 °ÀÇ °³¿ä
ÀÌ»ê¼öÇÐ(Discrete
Mathematics)À̶õ ¿¬¼ÓÀû¼ºÁúÀ»
°®´Â
´ë»ó°ú´Â ´Þ¸® ÀÌ»êÀûÀÎ ¾ç ¶Ç´Â À̻걸Á¶¸¦ °®´Â
´ë»ó¿¡
´ëÇÏ¿©¼öÇÐÀûÀ¸·Î ºÐ·ùÇÏ°í Á¤¸®Çϸç, ³í¸®ÀûÀ¸·Î
»ç°íÇÏ¿©
¹®Á¦¸¦ ÇØ°áÇÏ´Â ¿©·¯ ÀÌ·ÐÀ» ÅëƲ¾î ´Ù·ç´Â
Çй®À»
¸»ÇÑ´Ù. ¶Ç,±¸Ã¼ÀûÀÌ°í ÀÌ»êÀûÀÎ ¿©·¯ ¹®Á¦¸¦
´Ù·ç¹Ç·Î
Concrete Mathematics ¶ó°íµµ ÇÑ´Ù.
|
ÇнÀ ¸ñÇ¥
º»
°Á¿¡¼´Â ÀÌ»ê¼öÇÐÀÇ ¿©·¯ ÀÌ·Ð Áß¿¡¼ ÀüÅëÀû
Á¶ÇÕ·ÐÀÇ ¿µ¿ªÀÎ ¼±Åðú
¹è¿ÀÇ ´Ù¾çÇÑ À̷аú À¯ÇÑüÀÌ·Ð
À§¿¡¼ÀÇ À¯ÇÑÆò¸é±âÇÏÇÐ,
±×·¡ÇÁÀÌ·Ð, recursion,
¾Ë°í¸®Áò, µðÀÚÀΰú
Ãʵî¾ÏÈ£ÀÌ·Ð, ÃÖÀûȹ®Á¦ µîÀ» ÇнÀ
ÇÔÀ¸·Î½á Çö´ë¼öÇÐÀÇ
»õ·Î¿î ¿µ¿ªÀ¸·Î ¿©·¯ °¡Áö Áß¿äÇÑ
ÀÀ¿ëÀ» °®°í ÀÖ´Â
ÀÌ»ê¼öÇÐ ¶Ç´Â Á¶ÇÕ·ÐÀÇ ±âÃʸ¦ ÀÍÈ÷°í
µ¿½Ã¿¡ ´Ù¾çÇÑ ³»¿ëÀ»
°øºÎÇÏ´Â µ¥ ±× ÁßÁ¡À» µÐ´Ù. |
Course Perspective
Interests in computer science and the use of computer applications,
together with connections to many real-world situations, have helped
make topics of discrete mathematics more commonplace in school
and university curricula. A topic of widespread application
and interest is combinatorics,
the study of counting techniques. Enumeration, or counting,
may strike one as an obvious process that a student learns when
first studying arithmetic. But then, it seems, very little attention
is paid to further developments in counting as the student turns
to "more difficult" areas in mathematics, such as algebra,
geometry, trigonometry, and calculus. . . . Enumeration [however]
does not end with arithmetic. It also has applications in such areas
as coding theory, probability, and statistics (in mathematics) and
in the analysis of algorithms (in computer science). [Ralph P. Grimaldi,
in Discrete and Combinatorial Mathematics, 1994, p. 3]
Combinatorial Analysis is an area
of mathematics concerned with solving problems for which the number
of possibilities is finite (though possibly quite large). These
problems may be broken into three main categories: determining existence,
counting, and optimization. Sometimes it is not clear whether a
problem has a solution or not. This is a question of existence.
In other cases solutions are known to exist, but we want to know
how many there are. This is a counting problem. Or a solution may
be desired that is "best" in some sense. This is an optimization
problem. [John A. Dossey, Albert D. Otto, Lawrence E. Spence, &
Charles V. Eynden, in Discrete Mathematics, 1987, p. 1]
Current documents that support
the reform of school mathematics education suggest the need for
increased attention to topics in discrete mathematics as well as
in probability and statistics. The topic of combinatorics--counting--is
mentioned in the National Council of Teachers of Mathematics standards
documents and in the Mathematical Association of America's recommendations
for teacher preparation as a topic area worthy of study by middle
school and high school teachers.
This quarter, we will study
and apply combinatorial techniques in a variety of settings. In
doing so, we will make connections to algebra, probability, and
many other topics in mathematics. During the course, we may also
study the process of proof by induction, the use of recursion, and
the graph theory and knot theory and more.
Contact Information
Room 82-105 ÃæºÏ´ëÇб³ »ç¹ü´ëÇÐ
Wednesday 3:00-5:00 pm
email: wkkim@cbucc.chungbuk.ac.kr
Course Requirements and Grading Scale
Problem Sets & Quizzes (20%)
These will be weekly assignments by webboard, and several
quizzes during the course.
Test (20%)
Three exams will be given during the course.
The test is tentatively scheduled for the mid week of the Quarter.
Final Examination (60%)
The test is scheduled for the last week of the
Quarter.
°ÀÇ ÀÏÁ¤
|
