|
| |
|
|
ÀÌ»ê¼öÇÐ 7ÆÇ ¼Ö·ç¼Ç (±¸¸ÅÀÚ ÆǸÅÁßÁö)
ÀÎ ¼â
¹Ù·Î°¡±â
Áñ°Üã±â
Å°º¸µå¸¦ ´·¯ÁÖ¼¼¿ä( Ctrl + D )
¸µÅ©º¹»ç
¸µÅ©ÁÖ¼Ò°¡ º¹»ç µÇ¾ú½À´Ï´Ù.¿øÇÏ´Â °÷¿¡ ºÙÇô³Ö±â Çϼ¼¿ä
( Ctrl + V )
¿ÜºÎ°øÀ¯
ÆÄÀÏ 
[Size :
0 Kbyte
]
[Size :
0 Kbyte
]
ºÐ·® Page
×
¸µÅ© ÁÖ¼Ò°¡ º¹»çµÇ¾ú½À´Ï´Ù.
¸µÅ© ÁÖ¼Ò°¡ º¹»çµÇ¾ú½À´Ï´Ù.
¿øÇÏ´Â °÷¿¡ ºÙÇô³Ö±â Çϼ¼¿ä
Ä«Æ®
|
´Ù¿î¹Þ±â
|
 ³×À̹ö ID·Î ´Ù¿î ¹Þ±â  Ä«Ä«¿À ID·Î ´Ù¿î ¹Þ±â  ±¸±Û ID·Î ´Ù¿î ¹Þ±â  ÆäÀ̽ººÏ ID·Î ´Ù¿î ¹Þ±â |
µÚ·Î
|
ÀÚ·á¼³¸í
[ÆǸÅÁßÁö] ±¸¸Åȸ¿ø¿äû ÆǸÅÁßÁö(»çÀ¯) : ÀϺΠ¹®Á¦ÀÇ ¼Ö·ç¼Ç¸¸ ±âÀçµÈ ¼Ö·ç¼ÇÀ¸·Î ¼³¸íºÎÁ· ¹× ¿øÇÏ´Â ºÎºÐÀÇ ¼Ö·ç¼ÇÀ» ¾òÀ» ¼ö ¾ø¾ú½À´Ï´Ù -------> ÀÌ»ê¼öÇÐ_7ÆÇ_¼Ö·ç¼Ç
¸ñÂ÷/Â÷·Ê
ÀÌ»ê¼öÇÐ_7ÆÇ_¼Ö·ç¼Ç
º»¹®/³»¿ë
Johnsonbaugh-50623
book
November 19, 2007
14:54
HINTS/SOLUTIONS TO
Selected Exercises
Section 1.1 Review
1. A set is a collection of objects. 2. A set may be de?ned by listing the elements in it. For example, {1, 2, 3, 4} is the set consisting of the integers 1, 2, 3, 4. A set may also be de?ned by listing a property necessary for membership. For example, {x | x is a positive, real number} de?nes the set consisting of the positive, real numbers. 3. Set Z Q R Z+ Q+ R+ Z? Q? R? Znonneg Qnonneg Rnonneg Description Integers Rational numbers Real numbers Positive integers Positive rational numbers Positive real numbers Negative integers Negative rational numbers Negative real numbers Nonnegative integers Nonnegative rational numbers Nonnegative real numbers Examples of Members ?3, 2 ?3/4, 2.13074 ¡î ?2.13074, 2 2, 10 3/4, 2.13074 ¡î 2.13074, 2 ?12, ?10 ?3/8, ?2.13074 ¡î ?2.13074, ? 2 0, 3 0, 3.13074 ¡î 0, 3
14. X is a proper subset of Y if X ¡ö Y and X = Y . X is a pro¡¦(»ý·«)
book
November 19, 2007
14:54
HINTS/SOLUTIONS TO
Selected Exercises
Section 1.1 Review
1. A set is a collection of objects. 2. A set may be de?ned by listing the elements in it. For example, {1, 2, 3, 4} is the set consisting of the integers 1, 2, 3, 4. A set may also be de?ned by listing a property necessary for membership. For example, {x | x is a positive, real number} de?nes the set consisting of the positive, real numbers. 3. Set Z Q R Z+ Q+ R+ Z? Q? R? Znonneg Qnonneg Rnonneg Description Integers Rational numbers Real numbers Positive integers Positive rational numbers Positive real numbers Negative integers Negative rational numbers Negative real numbers Nonnegative integers Nonnegative rational numbers Nonnegative real numbers Examples of Members ?3, 2 ?3/4, 2.13074 ¡î ?2.13074, 2 2, 10 3/4, 2.13074 ¡î 2.13074, 2 ?12, ?10 ?3/8, ?2.13074 ¡î ?2.13074, ? 2 0, 3 0, 3.13074 ¡î 0, 3
14. X is a proper subset of Y if X ¡ö Y and X = Y . X is a pro¡¦(»ý·«)
ÃßõÀÚ·á
-
ÇÕ°ÝÀ» À§ÇÑ ÃֽŠÀ̷¼ ¾ç½Ä °ßº» »ùÇÃ!!!!
