| ²é¿´: 1567 | »Ø¸´: 9 | ||||
| µ±Ç°Ö»ÏÔʾÂú×ãÖ¸¶¨Ìõ¼þµÄ»ØÌû£¬µã»÷ÕâÀï²é¿´±¾»°ÌâµÄËùÓлØÌû | ||||
lihui6751303Òø³æ (СÓÐÃûÆø)
|
[½»Á÷]
ÈçºÎÓÃÊýѧÈí¼þÇó½â´úÊý·½³ÌµÄ×îСÕý½â£¿£¿£¿£¿£¿£¿£¿ ÒÑÓÐ2È˲ÎÓë
|
|||
| ÈçºÎÓÃÊýѧÈí¼þÇó½â´úÊý·½³ÌµÄ×îСÕý½â£¿£¿£¿£¿£¿£¿£¿ |
»Ø¸´´ËÂ¥» ±¾Ìû¸½¼þ×ÊÔ´Áбí
-
»¶Ó¼à¶½ºÍ·´À¡£ºÐ¡Ä¾³æ½öÌṩ½»Á÷ƽ̨£¬²»¶Ô¸ÃÄÚÈݸºÔð¡£
±¾ÄÚÈÝÓÉÓû§×ÔÖ÷·¢²¼£¬Èç¹ûÆäÄÚÈÝÉæ¼°µ½ÖªÊ¶²úȨÎÊÌ⣬ÆäÔðÈÎÔÚÓÚÓû§±¾ÈË£¬Èç¶Ô°æȨÓÐÒìÒ飬ÇëÁªÏµÓÊÏ䣺xiaomuchong@tal.com - ¸½¼þ 1 : ½â´úÊý·½³ÌµÄ×îСÕý½â.doc
2013-12-20 12:34:58, 16 K
» ²ÂÄãϲ»¶
ÊÕµ½¸´ÊÔµ÷¼Áµ«ÊÇÈ¥²»ÁË
ÒѾÓÐ7È˻ظ´
-
260Çóµ÷¼Á
ÒѾÓÐ5È˻ظ´
-
¼±Ðèµ÷¼Á
ÒѾÓÐ10È˻ظ´
-
É격/¿¼²©
ÒѾÓÐ4È˻ظ´
-
»¯¹¤Ñ§Ë¶294·Ö£¬Çóµ¼Ê¦ÊÕÁô
ÒѾÓÐ37È˻ظ´
-
Çóµ÷¼Á
ÒѾÓÐ11È˻ظ´
-
Ò»Ö¾Ô¸»ªÖÐÅ©Òµ071010£¬320Çóµ÷¼Á
ÒѾÓÐ19È˻ظ´
-
304Çóµ÷¼Á
ÒѾÓÐ7È˻ظ´
-
Ç󲩵¼£üÉúÎïÖÊ»ù¶à¿×̼/³¬¼¶µçÈÝ·½Ïò£¬ÒÑÓÐÏà¹Ø³É¹û£¬Ñ°ÄÜÔ´²ÄÁÏ/̼²ÄÁÏ·½ÏòÀÏʦ
ÒѾÓÐ3È˻ظ´
-
¶þ±½¼×ͪËáÀàÑÜÉúÎï
ÒѾÓÐ6È˻ظ´
» ±¾Ö÷ÌâÏà¹Ø¼ÛÖµÌùÍƼö£¬¶ÔÄúͬÑùÓаïÖú:
- Å×ÎïÐÍƫ΢·Ö·½³ÌµÄÊýÖµ½âÇó½âÎÊÌ⣬лл£¡
ÒѾÓÐ14È˻ظ´
- 10´Î´úÊý·½³ÌÔõôÕÒ½âÎö½â ×îºÃÏêϸ¸ø³ömatlab³ÌÐò лл
ÒѾÓÐ5È˻ظ´
- ¹ØÓڸߵȴúÊýÏßÐÔ·½³Ì×éͬ½âµÄÎÊÌâ
ÒѾÓÐ5È˻ظ´
- ÒÑ֪΢·Ö·½³ÌÇó½âÊýÖµ½â
ÒѾÓÐ7È˻ظ´
- ÈçºÎÓÃmatlab»òÆäËûÈí¼þÅúÁ¿Çó½â¶ÔÊý·½³Ì
ÒѾÓÐ6È˻ظ´
- ÓÃWofram Mathematica½â·½³ÌµÄÎÊÌâ
ÒѾÓÐ9È˻ظ´
- MATLABÇó½â´úÊý·½³Ì×éÎÊÌ⣬Çë°ïæ
ÒѾÓÐ9È˻ظ´
- Ò»ÔªÎå´Î·½³ÌÔõôÇó½â£¿
