Every month, I get a little more resolute in my belief that the standard HS math curriculum needs to include a semester or two on number theory, at least for the honors track. If they're short on time, they could teach geometry in a semester (as my school did), and/or teach Algebra II + Pre-Calc in two semesters.

I recommend "A Mathematician’s Lament" by Paul Lockhart. It's an excellent essay on math education. The entire paper is long but even the first 5 pages are great. It covers everything from the unacknowledged creativity that is involved in math to the culture and curriculum.

http://www.maa.org/devlin/devlin_03_08.html

http://www.maa.org/devlin/LockhartsLament.pdf

EDIT: I should make clear that the second part of the book is not coursework, but a brief taste of some ideas that capture the imagination. A counterpoint to the Lament portion, if you will.

Then I came to Canada and took more HS, suddenly math was a pile of confusing "things"; an enumeration of techniques for solving certain patterns of problems. Around that time I realized that I hated math.

In University we took discrete algebra with a Taiwanese prof, suddenly math was fun again. If I remember correctly, he commented once about how they learned this stuff in high school when he was back home, which wasn't very surprising, seeing as how the first half of course was pretty similar to my grade 7 math in Libya.

As far as I can tell (and I could very well be wrong), the Libyan curriculum was based on the Egyptian curriculum, which is possibly based on the British one. At least it was based on it sometime around 50 years ago.

Set theory in seventh grade would be characteristic of the "new math" curriculum. That was taken up by quite a few schools in Britain and in the United States during the 1960s and 1970s, so fifty years ago is about right.

http://books.google.com/books?id=RVY_aIlezpAC&pg=PA60...

http://www.maa.org/spotlight/smsg.html

I liked that aspect of the "new math," which I had, pretty well, learning about set theory early and often, but I found that many of my teachers struggled to teach according to that curriculum, which didn't match their own education in math. The teachers being uncomfortable with the curriculum, and parents of pupils in that era not being sure how to help their children with homework, were among the drawback that resulted in "new math" curricula being replaced with "back to basics" curricula by the 1980s.

That's why it isn't trivially easy to be a mathematics teacher. The Russian tradition of mathematics teaching, which goes all the way back to the years when Leonhard Euler researched and taught in St. Petersburg,

http://mathsforeurope.digibel.be/Euler.html

does an especially good job of appreciating pure math for its delightful patterns and inherent beauty and elegance while at the same time being well informed by the many applications of math to science and engineering. One of my favorite textbooks for taking a balanced approached to making mathematics teaching interesting, rigorous, engaging, and practical is the late Israel Gelfand's and Alexander Shen's textbook Algebra published by Birkhäuser.

http://www.amazon.com/Algebra-Israel-M-Gelfand/dp/0817636773

Many of the problems are HARD--the author is not afraid to pose research-level problems to first-time learners of algebra. On the other hand, some of the problems in some sections of the book are very approachable: "How to Explain the Square of the Sum Formula to Your Younger Brother or Sister." One section, "How to Confuse Students on an Exam," is laugh-out-loud funny. I love using this book in math classes that I teach as supplementary weekend classes for third-, fourth-, and fifth-grade-age pupils who like math and who want something more challenging than what is served up by the local school systems. I have clients from seven different counties in my sprawling metropolitan area. Pure math can be fun, and applied math can be fun, and both can be more enjoyable when they are taught hand in hand.

Also, this is material that less than 1% (if that) of high school students will understand. Teachers don't bother with material that only one or two students in their honors class will enjoy.