1.等差数列an前n项和为Sn,求证S(2n-1)=(2n-1)an2.等差数列an,bn的前n项和分别为Sn和Tn,若Sn/Tn=2n/3n+1,求an/bn的表达式
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1.等差数列an前n项和为Sn,设首项为a1公差为d,an=a1+(n-1)d;a(2n-1)=a1+(2n-1-1)d=a1+2(n-1)d,S(2n-1)=[a1+a1+2(n-1)d](2n-1)/2=[a1(n-1)d](2n-1)=(2n-1)an;
2.Sn/Tn=2n/3n+1,S(2n-1)/T(2n-1)=[(2n-1)an]/[(2n-1)bn]=(4n-2)/[6n-3+1]=(2n-1)/(3n-1),
an/bn=(2n-1)/(3n-1).