f'???f????m
?an?an?1?man?1?an?2?...?mn?1a1?a0?0?m?1
?级数?mn?1?n?1a1?a0收敛,?级数
?an?1?n?an?1收敛,即
??an?1?n?an?1?绝
对收敛。
七(.本题15分)是否存在区间
满足f?0??f?2??1, ?0,2?上的连续可微函数f(x),
f、?x??1,?0f?x?dx?1?请说明理由。
2?0,1?时,由拉格朗日中值定理得: ??1介于0,x之间,使得f?x??f?0??f'??1?x,, 同理,当x??1,2?时,由拉格朗日中值定理得:
??2介于x,2之间,使得f?x??f?2??f'??2??x?2?
''即f?x??1?f??1?x,x??0,1?;f?x??1?f??2??x?2?,x??1,2? ??1?f、?x??1,
?1?x?f?x??1?x,x??0,1?;x?1?f?x??3?x,x??1,2?
解:假设存在,当x?显然,
1f?x??0,?f?x?dx?0
02212100121???1?x?dx???x?1?dx??f?x?dx???1?x?dx???3?x?dx?30??f?x?dx?1,又由题意得?f?x?dx?1,??f?x?dx?1
000222即
?20??1?x,x??0,1?f?x?dx?1,?f?x??? ??x?1,x??1,2??lim?x?1f?x??f?1?x?1f?x??f?1?x?11?x?lim?1,lim?lim??1?x?1?x?1x?1?x?1x?1x?1
'又因为f(x)是在区间?0,2?上的连续可微函数,即f?1?存在,矛盾,?f'?1?不存在,
故,原假设不成立,所以,不存在满足题意的函数f(x)。