MatlabϰÌâ

µÚÒ»Õ MATLABÈëÃÅ 17

ϰÌâ 7

1. ÓÃMATLAB·ûºÅ¼ÆËãÑéÖ¤Èý½ÇµÈʽsin?cos? ?cos?sin?=sin(???).

2. ×÷Òòʽ·Ö½â f(x)=x4-5x3+5x2+5x-6.

?12?3. Çó¾ØÕóA=??2a??µÄÄæºÍÌØÕ÷Öµ¡£

??4. ¼ÆË㼫ÏÞlim(3?9)£¬limx??xx1xxyxy?1?1x?0y?0

?115. ¼ÆËã?k£¬ ?2ºÍ? 2n?1k(2n?1)(2x?1)k?1k?1n?02?n?36. Çó2sin(x2yz)|x=1, y=1,z=3.

?x?y7. (TaylorÕ¹¿ª)ÇóÏÂÁк¯ÊýÔÚx=0µÄTaylorÃݼ¶ÊýÕ¹¿ªÊ½(n=8) ex, ln(1+x), sin(x), ln(x?1?x2)

8. ÊÔ½áºÏdiffºÍ½â·½³ÌÇó½âµÚËÄÕÂϰÌâ8¼°Ï°Ìâ9.

9. (²»¶¨»ý·Ö)ÓÃint¼ÆËãÏÂÁв»¶¨»ý·Ö£¬²¢ÓÃdiffÑéÖ¤

10. ¼ÆËã»ý·ÖI(x)?

?e2ydy, ye?2x?x2a2?x2dx,

?dx(a?b)

x(lnx?a?lnx?b)??x(x?y)3sin(x?2y)dy¡£

11. ÊÔÓÃintÇó½âµÚÎåÕÂϰÌâ5 .

12. ÊÔÓÃsolveÇó½âµÚËÄÕÂϰÌâ1, 2, 5, 6, 7.

13. ÊÔÓÃdsolveÇó½âµÚÁùÕÂϰÌâ1, 2, 3¡£

18 µÚÒ»Õ MATLABÈëÃÅ

14. ÊÔÓüò½Ý×÷ͼָÁî½âµÚ¶þÕÂϰÌâ6¡£

?

15. µ÷ÓÃMapleÇóº¯Êýf(x,y)?(x2?2x)e?x2?y2?xyÔÚx=0, y=aµÄ¶þ½×TaylorÕ¹¿ª.

?

16. (1)·Ö±ðÓÃÊýÖµºÍ·ûºÅÁ½ÖÖ·½·¨£¬±à³Ì¼ÆËã100£¡£¬½á¹ûÓкβ»Í¬£¿Äĸö¼ÆËã¿ì£¿

(2) Ó÷ûºÅ·½·¨£¬±à³Ì¼ÆËã200£¡£¬½á¹ûΪ¶à´óÊýÁ¿¼¶£¿ÄÜÓÃÊýÖµ·½·¨¼ÆËãÂ𣿠17. Á¬ÐøÖÜÆÚº¯Êýf(x)ÔÚ[a, b]ÉÏ(ÖÜÆÚT=2L=b-a)µÄFourier¼¶ÊýÕ¹¿ªÊ½Îª

?

a0?n?xn?xf(x)???(ancos?bnsin)

2n?1LLÆäÖÐFourierϵÊý

1Ln?xf(x)cosdx, n?0,1,2,?L??LL

1Ln?xnn??f(x)sindx, n?1,2,?L?LLan?ÊÔ±à³ÌÇóFourierϵÊý£¬²¢ÀûÓøóÌÐòÇóº¯Êý y = x(x-?)( x-2?)µÄFourier¼¶ÊýÕ¹¿ªÊ½Ç°7Ïî¡£

µÚÒ»Õ MATLABÈëÃÅ 19

ϰÌâ 8

1. ÒÔÏÂÊÇ 100 ´Îµ¶¾ß¹ÊÕϼǼ£¬¼´¹ÊÕϳöÏÖʱ¸Ãµ¶¾ßÍê³ÉµÄÁã¼þÊý¡£·ÖÎöÕâÅúÊý¾ÝÊÇ·ñ·þ´ÓÕý̬·Ö²¼£¬²¢ÇóÆä¾ùÖµºÍ¾ù·½²î¡£×¢Ò⣬ÓÉÓڼͼʧÎ󣬯äÖпÉÄÜÓÐЩÊý¾ÝÊÇ´íÎóµÄ,Òª¶Ô´Ë½øÐÐÊʵ±´¦Àí¡£

459, 362, 624, 542, 509, 584, 433, 748, 815, 505, 612, 452, 434, 982,640782, 742, 565, 706, 593, 680, 926, 653, 164, 487, 734, 608, 428, 1153, 593, 844, 527, 552, 513, 781, 474, 388, 824, 538, 862, 659, 775, 859, 755, 649, 697, 515, 628, 954, 771, 609, 2, 960, 885, 610, 292, 837, 473, 677, 358, 638, 699, 634, 555, 570, 84, 416, 606, 1062, 484, 120, 447, 654, 564, 339, 280, 246, 687, 539, 790, 581, 621, 724, 531, 512, 577, 496, 468, 499, 544, 645, 764, 558, 378, 765, 666, 763, 217, 715, 310, 851 2. ±í8.4¸ø³öÁË1930Äê¸÷¹úÈ˾ùÄêÏûºÄµÄÑÌÈ¥ÊýÒÔ¼°1950ÄêÄÐ×ÓËÀÓڷΰ©µÄËÀÍöÂÊ¡£(×¢£ºÑо¿ÄÐ×ӵķΰ©ËÀÍöÂÊÊÇÒòΪÔÚ1930Äê×óÓÒ¼¸ºõ¼«Éٵĸ¾Å®ÎüÑÌ£¬¼Ç¼1950ÄêµÄ·Î°©ËÀÍöÂÊÊÇÒòΪ¿¼Âǵ½ÎüÑ̵ÄЧӦҪÓÐÒ»¶Îʱ¼ä²ÅÄÜÏÔÏÖ)

