximize mathematical skill and reasoning. Leo’s Pattern: Learn how to use conceptual layering to help students transition from simple addition to algebra. Math Projects: Emancipate the intelligence of your students with an authentic assessment and teaching strategy that will
amaze both you and your students. Menu Math: Students from grades two through college have finally made sense of algebra with this clever approach. The Power of Two: Finally students understand exponents, the zero power, and even negative exponents! X Marks the Spot: Practice with the four operations should be engaging, enriching, and empowering. Find out how to
maximize the effectiveness of drill work with this easy approach.
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Getting to Know You As students begin their annual migration from swimming pools and summer camp back to their classrooms, their teachers will be looking for creative and powerful activities to welcome them back. Here I offer a fun activity that so engages students that they don’t even notice that they are doing fractions, decimals, percents, measurement, and data all at the same time! Procedure:
1 On a piece of scratch paper, have students draw three interlocking circles forming seven enclosed regions as shown. Have them number the regions. Region eight is the area outside all three circles. Use the activity master with a document camera or make an overhead transparency to model this.
2 Next they should write a phrase that describes them or one of their interests on each of the three circles. Emphasize that these labels should portray positive characteristics about themselves. I tell my students to make sure that no more than one of the circles represents a physical characteristic as I want them to know each other on more than a surface level.
3 Each student then places a check mark or tally mark in the center region (number 5) since that region is within all three circles described by the three phrases. The Venn diagram should now look like the one shown above.
4 Explain that the students will leave their Venn diagrams on their desks as they go around the classroom and mark the diagrams of other students. For example, if a student likes basketball and is funny, but doesn’t have dark hair, he or she should put a mark in region four. If he or she is funny, but doesn’t have dark hair and doesn’t like basketball, he or she should mark region seven. If none of the traits apply, the student should mark region 8.
5 Allow time for the students to mark the other Venn diagrams. Then ask them to return to their seats to see the results. They will likely be surprised to find out there are other students who share their interests and characteristics. They will
Required Materials: ý Paper ý Rulers Optional Materials: ¨ Copies of Activity Master
and Data Table ¨ Compasses and protractors ¨ Colored pencils
1
6 5 ü
2
7
4
8
3
I have dark hair.
I am funny.
I like basketball.
© 2013, by Teacher to Teacher Press www. t t tpress . com
probably want to know who these people are. If you wish, you can have students sign their names or initials instead of making a mark to make identification possible.
6 Ask the students to get out another piece of paper and divide it into four columns. The first column should be labeled “region,” the second one “fraction,” the third one “decimal,” and the last one “percent.” The leftmost column should then be numbered one through eight and “Total” should be written at the bottom as shown.
7 Next the fraction column is filled in. To do this, the student writes a ratio of the number of marks in region one compared to the total number of marks on the diagram. In the sample Venn diagram shown at the bottom of this page, three of the 29 students who marked the diagram marked region one. This results in the fraction 3/29. The students should do this for all eight regions.
8 Have them convert these fractions to decimals by dividing the numerator by the denominator. This can be done by pencil and paper or by calculator. The decimal should be rounded off to the thousandth place. The decimal for region one rounded to the thousandth place is .103. The students should convert their eight fractions into decimals.
9 The third step is to convert the decimals to percents. This is done by moving the decimal two places to the right and rounding to the nearest whole number. The decimal .103 would become 10%. Have the students convert all eight decimals to percents.
10 Next have the students total each column. Ask them what you should get when you add the eight fractions. The answer for the sample should be 29/29. Ask them what this fraction means. It signifies that all 29 students, or one whole class, has signed the diagram.
11 Ask them what sum they expect to get in the decimal column. Some students may be alarmed
Region Fraction Decimal Percent 1 2 3 4 5 6 7 8 Total
1 üüü
6 üüüü
üüüü
5 üüü üüü
2 üü
7 ü
4 üüü
8 üü
3 üü üü
I have dark hair.
I am funny.
I like basketball.
© 2013, by Teacher to Teacher Press www. t t tpress . com
that they get the answer .999. Ask them why this occurs. It is due to the rounding of the eight decimals and is an acceptable value. Ask them what a total of 1.000 means. Again it means that one whole class has responded.
