@ˆ®ìˆã‘å‚Í‘—§ˆãŠw•”‚Æ‚µ‚Ă͕η’l‚Í‚‚‚È‚¢‚Ì‚¾‚낤‚©A”Šw‚Ì–â‘è‚͈Ղµ–Ú‚¾B–â2‚Í•’Ê‚Ì–â‘è‚È‚Ì‚ÅA‘—§‘åŠw—Œn‚ðŽóŒ±‚·‚él‚Í—ûK–â‘è‚Æ‚µ‚Ä—ÞŽ—–â‘è‚ð‰ð‚¢‚½‚±‚Æ‚ª‚ ‚邾‚낤B–â3‚ÍA‚½‚¾”‚¦‚邾‚¯B‚½‚¾‚µAƒ°k‚⃰k2‚ðŠo‚¦‚Ä‚¢‚È‚¢‚Æo—ˆ‚È‚¢B–â4‚Í–â‘蕶‚̈Ӗ¡‚ª•ª‚©‚ê‚ÎA‚ ‚Æ‚Í’†Šw¶‚̘A—§•û’öŽ®‚Ì–â‘è‚É–Ñ‚ª¶‚¦‚½’ö“xB
@–â1‚Ío‘èŽÒ‚̈Ó}‚ð“Ç‚ß‚È‚¢‚Ɠ‚¢B
@‚»‚¤‚¢‚¤‚±‚Æ‚ÅA–â1‚ð‰ð“š‚µ‚Ü‚·B
–â1‚̉ð“š
y=log(x)
y'=1/x
‚æ‚Á‚ÄAx=p‚É‚¨‚¯‚éÚü‚ÌŽ®‚Í
y=(x-p)/p+log(p)
‚±‚Ìü‚ªxŽ²‚ÆŒð‚í‚éxÀ•W‚ð-n‚Æ‚·‚é‚ÆA
n=p{log(p)-1}
‚·‚È‚í‚¿An=an{log(an)-1}
(1)
n=an{log(an)-1}‚Ån=0‚Æ‚·‚é‚ÆAa0=e
(2)
‹‚ß‚é–ÊÏ‚ðS(n)‚Æ‚·‚éB
S(n)=ç1anlog(x)dx=n+1
(3)
log(x)‚Í’P’²‘‰ÁŠÖ”‚¾‚©‚çAŽŸŽ®‚ª¬‚è—§‚ÂB
{an+1-an}log(an)<S(n+1)-S(n)<{an+1-an}log(an+1)
(2)‚æ‚èAS(n+1)-S(n)=1‚Å‚ ‚é‚©‚çAŽŸŽ®‚ª¬‚è—§‚ÂB
1/log(an+1)<an+1-an<1/log(an)
‚·‚È‚í‚¿A
lim(an+1-an) = 0 (n¨‡)
‚±‚±‚ÅAlim an=‡‚ðŽg‚Á‚½B
anlog(an)an{log(an)-1}{an{log(an)-1}/{log(an)-1}
=n+n/{log(an)-1}
‚È‚º‚È‚ç‚ÎAn=an{log(an)-1}
‚æ‚Á‚ÄAanlog(an)/n=1+1/{log(an)-1}¨1 (n¨1)
ù¾ºÒÝÄ‚ð‚·‚é