ÒѾÓÐ8È˻ظ´
- ¼±¼±¼±£¡·ûºÅº¯Êý½â´úÊý·½³ÌÓöµ½µÄÎÊÌâ
ÒѾÓÐ14È˻ظ´
- matlab½â´úÊý·½³ÌµÄÎÊÌâ
ÒѾÓÐ5È˻ظ´
- ÈçºÎ¶ÔÕâ¸ö²î·Ö·½³ÌÇó½â²¢×ö³ö½âµÄͼÐΣ¿Ð»Ð»£¡
ÒѾÓÐ4È˻ظ´
- ÈçºÎʹÓÃmatlabÇó½â·ÇÏßÐÔ·½³Ì×éµÄËùÓÐÕûÊý½â£¿
ÒѾÓÐ9È˻ظ´
- matlabÇó½â·ÇÏßÐÔ·½³Ì×é
ÒѾÓÐ16È˻ظ´
- ½âÏßÐÔ´úÊý·½³Ì×é
ÒѾÓÐ10È˻ظ´
- ÇëÎÊÈçºÎÇó½â¶þÔªÒ»½×΢·Ö·½³Ì×é
ÒѾÓÐ24È˻ظ´
- Çó½â¾ØÕó·½³Ì A X B+ C X D=E µÄ½â
ÒѾÓÐ6È˻ظ´
- ¡¾ÇóÖú¡¿ÓÃ×îС¶þ³Ë·¨Çó½âÏßÐÔ·½³Ì×éµÄFortran´úÂë
ÒѾÓÐ4È˻ظ´
- ¡¾ÇóÖú¡¿ÈçºÎÓÃmatlabÇó½âÕâ¸ö΢·Ö·½³Ì£¿¡¾Òѽâ¾ö¡¿
ÒѾÓÐ3È˻ظ´
- ¡¾ÇóÖú¡¿ÀûÓÃmatlabÇó½â΢·Ö·½³ÌµÃ³ö½âº¯ÊýÖк¬0µÄÒâ˼
ÒѾÓÐ3È˻ظ´
- ¡¾ÇóÖú¡¿ÈçºÎÓÃexcelÇó½âÒ»ÔªÈý´Î·½³Ì
ÒѾÓÐ3È˻ظ´
- Êýѧ¸ßÊÖÇë½ø£¬ÈçºÎÇó½â´ø°×ÔëÉùµÄ΢·Ö·½³Ì
ÒѾÓÐ8È˻ظ´
lihui6751303
Òø³æ (СÓÐÃûÆø)
- Ó¦Öú: 0 (Ó׶ùÔ°)
- ½ð±Ò: 509.6
- É¢½ð: 1
- Ìû×Ó: 106
- ÔÚÏß: 14.2Сʱ
- ³æºÅ: 2868309
- ×¢²á: 2013-12-13
- ÐÔ±ð: GG
- רҵ: ³£Î¢·Ö·½³ÌÓ붯Á¦ÏµÍ³
| ÕâλÅóÓÑ£¬Ð»Ð»Äã¡£µ«ÎÒ²»»áÓÃÄãµÄÄǸöÈí¼þ£¬ÄÜ°ïÎÒËãÒ»ÏÂÕâ¸öÀàËƵÄÎÊÌâÂð£¿Ð»Ð»£¬ÎÒÖ»Òª×îºó½á¹û¡£ |
» ±¾Ìû¸½¼þ×ÊÔ´Áбí
-
»¶Ó¼à¶½ºÍ·´À¡£ºÐ¡Ä¾³æ½öÌṩ½»Á÷ƽ̨£¬²»¶Ô¸ÃÄÚÈݸºÔð¡£
±¾ÄÚÈÝÓÉÓû§×ÔÖ÷·¢²¼£¬Èç¹ûÆäÄÚÈÝÉæ¼°µ½ÖªÊ¶²úȨÎÊÌ⣬ÆäÔðÈÎÔÚÓÚÓû§±¾ÈË£¬Èç¶Ô°æȨÓÐÒìÒ飬ÇëÁªÏµÓÊÏ䣺xiaomuchong@tal.com - ¸½¼þ 1 : Çó³¬Ô½·½³ÌµÄ×î´ó¸º¸ù.doc
2013-12-20 19:41:45, 16 K
10Â¥2013-12-20 19:42:12
feixiaolin
ÈÙÓþ°æÖ÷ (ÎÄ̳¾«Ó¢)
-
ר¼Ò¾Ñé: +518 - Ó¦Öú: 942 (²©ºó)
