∵A-1=
x?1x?3x?32 当A∈Z时,亦有A-1∈Z.?
若x+1=0,则A=1∈Z(x= -1).? 若x+1≠0,有:A-1=
1x?3x?3x?12∈Z.这有两种可能.?
(1)
x?3x?3x?1x?3x?3x?122=±1. x2-4x+2=0,x=2±2;或x2-2x+4=0,无实数解,舍去.?
(2)
是分子1的真分数.? 令x2-3x+3=1,得x=1或2.?
故所求实数为x=-1,1,2,2±2.相应的整数为A=1,3,4,2.? 2.设两方程组的相同解为(x0,y0).? ?3x0?2y0?8?x0?2??由?
?6x0?5y0?7?y0?13??4m?n?1?m?3?2nx0?11y0?1代入?.? ????3??56?11n?1?n??5?7x0?11ny0?13.反客为主,原方程改写为关于a的一元二次方程:?
a2-(2x2-6x-2)a+x4-6x3+6x2+8x=0.? [a-(x2-3x-1)]2 =(x-1)2? a=(x-3x-1)±(x-1)?
有x2-2x-2-a=0 ①? 或x2-4x-a=0 ②? 由①:(x-1)2 = a+3.? 当a≥-3时,x=1±a?3.? 由②:(x-2)2=a+4.?
当a≥-4时,x=2±a?4. 故a<-4时,原方程无实根;?
a∈[-4,-3)时原方程有两解:x=2±a?4;?a∈[-3,+∞)时,原方程有四解: x=1±a?3,x=2±a?4.?
4.反客为主,先求Sn再求an,∵2Sn=(S n - Sn-1)+2S2n - 2SnSn-1=S2n-2SnSn-1+S2n-1+1.?
6
2
1Sn?Sn?1,得:?
∴Sn - Sn-1=1,∵a1=S1=1,令n=2,3,?,n,用叠加法可得Sn - S1=n-1.? ∴Sn=n,得an=Sn - Sn-1=n??1?n?1,于是?an=??n?2222
?(n?1)n?1?(n?2).?
5.设a=2,原方程转化为:a2-ax2-x(x2+x)=0,即(a-x2-x)(a+x)=0,? ∴x2+x=a或x= -a,? ∵a=2.? ∴x2+x-2=0?x=112±
21?42
或x=-2.??
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