(Originally published on the Math Reasoning Web site . Republished here with permission from the author, Vern Williams.)
A very short story by Vern Williams. One night I walked into the 4 3/8 dimension and actually believed the following:
- We should write about math but never do math.
- Correcting students' papers using red ink is a threat to children's self esteem and that red pens should be banned from all public schools.
- Howard Gardner was right about his multiple intelligence theory (I think that he claims about nine at the moment) and that schools should value bodily-kinesthetic ability and the intelligence of self as much as mathematical and linguistic ability.
- The war on intellectual excellence is a great thing. It will make us all equal.
- Teachers Unions are actually concerned about students.
- Advanced courses and gifted programs should be banned because they are elitist and unfair. Since everyone is gifted in their own way (see Howard Gardner), why have special gifted programs?
- There are no bored students in US public schools.
- We can teach thinking even when there is no content to think about.
- We should treat members of politically protected minority groups as victims.
- We should never view our students as individuals but as members of racial and ethnic groups.
- We should buy into the latest educational fad even if it's based on political correctness and has nothing to do with learning or common sense.
- There is no money wasted on administration, specialists, and useless programs. In fact, we should have more of each.
- I should join the NCTM.
- I should join the NEA.
- I should feel guilty because I teach smart kids.
- I should feel really guilty because I enjoy teaching smart kids.
I now offer an excerpt from a final reflection that I wrote for a graduate course that I took at George Mason University in 2004 titled Strategies and Models for Teaching the Gifted.
All of the models that I encountered in this course were either made up, i.e. Gardner and Sternberg, or the creator took an obvious set of routine teaching strategies and turned them into complex systems complete with special language, charts (If I see one more chart, I really will scream!!) and theories. An excellent example would be my second lesson plan on Spherical Geometry. I know that the lesson is perfect for GT students. How do I know? I taught it. It took me fifteen minutes to write for you and three to four hours to relate it to the models and strategies. In addition, I had to add to the lesson to make it fit some of the models and yet, the parts that I added, I would never teach. Imagine if I were creating the lesson from scratch and attempted to use one or more of the models as a framework. I would go out of my mind. I could plan and write the lesson in a half hour using common sense or five hours using a model. There is one curriculum model that needs to be included in every college GT course, "The Common Sense Approach." Bruner and Van Tassel Baska had the two common sense models, but again, they made them complicated.
OK, I need to offer some solutions. I already mentioned one, use an excellent textbook written for very bright students. I always use the following as a guide when I teach gifted students. Am I teaching content to them in a way that I cannot teach it to average students? If the answer is no, then you are not teaching a GT curriculum regardless of the model or strategy being used. Am I teaching very advanced, new, and difficult material that cannot be taught to average students in a reasonable time period? If the answer is no, a model won't cure this, only an in depth knowledge of content and an excellent textbook will. Do I find the material challenging and interesting? If I don't, they won't. Do I recognize and appreciate their brilliance and their advanced quirky sense of humor? If the answer is no, do you really think that a complex curriculum model will help?
Here is the perfect college GT curriculum course.
Offer a series of GT courses that are discipline specific. Specify and in some cases have students learn the content that is appropriate for gifted students in various grades. Have a selection of excellent textbooks such as Unified Math that offer rigorous content for GT students. The class should study, analyze, and discuss them. Have students observe GT students in action, or if logistics are a problem, have panels of GT students visit the class to discuss topics, content, and teaching methods that really challenge and interest them. Have a visiting panel of adults who were enrolled in gifted programs. Wouldn't you love to hear their suggestions for the perfect GT course? Don't smother the class with complex fog such as June Maker's book. That book would cripple a true GT learner. I'm a strong proponent of divergent thinking but I also like for things to make sense.
Here are some important observations and requests of their teachers from many of my GT students over the years.
- Don't review last year's material for the first two months of school.
- Give us a few hard problems instead of a bunch of easy ones.
- Stop assigning so many projects especially when routine content is involved.
- Recognize our creativity and higher level thinking skills. Stop judging us only on the ability to follow directions.
- Don't take it personally when your lesson doesn't interest us.
- Find new, difficult, strange, and exciting content and teach it to us. We will make the mental leaps and provide our own extensions. Just teach us some real content.
- Please provide us with teachers who truly know their content and who love their subject area.
- Please appreciate and relate to our sense of humor.
- Allow us to challenge our teachers as long as there is no disrespect intended.
