已知 等差数列 an bn前n项和分别为Sn Tn
来源:学生作业帮助网 编辑:作业帮 时间:2024/09/25 18:34:00
设第一项为a,步长为K,则a+(n-1)*K=5,a+(2n-1)*K=20,则K=3,5,1,15.其中,K=15合题意.进而得n=1,a=5.S3n=5+(3-1)*15=35.前n项和:5n+(
Sn=(a1+an)n/2a1为首项an为末项Sn=a1n+n(n+1)d/2a1为首项,d为公差
Sn=[n(a1+an)]/2=na1+(1/2)n(n-1)d
s5=a1+(a1+d)+(a1+2d)+(a1+3d)+(a1+4d)=5a1+10d=24 得a1+2d=24/5=a3 a2+a4=2a3
我也是学生.等差数列这里关键是熟记公式1.这是公式题an/bn=S(2n-1)/T(2n-1)因为an/bn=n/2(a1+a(2n-1))/n/2(b1+b(2n-1))=7n+2/n+3直接代入a
Sn=na1+d*n(n-1)/2
解题思路:等差数列解题过程:varSWOC={};SWOC.tip=false;try{SWOCX2.OpenFile("http://dayi.prcedu.com/include/readq.ph
∵anbn=2an2bn=a1+a2n−1b1+b2n−1=(2n−1)(a1+a2n−1) 2(2n−1)(b1+b2n−1) 2=s2n−1T2n−1∴anbn=2(2n−1)
an=a1+(n-1)dbn=b1+(n-1)Da1=36.b1=64,a100+b100=100所以d+D=0an的等差为d.则bn的等差为-d数列an+bn是等差为0的等差数列100*200=20
令Tn为{anbn}的前n项和,那么:Tn=a1b1+a2b2+…+anbn=1×20+3×21+5×22+…+(2n-1)•2n-12Tn=1×21+3×22+5×23+…(2n-1)•2n∴Tn=
n是(1/2)n还是1/(2n)
cn=anbn=(3n-1)*2^nSn=2*2^1+5*2^2+……+(3n-1)*2^n2Sn=2*2^2+……+(3n-4)*2^n+(3n-1)*2^(n+1)相减:Sn=(3n-1)*2^(
等我算算啊,几分钟
Sn=-2n^2-nS(n-1)=-2(n-1)^2-(n-1)an=Sn-S(n-1)=-2n^2-n+2(n-1)^2+(n-1)=2[(n-1)^2-n^2]-1=-4n+1a1=-3an是以-
由等差数列的性质和求和公式可得:anbn=2an2bn=a1+a2n−1b1+b2n−1=(2n−1)(a1+a2n−1)2(2n−1)(b1+b2n−1)2=A2n−1B2n−1=7(2n−1)+4
∵等差数列{an}、{bn},∴an=a1+a2n−12,bn=b1+b2n−12,∴anbn=nannbn=n(a1+a2n−1)2n(b1+b2n−1)2=S2n−1T2n−1,又SnTn=7n+
∵数列{an}、{bn}是等差数列,且其前n项和分别为An、Bn,由等差数列的性质得,A21=(a1+a21)×212=21a11,B21=(b1+b21)×212=21b11,∵足AnBn=7n+1
因为Sn=2^n-1所以S(n-1)=2^(n-1)-1所以an=Sn-S(n-1)=2^(n-1)(n>=2)因为S1=a1=2^1-1=1=2^0所以an=2^(n-1)(n>=2)因为bn=n所
An=A(n-1)+dBn=B(n-1)*qq=1时容易求q不等于1时Sn=A1*B1+A2*B2+...+A(n-1)*B(n-1)+An*Bnq*Sn=A1*B1*q+A2*B2*q+...+A(
n≥2时,a(n)=S(n)-S(n-1)=(2n²+3n)-[2(n-1)²+3(n-1)]=4n+1当n=1时,a1=S1=2×1+3×1=5,也适合上面式子∴a(n)=4n+