问题
解答题
等差数列{an}和等比数列{bn}满足:a1=b1=1,a2=b2≠1,a5=b3,设cn=an•bn,其中n∈N*.
(1)求数列{cn}的通项公式;
(2)设Sn=c1+c2+…+cn,求Sn.
答案
(1)因为等差数列中an=1+(n-1)d;
等比数列中 bn=qn-1;
∴a2=1+d=b2=q;
a5=1+4d=q2=(1+d)2;
得出d(d-2)=0;
因为a2=b2≠1,,所以d=2,q=3;
an =2n-1;bn=3n-1
所以 cn=(2n-1)3n-1;
(2)Sn=c1+c2+…+cn=1•30+3•31+5•32+…+(2n-1)3n-1
3Sn=1•31+3•32+5•33+…+(2n-1)3n
3Sn-Sn=-1-2•31-2•32-…-2•3n-1+(2n-1)3n
=-1-2×
+(2n-1)3n3[3n-1-1] 3-1
=(2n-2)3n+2
Sn=(n-1)3n+1.