Saturday, November 27, 2010
How Big Is That Cockroach?!
We have had a minor influx of these critters inside the house. At about one and a half inches long this one is typical. You should hear the crunching sounds when I step on them. -Earl
Thursday, November 25, 2010
Straight Lines, Square Corners
When I was in middle school the boys were introduced to mechanical drawing using rulers, t-squares, triangles, and pencils. Later as a senior in high school I opted for a shop class in mechanical drawing. We were required to draw in units as small as 1/16 of an inch. Considering that all of the work in those days was done by hand, a lot of precision was expected and taken for granted.
In my computer studies classes here I have been teaching something called a "block diagram", an example of which is pictured. On the blackboard I just quickly sketch the diagram by hand. But our Tanzanian students invariably pull out their rulers and carefully draw boxes with straight lines and squared corners in order to make a copy in their notebooks. I would think, "why bother, all you need is a sketch to record the idea."
Maybe the answer is that in this part of the world people do not "naturally" think in terms of straight lines and ninety-degree angles. After all, how often do you see those in the natural environment?
However, thanks to the genius of the ancient Greek mathematicians we are thoroughly familiar with both the concepts of a (perfectly) straight line and a (perfectly) perpendicular angle as well as their (imperfect) manifestations. I am composing these words by writing on a table that has a rectangular top and is otherwise built entirely of rectangular pieces of wood. In the U.S. there is a strong preference for city streets to be arranged in a very regular grid pattern (with perturbations to allow for features such as steep hills -- how inelegant of nature). Later I will be typing these words into a computer which will display the text on a screen consisting of, say, a 1024 x 768 rectangular array of pixels.
So I suppose our Tanzanian students are being trained to think in a like manner. Why does this matter? Because straight lines, right angles, rectangles, and other geometric objects are abstractions that serve as very useful mental tools for building models. They are tools that enable us both to more readily create artifacts such as wooden tables and computer screens and also to impose structure, order, and manageability on the natural environment, such as in the form of streets, political boundaries, and coordinate location systems. They provide powerful leverage for spatial thinking.
Thanks to Euclid, to Mrs Hillebrand who was my tenth grade plane geometry teacher, and to the milieu and the intellectual legacy in which I grew up, when I use a rough piece of chalk to sketch a bunch of boxes I automatically, habitually "see" perfect rectangles. -Earl
In my computer studies classes here I have been teaching something called a "block diagram", an example of which is pictured. On the blackboard I just quickly sketch the diagram by hand. But our Tanzanian students invariably pull out their rulers and carefully draw boxes with straight lines and squared corners in order to make a copy in their notebooks. I would think, "why bother, all you need is a sketch to record the idea."
Maybe the answer is that in this part of the world people do not "naturally" think in terms of straight lines and ninety-degree angles. After all, how often do you see those in the natural environment?
However, thanks to the genius of the ancient Greek mathematicians we are thoroughly familiar with both the concepts of a (perfectly) straight line and a (perfectly) perpendicular angle as well as their (imperfect) manifestations. I am composing these words by writing on a table that has a rectangular top and is otherwise built entirely of rectangular pieces of wood. In the U.S. there is a strong preference for city streets to be arranged in a very regular grid pattern (with perturbations to allow for features such as steep hills -- how inelegant of nature). Later I will be typing these words into a computer which will display the text on a screen consisting of, say, a 1024 x 768 rectangular array of pixels.
So I suppose our Tanzanian students are being trained to think in a like manner. Why does this matter? Because straight lines, right angles, rectangles, and other geometric objects are abstractions that serve as very useful mental tools for building models. They are tools that enable us both to more readily create artifacts such as wooden tables and computer screens and also to impose structure, order, and manageability on the natural environment, such as in the form of streets, political boundaries, and coordinate location systems. They provide powerful leverage for spatial thinking.
Thanks to Euclid, to Mrs Hillebrand who was my tenth grade plane geometry teacher, and to the milieu and the intellectual legacy in which I grew up, when I use a rough piece of chalk to sketch a bunch of boxes I automatically, habitually "see" perfect rectangles. -Earl
Wednesday, November 17, 2010
Form 4 Graduation Photos, Aquinas Secondary School, October 2010
Above left, our parish pastor Fr Patrick Mwaya at the lectern. Above right, Rev Fr Gallus Chilamula, Vicar General of Mtwara Diocese.
Above left, Sr Raphaela Haendler, O.S.B., Manager of school. Above right, Mama Opportuna Komba, class teacher for Form 4.
Above left, Diane with graduated student Reinfrida.
Above right, Sr Maureen Cariaga, O.S.B., Headmistress of school.
[ Photos by Roger Angst and myself. -Earl ]
Monday, November 8, 2010
AHAAAAA!
Diane is the moderator of the student art club and is also the school librarian. Consequently, she has put up a lot of student art work on the walls of the little library.
I just love this whimsical drawing of Diane in one of her Tanzanian-made dresses. It was done by Irene, a form two student (like a high school sophomore) who is also pictured here.
Irene is smart and sassy and, I think, a bit of an underachiever. But the reality is that we don't know much about the lives of our students, although we do get snippets of personal information from time to time.
The "AHAAAAA!" refers to Diane's version of "uh-huh" which she says emphatically and with a rising intonation. She uses this constantly, so much so that if I mimic it, students just crack up. -Earl
[Student photo by Roger Angst]
I just love this whimsical drawing of Diane in one of her Tanzanian-made dresses. It was done by Irene, a form two student (like a high school sophomore) who is also pictured here.
Irene is smart and sassy and, I think, a bit of an underachiever. But the reality is that we don't know much about the lives of our students, although we do get snippets of personal information from time to time.
The "AHAAAAA!" refers to Diane's version of "uh-huh" which she says emphatically and with a rising intonation. She uses this constantly, so much so that if I mimic it, students just crack up. -Earl
[Student photo by Roger Angst]
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