数列an满足a1=1 a2=3/2 an+2=3/2an+1-1/2an n属于正整数(n+2和n+1为角标)
来源:学生作业帮 编辑:作业帮 分类:数学作业 时间:2024/05/12 18:11:38
数列an满足a1=1 a2=3/2 an+2=3/2an+1-1/2an n属于正整数(n+2和n+1为角标)
(1)记dn=an+1-an求证dn为等比数列
(2)求数列an的通项公式
(3)令bn=3n-2求数列{an*bn}的前n项和Sn
(1)记dn=an+1-an求证dn为等比数列
(2)求数列an的通项公式
(3)令bn=3n-2求数列{an*bn}的前n项和Sn
an+2-an+1=1/2(an+1-an)
dn+1=dn/2
dn+1/dn=1/2
{dn}是公比为1/2的等比数列
d1=1/2
{dn}前n项合计为Sn
Sn=1-1/2^n
Sn=a2-a1+a3-a2+a4-a3……an+1-an=an+1-a1=an+1-1
1-1/2^n=an+1-1
an+1=2-1/2^n
an=2-1/2^(n-1)
令cn=an*bn
cn=(3n-2)-(3n-2)/2^(n-1)
设Sn=S1-S2
S1=3(1+2+3+……n)-2n=(3n^2-n)/2
S2=1/2^0+4/2^1+7/2^2……(3n-2)/2^(n-1)
S2/2=1/2^1+4/2^2+7/2^3……(3n-2)/2^n
前式减后式
S2/2=1/2^0+3/2^1+3/2^2……3/2^(n-1)-(3n-2)/2^n
=1-(3n-2)/2^n+3[1/2+1/2^2+……1/2^(n-1)]
=4-3/2^(n-1)-(3n-2)/2^n
S2=8-3/2^(n-2)-(3n-2)/2^(n-1)
Sn=S1-S2=(3n^2-n)/2-8+3/2^(n-2)+(3n-2)/2^(n-1)
dn+1=dn/2
dn+1/dn=1/2
{dn}是公比为1/2的等比数列
d1=1/2
{dn}前n项合计为Sn
Sn=1-1/2^n
Sn=a2-a1+a3-a2+a4-a3……an+1-an=an+1-a1=an+1-1
1-1/2^n=an+1-1
an+1=2-1/2^n
an=2-1/2^(n-1)
令cn=an*bn
cn=(3n-2)-(3n-2)/2^(n-1)
设Sn=S1-S2
S1=3(1+2+3+……n)-2n=(3n^2-n)/2
S2=1/2^0+4/2^1+7/2^2……(3n-2)/2^(n-1)
S2/2=1/2^1+4/2^2+7/2^3……(3n-2)/2^n
前式减后式
S2/2=1/2^0+3/2^1+3/2^2……3/2^(n-1)-(3n-2)/2^n
=1-(3n-2)/2^n+3[1/2+1/2^2+……1/2^(n-1)]
=4-3/2^(n-1)-(3n-2)/2^n
S2=8-3/2^(n-2)-(3n-2)/2^(n-1)
Sn=S1-S2=(3n^2-n)/2-8+3/2^(n-2)+(3n-2)/2^(n-1)
数列{an}满足a1+2a2+2^2a3+.+2^n-1an=n/2(n属于正整数),
设数列{An}满足A1+3A2+3^2*A3+...+3^(n-1)*An=n/3,a属于正整数.
已知数列an满足1/a1+2/a2+……+n/an=3/8(3∧2n-1),n属于正整数1.求an
数列{an}满足a1=3/2,an+1=an^2-an+1(n属于正整数),则m=1/a1+1/a2+……+1/a200
设数列{an}满足a1+3*a2+3^2*a3+......+3^(n-1)*an=3/n,n属于正整数。 (1)求数列
已知数列{an}满足:a1+2a2+3a3+...+nan=(2n-1)*3^n(n属于正整数)求数列{an}得通项公式
已知数列{An}满足:A1=3 ,An+1=(3An-2)/An,n属于N*.1)证明:数列{(An--1)/(An--
数列{an}满足:1/a1+2/a2+3/a3+…+n/an=2n
数列an满足a1+2a2+3a3+...+nan=(n+1)(n+2) 求通项an
数列{an}满足an=2an-1+2^n+1(n为正整数,n≥2),a3=27 (1)求a1,a2的值
已知数列{an}满足a1=1,a2=2,a(n+2)=(an+a(n+1))/2,n属于正整数.求{an}的通项公式.
一直数列{An}满足A1=1/2,A1+A2+…+An=n^2An