- Provide us with teachers who have the confidence to accept our academic challenges and treat them as a positive.
- Please note that some of us love learning but hate school. Try to understand why or just ask us.
- Please take us out of groups of four. When two of the four of us cooperate and do all of the work, it's not cooperative learning.
- Allow us to help you teach and offer clever alternative solutions but please, you be the teacher. Don't be the guide on the side. Teach us!
- Know when going off on a tangent is a good thing.
- Know your content well enough so that if we ask an intriguing question, you might change your lesson plan on the spot.
- Don't make us waste our time reading in English class while the teacher is checking e-mail. We read all the time outside of school and we would much rather spend our time analyzing, debating, and learning.
- Please provide us with teachers who are not jealous of our exceptional intellect.
- Provide us with teachers who enjoy teaching GT students including the quirky disorganized but brilliant ones who most teachers write off.
Oh, I could go on and on with their comments but you did say something about spending three hours. I could spend three days just discussing their comments. Let me just say that discussing those 18 points would be the best GT course that money could buy. No Gardner, no Sternberg, just the real world of teaching intellectually gifted students.
You will note that most of the models [in the graduate course] have three major themes:
- The teacher should not be the center of the universe.
- There should be an overreaching theme or concept.
- The lesson should be interdisciplinary and real world applications should be involved.
First of all, the teacher should be the sage on the stage. GT students are capable of learning and doing an incredible amount on their own. They learn about their world faster than 99% of all students in their age group. They expect their teacher to provide them with something that perhaps they can't learn or do on their own. Our job is to stand in front of them and offer our wisdom, experiences, and our in depth knowledge of content. Yes, when they are in my classroom, I am the center of their universe because I actually have something to offer them.
As for themes, concepts, and applications and connections, they must occur naturally. GT students have complained about teachers rigging lessons to make them connect to other disciplines. When I use a piece of vocabulary that the students learned in another subject area, the smiles are everywhere. Wow, you really are part of the real world. If it had been contrived, you would never get that neat reaction.
I would like to end my reflection with a comment and then a lesson that happened purely by accident.
My comment concerns you. The most important thing that I learned from EDCI 623 was the comment that you made concerning how one of your daughter's teachers could not relate to the GT class because of a large intelligence disconnect. I had never considered the importance of at least being intellectually in the same ballpark with your GT students until you made that comment. After giving it a lot of thought, I think that it is profoundly important. At many schools, GT students are in a constant war with their teachers. Now this would be a perfect piece of research for someone like Gardner to pursue instead of wasting his time inventing intelligences.
I leave you with an example of how GT students learn.
At times, I would use vocabulary in my first period class that the students had not been exposed to. For instance, tyro and ilk were unknown to them. After a while, they assumed that I started making words up, so they would check them in a dictionary that was kept on one of my bookshelves. I would of course define the word before they looked it up and I was always correct. They were impressed that a math teacher knew vocabulary. Two students asked if they could take the first five minutes of each class to present one SAT type word and discuss its origins with the class. I agreed and the result was amazing. The students were enthused, I was enthused, and we learned some very nifty words. At the end of the grading period, the two students wrote a vocabulary quiz based on the selected words and of course I was asked to take it along with the class. I am proud to announce that I tied for fifth out of thirty-one on the quiz. Oh yes, the top six scorers were listed on the board. The students received extra credit and I could brag about tying with a student who reads twenty-four hours a day.
I mention this piece of learning to reinforce the notion that the best learning occurs when it's not contrived or related to some obscure theme. This lesson occurred purely by accident starting with words spoken by their center of the universe, their teacher.
Vern Williams is a math teacher at Longfellow Middle School, Fairfax, VA. In addition to teaching Honors Math to students in the Gifted Talented Center program, he teaches algebra/geometry in a one-year, two-credit course he developed. He also offers math reasoning courses and math enrichment during the summer months and during the school year. He was named to the National Mathematics Advisory Panel in 2006. On March 27, 2011, he published a brief commentary for the New York Times titled "Let us Teach!"
For more about Vern Williams, see his Web site:
http://www.mathreasoning.com/index.html
Note from Laurie Rogers: If you would like to submit a guest column on public education, please write to me at wlroge@comcast.net. Please limit columns to not more than 1,000 words. Columns might be edited for length, content or grammar. You may remain anonymous to the public, however I must know who you are. All decisions on guest columns are the sole right and responsibility of Laurie Rogers.
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