2009Çг⵵ 7¿ù ÀüÆíÀÔÇÐ ¼öÇÐ ½ÃÇè¹üÀ§¸¦ ¾Æ·¡¿Í °°ÀÌ °øÁöÇÕ´Ï´Ù.
<ÃâÁ¦ ¹æÇâ>
- ÇöÀç ±³³»¿¡¼ ¼öÇàµÇ´Â ¼ö¾÷À» µû¶ó°¥ ¼ö ÀÖ´Â ´É·ÂÀ» Æò°¡
- Áö½Ä, ÀÌÇØ, ÀÀ¿ëÀÇ ÇüÅ·Π´Ù¾çÇÏ°Ô ÃâÁ¦
- ¾ÆÁÖ ½¬¿î ¹®Á¦¿¡¼ °í³À̵µÀÇ ¹®Á¦±îÁö ÇнÀ´É·ÂÀ» Æò°¡ÇÒ ¼ö ÀÖµµ·Ï °í¸£°Ô ÃâÁ¦
2009³â 7¿ù ÀüÆíÀÔÇÐ ½ÃÇè ¼öÇÐ ½ÃÇè¹üÀ§
ÁßÇб³ 1Çгâ
|
Çѱ¹±³°ú¼ ÁßÇб³ ¼öÇÐ 1
|
¿µ¾î±³Àç Algebra 1
|
1. Åë°è
(1)ÀÚ·áÀÇ Á¤¸®
-µµ¼öºÐÆ÷Ç¥/È÷½ºÅä±×·¥°ú µµ¼öºÐÆ÷´Ù°¢Çü/
µµ¼öºÐÆ÷Ç¥¿¡¼ÀÇ Æò±Õ
(2)ÀÚ·áÀÇ °üÂû
-»ó´ëµµ¼ö/´©Àûµµ¼ö
2. µµÇüÀÇ ±âÃÊ
(1)±âº» µµÇü
-Á¡, ¼±, ¸é/°¢ÀÇ ¼ºÁú
(2)À§Ä¡ °ü°è
-ÆòÇ༱ÀÇ ¼ºÁú/À§Ä¡ °ü°è
3. ÀÛµµ¿Í ÇÕµ¿
(1)°£´ÜÇÑ µµÇüÀÇ ÀÛµµ
-°£´ÜÇÑ ¼±ÀÇ ÀÛµµ/°£´ÜÇÑ °¢ÀÇ ÀÛµµ
(2)»ï°¢ÇüÀÇ ÀÛµµ
-»ï°¢ÇüÀÇ ÀÛµµ/»ï°¢ÇüÀÇ °áÁ¤Á¶°Ç
(3)»ï°¢ÇüÀÇ ÇÕµ¿
-ÇÕµ¿ÀÎ µµÇüÀÇ °£´ÜÇÑ ¼ºÁú/»ï°¢ÇüÀÇ ÇÕµ¿Á¶°Ç
4. Æò¸éµµÇü
(1)´Ù°¢Çü
-´Ù°¢ÇüÀÇ ¼ºÁú/´Ù°¢ÇüÀÇ ³»°¢/´Ù°¢ÇüÀÇ ¿Ü°¢
(2)¿ø°ú ºÎä²Ã
-¿ø°ú ºÎä²Ã/ºÎä²ÃÀÇ È£ÀÇ ±æÀÌ¿Í ³ÐÀÌ
(3)¿øÀÇ À§Ä¡°ü°è
5. ÀÔüµµÇü
(1)ÀÔüµµÇüÀÇ °üÂû
-´Ù¸éü/Á¤´Ù¸éü/ȸÀüü
(2)ÀÔüµµÇüÀÇ °Ñ³ÐÀÌ¿Í ºÎÇÇ
-±âµÕÀÇ °Ñ³ÐÀÌ¿Í ºÎÇÇ/»ÔÀÇ °Ñ³ÐÀÌ¿Í ºÎÇÇ/
±¸ÀÇ °Ñ³ÐÀÌ¿Í ºÎÇÇ
|
Chapter 1. Variable, Function Pattes, and Graphs(º¯¼ö, ÇÔ¼öÀÇ ÆÐÅϵé°ú ±×·¡ÇÁ)
-Using variable(¹®ÀÚ¸¦ »ç¿ëÇÏ¿© ½Ä ³ªÅ¸³»±â)
-Exponents and order of operations(°ÅµìÁ¦°ö
ÀÇ Ç¥Çö°ú °è»ê)
-Exploring real number(½Ç¼ö ü°è)
-Mean, Median, Mode, Range(Æò±Õ°ú Áß¾Ó°ª)
Chapter 2. Rational numbers(À¯¸®¼ö)