-
°£È£»ç ±¹°¡°í½Ã ¿ä¾àÁ¤¸® - ±¹°¡°í½Ã ½ÃÇèÀå¿¡ °¡Áö°í °£ ¿ä¾àº»
-
¿ä¾çº´¿ø ÀÎÁö Â÷ÆÃ
-
ÄÄÇ»ÅÍ È°¿ë ´É·Â 2±Þ
-
¸ð¼º°£È£ÇÐ Vsim Maternity Case 1 Olivia Jo
-
¿ìÀÎÀåÇÐÀç´Ü ÃÖÁ¾ ÇÕ°Ý ÀåÇбݽÅû¼
-
°¡Á¤ Á¤±³»ç ÇÕ°Ý ±³¼öÇнÀ°úÁ¤¾È(Áßµî °¡Á¤ ¼ö¾÷Áöµµ¾È-Á¤±³»ç ÇÕ°Ý)
-
WeinerÀÇ ¼ºÃë¿¡ ´ëÇÑ ±ÍÀÎ ¸ðÇü¿¡ ´ëÇؼ ¼³¸íÇÏ°í, ÀÚ½ÅÀÇ ¼ºÃë°æÇè(ȤÀº ½ÇÆаæÇè) »ç·Ê¸¦ ±â¼úÇÑ ´ÙÀ½, ´ç½Ã ÀÚ½ÅÀÇ ±ÍÀÎÀÇ Æ¯¼º°ú ±×·Î ÀÎÇØ ¹ß»ýÇÑ ¼ºÃë°æÇèÀÇ Àǹ̿¡ ´ëÇؼ
-
¿ä¾ç¿ø »ç¾÷°èȹ¼ 2025³â_3ȸ¿¬¼Ó Æò°¡ Aµî±Þ ½ÇÁ¦ »ç¿ëºÐ
-
·Î½º¸¸ÀÇ Áö¿ª»çȸº¹Áö½Çõ ¸ðµ¨À» ¼³¸íÇÏ°í, Áö¿ª»çȸ°³¹ß ¸ðµ¨ÀÇ ½ÇÁ¦ »ç·Ê¸¦ Á¦½Ã ¹× ºÐ¼®
|
ÀúÀÛ±ÇÁ¤º¸
 |
|
*À§ Á¤º¸ ¹× °Ô½Ã¹° ³»¿ëÀÇ Áø½Ç¼º¿¡ ´ëÇÏ¿© ȸ»ç´Â º¸ÁõÇÏÁö ¾Æ´ÏÇϸç, ÇØ´ç Á¤º¸ ¹× °Ô½Ã¹° ÀúÀ۱ǰú ±âŸ ¹ýÀû Ã¥ÀÓÀº ÀÚ·á µî·ÏÀÚ¿¡°Ô ÀÖ½À´Ï´Ù. À§ Á¤º¸ ¹× °Ô½Ã¹° ³»¿ëÀÇ ºÒ¹ýÀû ÀÌ¿ë, ¹«´Ü ÀüÀ硤¹èÆ÷´Â ±ÝÁöµÇ¾î ÀÖ½À´Ï´Ù. ÀúÀÛ±ÇħÇØ, ¸í¿¹ÈÑ¼Õ µî ºÐÀï¿ä¼Ò ¹ß°ß½Ã °í°´¼¾ÅÍÀÇ ÀúÀÛ±ÇħÇØ½Å°í ¸¦ ÀÌ¿ëÇØ Áֽñ⠹ٶø´Ï´Ù.
|
| 📝 Regist Info |
|
I D : ******** Date : FileNo : 28203836 |
Cart  | |
| |