数列{AN}满足a1=2,An+1=an2+6an+61.求数列{AN}的通项公式2.设bn=1/(an-6)-1/(an2+6an),{BN}前N项和为TN,求证:-5/16
<p>问题:数列{AN}满足a1=2,An+1=an2+6an+61.求数列{AN}的通项公式2.设bn=1/(an-6)-1/(an2+6an),{BN}前N项和为TN,求证:-5/16<p>答案:↓↓↓<p class="nav-title mt10" style="border-top:1px solid #ccc;padding-top: 10px;">侯看看的回答:<div class="content-b">网友采纳 (1)a(n+1)=(an)^2+6an+6两边同加3得到 a(n+1)+3=(an)^2+6an+9=(an+3)^2; 所以an+3=^2=^4=……=(a1+3)^(2^(n-1))=5^(2^(n-1)); 所以an=5^(2^(n-1))-3; (2)bn=1/(an-6)-1/(an2+6an) =1/(an-6)-1/(a(n+1)-6); 所以 Tn=1/(a1-6)-1/(a2-6)+1/(a2-6)-1/(a3-6)+…+1/(an-6)-1/(a(n+1)-6) =1/(a1-6)-1/(a(n+1)-6)代入a1=2和a(n+1)=5^(2^n)-3; =-1/4-1/; 显然对任意自然数1/>0,所以Tn=T1=-1/4-1/16=-5/16
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