-Addition, subtraction, multiplication and division of Rational Number, Properties of Real Number.(À¯¸®¼öÀÇ »çÄ¢ ¿¬»ê, ¼öÀÇ ¿¬»ê ¹ýÄ¢)
-Matrices(Çà·ÄÀÇ µ¡¼À°ú »¬¼À, ½Ç¼ö¹è)
-Probability(È®·üÀÇ ¶æ°ú ±âº» ¼ºÁú, °è»ê)
Chapter 3. Solving Equation(¹æÁ¤½Ä Ç®À̹ý)
-Solving a linear equation
(ÀÏÂ÷¹æÁ¤½ÄÀÇ Ç®À̹ý)
-Ratio and proportion(ºñ·Ê½Ä)
-Proportions and similar figures(µµÇüÀÇ ´àÀ½)
-Percent of change, Percent error
(¹éºÐÀ²°ú ¿ÀÂ÷)
-Square roots(Á¦°ö±ÙÀÇ Á¤ÀÇ¿Í ¼ºÁú)
-The Pythagorean theorem(ÇÇŸ°í¶ó½ºÀÇ Á¤¸®)
±³Àç ¿Ü º°µµÀÇ ¼ö¾÷ ³»¿ë
Number Systems - Decimal numbers/Binary numbers(½ÊÁø¹ý, ÀÌÁø¹ýÀÇ Á¤ÀÇ, Àü°³½Ä, µ¡¼À, »¬¼À)
A Set(ÁýÇÕÀÇ ¿¬»ê)
|
ÁßÇб³ 2Çгâ
|
Çѱ¹±³°ú¼ ¼öÇÐ 8-°¡
|
¿µ¾î±³Àç Algebra 2
|
¼öÇÐ 8-°¡
II. ½ÄÀÇ °è»ê
1. ´ÜÇ×½ÄÀÇ °è»ê
2. ´ÙÇ×½ÄÀÇ °è»ê
III. ¿¬¸³¹æÁ¤½Ä
1. ¿¬¸³¹æÁ¤½Ä
2. ¿¬¸³¹æÁ¤½ÄÀÇ Ç®ÀÌ
IV. ºÎµî½Ä
1. ÀÏÂ÷ºÎµî½Ä
2. ¿¬¸³ºÎµî½Ä
V. ÀÏÂ÷ÇÔ¼ö
1. ÀÏÂ÷ÇÔ¼ö¿Í ±×·¡ÇÁ
2. ÀÏÂ÷ÇÔ¼öÀÇ È°¿ë
|
I. Polynomials(´ÙÇ×½Ä)
Addition, subtraction, multiplicationand division of polynomials(´ÙÇ×½ÄÀÇ µ¡¼À°ú »¬¼À, °ö¼À, ³ª´°¼À)
II. Solving a system of linear equations
(¿¬¸³¹æÁ¤½ÄÀÇ Ç®ÀÌ)
III. Solving linear inequalities and a system of linear inequalities (ÀÏÂ÷ºÎµî½Ä°ú ÀÏÂ÷ ¿¬¸³ ºÎµî½ÄÀÇ Ç®ÀÌ)
IV. Linear functions and Graphs, its application(ÀÏÂ÷ÇÔ¼ö¿Í ±×·¡ÇÁ)
VI. Powers, Roots
1. Radical expression(Á¦°ö±ÙÀ» Æ÷ÇÔÇÑ ½Ä)
