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In lugnet.edu, James Trobaugh wrote:
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In lugnet.announce, Duane Collicott wrote:
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I am very proud to announce that Bricks for Brains
(www.BricksForBrains.org) has just received word from the IRS that our
application for tax-exempt status has been approved.
This will open doors for us in areas such as facility usage, grants,
partnership with museums and educational institutions, donations, fund
raising, and more.
Bricks for Brains is an organization through which I do educational work
with LEGO. We have formed our board, achieved 501c3 tax-exempt status, and
now we move on to designing and implementing more hands-on exhibits and
other educational services and products.
We are quite excited!
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Congradulations, thats very cool. Now is your Bricks for Brains and this
Bricks for Brains the same?
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Thanks!
No thats somebody else. I had hoped he would stop using it after I brought it
to his attention last year.
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In lugnet.announce, Duane Collicott wrote:
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I am very proud to announce that Bricks for Brains
(www.BricksForBrains.org) has just received word from the IRS that our
application for tax-exempt status has been approved.
This will open doors for us in areas such as facility usage, grants,
partnership with museums and educational institutions, donations, fund
raising, and more.
Bricks for Brains is an organization through which I do educational work with
LEGO. We have formed our board, achieved 501c3 tax-exempt status, and now we
move on to designing and implementing more hands-on exhibits and other
educational services and products.
We are quite excited!
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Congradulations, thats very cool. Now is your Bricks for Brains and this
Bricks for Brains the same?
|
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I am very proud to announce that Bricks for Brains (www.BricksForBrains.org)
has just received word from the IRS that our application for tax-exempt status
has been approved.
This will open doors for us in areas such as facility usage, grants, partnership
with museums and educational institutions, donations, fund raising, and more.
Bricks for Brains is an organization through which I do educational work with
LEGO. We have formed our board, achieved 501c3 tax-exempt status, and now we
move on to designing and implementing more hands-on exhibits and other
educational services and products.
We are quite excited!
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Lego Bible Study went well. Though folks were very eager to learn more about
our construction clubs, I managed to keep us focused on the textual
deconstruction at hand. Unfortunately, a young person showed up, so I couldnt
spend as much time on the bawdy stuff as I would have wanted. Oh, well. If we
had everything, where would we put it? And how long would it take to sort it
all?
I threw together a Moses amongst the bullrushes play set:
and a Jesus of Nazareth minifig:
He rode along in my nametag all Easter morning.
Happy Easter, all!
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In lugnet.technic, Edward Welsh wrote:
> > The internal angles on a 3-4-5 right triangle
> > are 30, 60, and of course 90 degrees.
>
> And now a teachable moment! You've made my week!
Yeah, about 5 minutes after I submitted that I realized just how stupid I've
become as of late (I plead mercy due to a very nasty sinus infection... but dang
it, I should have caught that even if I was unconcious). What will make it even
funnier (for you) is that I'm a physicist by training, so it's not like I don't
know this stuff. Groan...
--
Brian "ignorance always looks better in public" Davis
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In lugnet.technic, Joe Strout wrote:
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Im trying to make a largish... octagon or hexagon out of
technic parts.
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A 12-12-17 triangle is very nearly right, and has angles of about 44.9 degrees.
I used four of them in making a stop sign:
Note that all eight corners are nicely studded down.
Joe and Brian wrote:
Well whaddaya know! Id always assumed those things were 135 degrees. Looks
like I learned something today. Brian, many thanks for the terrific Lego
geometry links I did not know about. You made my day.
Brian Davis wrote:
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The internal angles on a 3-4-5 right triangle are 30, 60, and of course 90
degrees.
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And now a teachable moment! Youve made my week! As DaveE alludes elsewhere in
this thread, a 3-4-5 triangle has angles of about 36.87, 53.13, and 90 degrees.
Making one of these triangles is a great way to build a strong right angle. A
triangle with angles of 30, 60, and 90 degrees is a different animal: half an
equilateral triangle. It can help in making a regular hexagon. Unfortunately,
at least one of its sides must have a funny (irrational) length, so it isnt the
easiest thing to build in brick or technic.
-Teddy
p.s. I must admit that when I first read Brians statement, I made a noise so
horrible my colleagues here in the math department wondered if I was ill. Dont
worry. Ill be fine. Eventually.
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In lugnet.edu, Edward Welsh wrote:
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Last spring, my colleagues got funding for two shiny display cabinets for my
math department. Appropriate displays were just slow enough in coming that I
could (quickly) haul out several of my Lego math demonstration models and
fill an entire case with them:
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Awesome... I love seeing Lego used in manners such as this. Spotlit.
Janey Math is hard, lets go shopping, Red Brick
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Last spring, my colleagues got funding for two shiny display cabinets for my
math department. Appropriate displays were just slow enough in coming that I
could (quickly) haul out several of my Lego math demonstration models and fill
an entire case with them:
Home Plate
This familiar-looking shape does not actually exist. Look at the triangle on
the bottom. (Use the dashed black line as its long side.) The side lengths of
12, 12, and 17 do not obey the Pythagorean Theoremcheck 12^2+12^2 and 17^2.
However, its very, very nearly a right triangle, so we let it slide.
Turned Squares
Here are two squares. Look at the larger one. If you include the white dotted
lines, you can see that the larger square is made up of four right triangles
whose sides are very, very close to 12-12-17. These numbers were obtained using
a continued fraction.
The smaller square is made up of four 6-8-10 right triangles and one 2 by 2
square. The yellow and blue triangles are illustrated with dotted lines. Of
the five polygons in the display, this is the only one whose linear measurements
are all integers.
Equilateral Triangles
Here are two equilateral triangles. The triangle with sides of length 9 does
not work well in Lego. Its altitude is about 7.794not an integer valueso its
top vertex (where yellow and red meet) is not near a grid point, so it cannot
connect to the gray baseplate.
The triangle with sides of length 15 does work well. Its altitude is about
12.99very close to 13so its top vertex (where blue and yellow meet) connects
solidly to the gray baseplate.
Blue Wave
This wavy object is generated by the function z=5cos(x^2+y^2)+6. In Calculus
II, we learn how to find the size of one slice; in Calculus III we learn how to
slice up the entire object and find its volume.
Attention: Dr. Masi, Dr. Masi to the fourth floor.
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I'm cross-posting this to .robotics for you.
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http://www.legoengineering.com/content/view/78/65/
LEGOengineering.com's newest survey focuses on how educators manage LEGO-based
learning.
We want to know how educators facilitate student learning in activities that use LEGO materials. How do LEGO activities help you meet academic requirements? How do you choose activities? How do you introduce activities? How do you keep students on task during a LEGO activity?
Take the latest survey and help us summarize how educators are managing LEGO
learning in the classroom.
Survey results will be published in Fall 2007.
Merredith Portsmore
merredith@legoengineering.com
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