(二)数列1.(2018·三明质检)已知正项数列{an}的前n项和为Sn,a1=1,且(t+1)Sn=a+3an+2(t∈R).(1)求数列{an}的通项公式;(2)若数列{bn}满足b1=1,bn+1-bn=an+1,求数列的前n项和Tn
解(1)因为a1=1,且(t+1)Sn=a+3an+2,所以(t+1)S1=a+3a1+2,所以t=5
所以6Sn=a+3an+2
①当n≥2时,有6Sn-1=a+3an-1+2,②①-②得6an=a+3an-a-3an-1,所以(an+an-1)(an-an-1-3)=0,因为an>0,所以an-an-1=3,又因为a1=1,所以{an}是首项a1=1,公差d=3的等差数列,所以an=3n-2(n∈N*).(2)因为bn+1-bn=an+1,b1=1,所以bn-bn-1=an(n≥2,n∈N*),所以当n≥2时,bn=(bn-bn-1)+(bn-1-bn-2)+…+(b2-b1)+b1=an+an-1+…+a2+b1=
又b1=1也适合上式,所以bn=(n∈N*).所以==·=·,所以Tn=·=·,=
2.(2018·葫芦岛模拟)设等差数列{an}的前n项和为Sn,且S3,,S4成等差数列,a5=3a2+2a1-2
(1)求数列{an}的通项公式;(2)设bn=2n-1,求数列的前n项和Tn
解(1)设等差数列{an}的首项为a1,公差为d,由S3,,S4成等差数列,可知S3+S4=S5,得2a1-d=0,①由a5=3a2+2a1-2,②得4a1-d-2=0,由①②,解得a1=1,d=2,因此,an=2n-1(n∈N*).(2)令cn==(2n-1)n-1,则Tn=c1+c2+…+cn,∴Tn=1·1+3·+5·2+…+(2n-1)·n-1,③Tn=1·+3·2+5·3+…+(2n-1)·n,④③-④,得Tn=1+2-(2n-1)·n