2. Operations with radical expressions
(Á¦°ö±ÙÀ» Æ÷ÇÔÇÑ ½ÄÀÇ °è»ê)
|
¼öÇÐ 9-°¡
|
I. ¹«¸®¼ö¿Í ½Ç¼ö
1. Á¦°ö±Ù°ú ½Ç¼ö
2. ±ÙÈ£¸¦ Æ÷ÇÔÇÑ ½ÄÀÇ °è»ê
|
¼öÇÐ 8-³ª
|
¿µ¾î±³Àç Geometry
|
I. °æ¿ìÀÇ ¼ö¿Í È®·ü
1.°æ¿ìÀÇ ¼ö¿Í È®·ü
2. È®·üÀÇ °è»ê
II. »ï°¢ÇüÀÇ ¼ºÁú
1. À̵ »ï°¢Çü
2. »ï°¢ÇüÀÇ ¿Ü½É°ú ³»½É
III. »ç°¢ÇüÀÇ ¼ºÁú
1. ÆòÇà»çº¯Çü
2. ¿©·¯ °¡Áö »ç°¢Çü
IV. µµÇüÀÇ ´àÀ½
1. µµÇüÀÇ ´àÀ½
2. ´àÀ½ÀÇ ÀÀ¿ë
|
II. Relationships within triangles(»ï°¢ÇüÀÇ ¼ºÁú)
1. Midsegements of Triangles(»ï°¢ÇüÀÇ Áß¼±)
2. Incenter(³»½É), circumcenter(¿Ü½É), centroid(¹«°ÔÁß½É)
3. Inverse(¸íÁ¦ÀÇ ¿ª), contrapositive(¸íÁ¦ÀÇ ´ë¿ì), indirect proof(°£Á¢Áõ¸í¹ý)
III. Quadrilaterals(»ç°¢Çü)
1. Properties of parallelogram(ÆòÇà»çº¯ÇüÀÇ ¼ºÁú)
2. Special parallelogram rectangle (Á÷»ç°¢Çü), square(Á¤»ç°¢Çü), rhombus(¸¶¸§¸ð)
3. Trapezoid(»ç´Ù¸®²Ã) and kite
IV. Similarity(´àÀ½)
1. Ratio and proportions(ºñÀ²°ú ºñ·Ê½Ä)
2. Proving triangles similar (»ï°¢ÇüÀÇ ´àÀ½ Áõ¸í)
3. Similarity in Right trianlges(Á÷°¢»ï°¢ÇüÀÇ ´àÀ½)
|
°íµîÇб³ 2Çгâ, 3Çг⠱¹³», ±¹Á¦¹Ý °øÅë
¼öÇÐ I (´ëÇѱ³°ú¼ ±âÁØ)
1. Çà·Ä
(1) Çà·Ä°ú ±×¿¬»ê
(2) ¿ªÇà·Ä°ú ¿¬¸³ÀÏÂ÷¹æÁ¤½Ä
2. Áö¼ö¿Í ·Î±×
(1) Áö¼ö
(2) ·Î±×
3. Áö¼öÇÔ¼ö¿Í ·Î±×ÇÔ¼ö
(1) Áö¼öÇÔ¼ö
(2) ·Î±×ÇÔ¼ö
4. ¼ö¿
(1) µîÂ÷¼ö¿°ú µîºñ¼ö¿
(2) ¿©·¯ °¡Áö ¼ö¿
(3) ¼öÇÐÀû ±Í³³¹ý
(4) ¾Ë°í¸®Áò°ú ¼ø¼µµ
5. ¼ö¿ÀÇ ±ØÇÑ
(1) ¹«ÇѼö¿ÀÇ ±ØÇÑ
(2) ¹«Çѱ޼ö