12 Ask them what they think they will get for the sum of the percents. Although they will likely expect to get 100%, some diagrams may yield a total of 99% or 101%. Again this is due to rounding and is an acceptable margin of error.
13 You may now ask students questions about either their personal Venn diagram or the sample. These questions use logic and and/or statements. Here are three questions about the sample and their explanations:
1) What fraction of the students are funny? Explain your answer.
The fraction is 18/29. Although many students would say the answer is only 1/29, the question includes all students in the funny circle. This would include regions four (students who are funny, like basketball, but don’t have dark hair), five (students who are funny, like basketball, and have dark hair), six (students who are funny, don’t like basketball, but have dark hair), and seven (students who are funny, but don’t like basketball, and don’t have dark hair).
2) What percent of students are funny and have dark hair? Explain your answer. The percent of students who are funny and have dark hair is 48%. Since both conditions must be met, we must include only regions five and six.
3) What is the fraction for the number of students who are funny or have dark hair. In this case, since either condition can be true, we must include all regions in both the funny and dark hair circles. This means we count marks in regions two, three, four, five, six, and seven. Only the five students in regions one and eight are excluded. The fraction is 24/29.
14 For the final presentation copy, have the students neatly draw the three interlocking circles. You may wish to have them trace around a circular object such as a can or roll of masking tape. For advanced students, you may wish to have them construct the Venn diagram using a compass and straightedge.
15 On a second piece of paper, students should make the table by drawing four columns using the following widths as measurements:
1 üüü
6 üüüü
üüüü
5 üüü üüü
2 üü
7 ü
4 üüü
8 üü
3 üü üü
I have dark hair.
I am funny.
I like basketball.
© 2013, by Teacher to Teacher Press www. t t tpress . com
Column 1 2 3 4
Width 1” 1.5” 2” 2” The columns are divided into nine one-‐inch tall rows for the eight regions and the total. This will result in a one-‐inch border around the table as in the accompanying example.
16 The data from the original scratch paper is transferred to this table using neat lettering or stencils. The Venn diagram is also lettered neatly and the marks are transferred. The student should letter their name neatly too. The final project is then colored or decorated as desired. I ask my students to use color-‐coordination to make the project more readable. For example, if region one is colored blue on their project, then line one of the table is also colored blue. For young learners, you may wish to provide them with a copy of the blank Venn diagram rather than have them try to draw it.
Good Tip! C This is a great activity for back to school night. Imagine the parents’ surprise when they see their child’s beautiful work already displayed on the classroom walls.
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1
8 7
5 6 4
3 2
_______________
_______________ _______________
Activity master Name_______________________
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REGION FRACTION DECIMAL PERCENT Data table
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REGION FRACTION DECIMAL PERCENT
1
2
3
4
5
8
TOTAL
6
7
3/29 .103 10%
2/29
4/29
3/29
6/29
8/29
1/29
2/29
29/29
.069
.138
.103
.207
.276
.034
.069
.999
7%
14%
10%
21%
28%
3%
7%
100%
Sample data table
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Sample project (Note: This student’s project has a small mathematical error. The fraction 4/26 should be 0.154 when written as a decimal.)
© 2013, by Teacher to Teacher Press www. t t tpress . com
If you want to have your students construct the Venn diagram with a compass and straightedge, use these instructions and the diagram on the following page.
1. Find a point centered left and right on the 8½” by 11” paper. The point should be about 6” down from the top of the page. This puts the diagram closer to the bottom edge of the paper and allows room for a title.
2. Using this point as the center, lightly draw a 1½” radius circle. 3. Mark a point at the top of the circle. 4. Place the point of the compass on the mark on the top of the circle and draw
an arc on the circumference of the circle. 5. Move the point of the compass to the intersection of the circle and the arc
from step 4 and repeat the step. Do this six times and you should end up at the original top mark from step 3.
6. Put the point of the compass at the first arc (step 4) and draw a circle with a 2½“ radius.
7. Repeat this at arcs three and five to get the three interlocking circles of the Venn diagram.
8. Erase extraneous marks (shown as dotted lines).
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