问题标题:
【若等差数列{an}{bn}的前n项和为Sn和Tn,且Sn/Tn=(2n-1)/(n+3),则a7/b7=___an/bn=__】
问题描述:
若等差数列{an}{bn}的前n项和为Sn和Tn,且Sn/Tn=(2n-1)/(n+3),则a7/b7=___an/bn=__
邓冰回答:
设数列{an}公差为d,数列{bn}公差为d'.Sn/Tn=[na1+n(n-1)d/2]/[nb1+n(n-1)d'/2]=[dn+(2a1-d)]/[d'n+(2b1-d')]=(2n-1)/(n+3)令d=2t,则2a1-d=-t,d'=t,2b1-d'=3t解得a1=t/2d=2tb1=2td'=ta7/b7=(a1+6d)/(b1+6d')=(t/2...
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