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hank612
ÖÁ×ðľ³æ (ÖøÃûдÊÖ)
- ÊýѧEPI: 14
- Ó¦Öú: 225 (´óѧÉú)
- ½ð±Ò: 14270.6
- É¢½ð: 1055
- ºì»¨: 95
- Ìû×Ó: 1526
- ÔÚÏß: 1375.8Сʱ
- ³æºÅ: 2530333
- ×¢²á: 2013-07-03
- ÐÔ±ð: GG
- רҵ: ÀíÂۺͼÆË㻯ѧ
¡¾´ð°¸¡¿Ó¦Öú»ØÌû
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I think your claim is not true. How about this example: x2=1; y1=y2=y satisfy y^n > 3/2; x1=y +1/4* (y-1)/(y^n-1). then most important restrain: 2 y^n= [y+ 1/4*(y-1)/(y^n-1)]^n +1. You may say that your claim only involves inequality, but equation really does not hurt. Think of continuity. |
2Â¥2013-10-03 12:25:44
hank612
ÖÁ×ðľ³æ (ÖøÃûдÊÖ)
- ÊýѧEPI: 14
- Ó¦Öú: 225 (´óѧÉú)
- ½ð±Ò: 14270.6
- É¢½ð: 1055
- ºì»¨: 95
- Ìû×Ó: 1526
- ÔÚÏß: 1375.8Сʱ
- ³æºÅ: 2530333
- ×¢²á: 2013-07-03
- ÐÔ±ð: GG
- רҵ: ÀíÂۺͼÆË㻯ѧ
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ÎÒÓÃMatlab»ÁËͼ£¬·¢ÏÖyµÄµÈʽÓë²»µÈʽÊÇì¶ÜµÄ£¬ N=200; a=ones(N); b=a; for i=1:N a(i)=power((4/3),1/i); b(i)=3/2-1/2* power((2/3), 1/i); end plot( (a-b).*N ) ·¢ÏÖÄãµÄ½áÂÛÊǶԵģ¬  ·ÖÎöÈçÏ¡£²»·ÁÉèx2=1, ÒòΪ´ó¼Ò¿ÉÒÔ³ýÒÔx2. ²»·ÁÉèy1=y2=y, ÒòΪËõСy1²»Ó°Ïì²»µÈºÅ¡£ ²»·ÁÉèx1^n =2y^n -1, ÕâʱֻҪ֤ x^{n+1} >= 2y^{n+1}-1. °Ñ2*y^{n+1}д³É (x^n+1)*y, ¼´ÒªÖ¤Ã÷ x^n * (x-y) / (y-1) >=1. µ«ÊÇ x^n-y^n = y^n-1 ÍƳö(x-y)/(y-1) = (y^{n-1}+y^{n-2}+...+1) /(x^{n-1}+x^{n-2}*y+...+y^{n-1}). Á¢¿ÌµÃµ½ x^n * (x-y) / (y-1) >=1¡£ Ö¤±Ï¡£  |
3Â¥2013-10-03 23:32:30
10