±í8.4 ¸÷¹úÑÌÏûºÄÁ¿Óë·Î°©ÈËÊý

¹ú ¼Ò °Ä´óÀûÑÇ ¼ÓÄÃ´ó µ¤Âó ·ÒÀ¼ Ó¢¹ú ºÉÀ¼ ±ùµº ŲÍþ Èðµä ÈðÊ¿ ÃÀ¹ú

1930ÄêÈ˾ùÑÌÏûºÄÁ¿

480 500 380 1100 1100 490 230 250 300 510 1300

1950Äêÿ°ÙÍòÄÐ×ÓËÀÓڷΰ©ÈËÊý

180 150 170 350 460 240 60 90 110 250 200

(1)»­³ö¸ÃÊý¾ÝÉ¢µãͼ£»

(2) ¸ÃÉ¢µãͼÊÇ·ñ±íÃ÷ÔÚÎüÑ̶àµÄÈËÖмä·Î°©ËÀÍöÂʽϸߣ¿ (3)¼ÆËãÁ½ÁÐÊý¾ÝµÄÏà¹ØÏµÊý¡£

3. ÏÂͼÖеÄ6¸öÉ¢µãͼ·Ö±ð¾ßÓÐÈçÏÂÏà¹ØÏµÊý -0.85, -0.38, -1.00, 0.06, 0.60, 0.97 Ç뽫Ïà¹ØÏµÊýÓëÉ¢µãͼÏàÅä ¡£

20 µÚÒ»Õ MATLABÈëÃÅ

ͼ8.10a

ͼ8.10b

ͼ8.10c

ͼ8.10d

ͼ8.10e

ͼ8.10f

4. (ÖÀÓ²±Ò) ¿¼Âǽ«Ò»Ã¶¾ùÔÈÓ²±ÒÖÀN´Î£¬µ±NºÜ´óʱ£¬ÕýÃæ³öÏֵĻúÂʽӽü0.5£¬Éè¼ÆÒ»¸öËæ»úÄ£ÄâÊÔÑéÏÔʾÕâÒ»ÏÖÏó¡£

5. (¶þÏî·Ö²¼Ëæ»úÊý²úÉú) ÈçºÎÓÃ×î»ù±¾µÄËæ»úÊýº¯Êýrand²úÉú¶þÏî·Ö²¼B(n, p)µÄÒ»¸öËæ»úÊýÄØ£¿ÏÈ¿¼ÂÇBernoulliÊÔÑ飬Ϊ´Ë²úÉúÒ»¸ö(0,1)ÉϾùÔÈ·Ö²¼Ëæ»úÊý£¬ÈôÕâ¸öÊýСÓÚp, ÔòÊÔÑé½á¹û¼ÇΪ1£¬·ñÔò¼ÇΪ0£¬ÄÇôÊÔÑé½á¹û·þ´Ó0-1·Ö²¼, n¸ö¶ÀÁ¢0-1·Ö²¼Ëæ»úÊýµÄºÍ±ãÊÇÒ»¸ö¶þÏî·Ö²¼Ëæ»úÊý¡£ÊÔ¸ù¾ÝÕâÑùµÄ˼·±àдB(n, p) Ëæ»úÊýÉú³Éº¯Êý¡£ 6. (¶þÏî·Ö²¼µÄÕý̬½üËÆ) Demorvie-LaplaceÖÐÐļ«ÏÞ¶¨ÀíÖ¸³ö£¬Èô?¡«B(n,p), nºÜ´ó, Ôò¹æ·¶»¯Ëæ»ú±äÁ¿??np½üËÆ·þ´ÓN£¨0£¬1£©¡£ÓüÆËã»úʵÑé½øÐÐÑéÖ¤¡£

np(1?p)7. ÓÃÃÉÌØ¿¨Âå·¨¼ÆËã»ý·Ö

x2exp(?)12dx£¬2?exp(x/2)sin2(x)dx£¬?sin(x)exp(?x2?y2)dxdy

?02??0?0?08. ·Ö±ðÓÃÃÉÌØ¿¨Âå·¨ºÍfminsearchÇóÏÂÁжþÔªº¯Êý×î´óÖµ£¬²¢Í¨¹ýͼÐÎ×÷³öÆÀÂÛ¡£

f(x,y)=(x2+2y2+xy)exp(-x2-y2), |x|<1.5,|y|<1.5

?12??12?9. ¡°Èκζþ½×·½Õó¶¼ÊÇ¿ÉÄæµÄ¡±ºÜÃ÷ÏÔÊÇÒ»¸ö´íÎóÃüÌâ¡£ÀýÈç??,??¶¼ÊDz»¿ÉÄæ

?00???2?4?

ÁªÏµ¿Í·þ£º779662525#qq.com(#Ìæ»»Îª@)