- ¹ó±ö: 1.275
- ½ð±Ò: 3880
- É¢½ð: 58785
- ºì»¨: 532
- ɳ·¢: 11
- Ìû×Ó: 24215
- ÔÚÏß: 2601.8Сʱ
- ³æºÅ: 2139575
- ×¢²á: 2012-11-21
- רҵ: ¹âѧÐÅÏ¢»ñÈ¡Óë´¦Àí
- ¹ÜϽ: Êýѧ
¡ï
Сľ³æ: ½ð±Ò+0.5, ¸ø¸öºì°ü£¬Ð»Ð»»ØÌû
Сľ³æ: ½ð±Ò+0.5, ¸ø¸öºì°ü£¬Ð»Ð»»ØÌû
|
ÏÈ°Ñʽ×ÓÕûÀíд³ÉÁ½Ïȷ¶¨³öÇ°n¸öexp(m/2)*sqrt(1+1/3)*sin(sqrt(3)*m/2)-arctan(sqrt(3)))Ϊ¸ºµÄÇø¼ä£¬½â¾Í²úÉúÔÚÕ⼸¸öÇø¼äÄÚ¡£ [ Last edited by feixiaolin on 2013-12-20 at 15:02 ] |
2Â¥2013-12-20 13:20:18
lihui6751303
Òø³æ (СÓÐÃûÆø)
- Ó¦Öú: 0 (Ó׶ùÔ°)
- ½ð±Ò: 509.6
- É¢½ð: 1
- Ìû×Ó: 106
- ÔÚÏß: 14.2Сʱ
- ³æºÅ: 2868309
- ×¢²á: 2013-12-13
- ÐÔ±ð: GG
- רҵ: ³£Î¢·Ö·½³ÌÓ붯Á¦ÏµÍ³
3Â¥2013-12-20 13:35:27
feixiaolin
ÈÙÓþ°æÖ÷ (ÎÄ̳¾«Ó¢)
-
ר¼Ò¾Ñé: +518 - Ó¦Öú: 942 (²©ºó)
- ¹ó±ö: 1.275
- ½ð±Ò: 3880
- É¢½ð: 58785
- ºì»¨: 532
- ɳ·¢: 11
- Ìû×Ó: 24215
- ÔÚÏß: 2601.8Сʱ
- ³æºÅ: 2139575
- ×¢²á: 2012-11-21
- רҵ: ¹âѧÐÅÏ¢»ñÈ¡Óë´¦Àí
- ¹ÜϽ: Êýѧ
¡ï
Сľ³æ: ½ð±Ò+0.5, ¸ø¸öºì°ü£¬Ð»Ð»»ØÌû
Сľ³æ: ½ð±Ò+0.5, ¸ø¸öºì°ü£¬Ð»Ð»»ØÌû
|
Ôʽ£¬ºóÁ½ÏîÌá³ö¹«Òò×Óexp(m/2)£¬ д³É sinA*cosB+cosA*sinBµÄÐÎʽ£¬ÓÐ exp(m/2)*sqrt(1+1/3)*sin(sqrt(3)*m/2)-arctan(sqrt(3)))=0 Ôʽ exp(-m)+exp(m/2)*sqrt(1+1/3)*sin(sqrt(3)*m/2)-arctan(sqrt(3)))=0 exp(-m)>0, ¹Ê±ØÐëÈ¡ exp(m/2)*sqrt(1+1/3)*sin(sqrt(3)*m/2)-arctan(sqrt(3)))<0 µÄÇø¼ä |
4Â¥2013-12-20 15:02:00
