This Blog exists for the collective benefit of all geometry students. While the posts are specific to Mr. Chamberlain's class, any and all "geometricians" are welcome. The more specific your question (including your own attempts to answer it) the better.
By the way, when you tile a floor with a pattern of repeating geometric shapes, it is called a tesselation. Google M.C. Escher if geometric art and interior design catches your fancy.
quic question, so i am trying to prove theorem (I SPELT THAT RIGHT!!) but, i don't understand it. what does it mean when it says one angel at each vertex?..WORDS ARE SOO CONFUSING!
We'll discuss this theorem in class. "One angle at each vertex" means just that. Do you recall Nora's question, when we ended up drawing exterior angles in "both" directions?
Is it ok if I have a drawing inability with number 19?
ReplyDelete-kevin
... and if I say no?
ReplyDeleteBy the way, when you tile a floor with a pattern of repeating geometric shapes, it is called a tesselation. Google M.C. Escher if geometric art and interior design catches your fancy.
http://www.mcescher.com/Gallery/gallery-symmetry.htm
ooo he wrote cant touch this right??
ReplyDeleteI've been waiting all year for legitimate questions... and look at the last two above.
ReplyDeleteIs there any hope?!
quic question, so i am trying to prove theorem (I SPELT THAT RIGHT!!) but, i don't understand it. what does it mean when it says one angel at each vertex?..WORDS ARE SOO CONFUSING!
ReplyDeleteOOPS! i got soo happy i spelt theorem right, i forgot to state which one. theorem 3-14.(hey look it's pi!)
ReplyDeleteWe'll discuss this theorem in class. "One angle at each vertex" means just that. Do you recall Nora's question, when we ended up drawing exterior angles in "both" directions?
ReplyDeleteMr Chamberlain, my angle is 105!
ReplyDeleteWhat's your angle?
I hope it's 75 because then we'd make 180 (;