作业帮有两个等差数列{an}{bn},若(a1+a2+.+an)/(b1+b2+.+bn)=(3n-1)/(2n+3)则a13
来源:学生作业帮 编辑:作业帮 分类:数学作业 时间:2024/05/16 07:47:37
有两个等差数列{an}{bn},若(a1+a2+.+an)/(b1+b2+.+bn)=(3n-1)/(2n+3)则a13/b13=?
设数列{an}前n项和为Sn,公差为d;数列{bn}前n项和为Tn,公差为d'.
Sn/Tn=[na1+n(n-1)d/2]/[nb1+n(n-1)d'/2]
=[2a1+(n-1)d]/[2b1+(n-1)d']
=[(2a1-d)+nd]/[(2b1-d')+nd']
=(a1+a2+...+an)/(b1+b2+...+bn)
=(3n-1)/(2n+3)
令d=3t,则2a1-d=-t,d'=2t,2b1-d'=3t.
解得
a1=t,d=3t,b1=2.5t,d'=2t
a13/b13=(a1+12d)/(b1+12d')
=(t+12×3t)/(2.5t+12×2t)
=74/53
Sn/Tn=[na1+n(n-1)d/2]/[nb1+n(n-1)d'/2]
=[2a1+(n-1)d]/[2b1+(n-1)d']
=[(2a1-d)+nd]/[(2b1-d')+nd']
=(a1+a2+...+an)/(b1+b2+...+bn)
=(3n-1)/(2n+3)
令d=3t,则2a1-d=-t,d'=2t,2b1-d'=3t.
解得
a1=t,d=3t,b1=2.5t,d'=2t
a13/b13=(a1+12d)/(b1+12d')
=(t+12×3t)/(2.5t+12×2t)
=74/53
有两个等差数列an,bn,若Sn/Tn=a1+a2+.an/b1+b2+---+bn=3n-1/2n+3,则a13/b1
有两个等差数列{an}{bn},若(a1+a2+.+an)/(b1+b2+.+bn)=(3n-1)/(2n+3)则a13
两个等差数列{an},{bn},a1+a2+...+an/b1+b2+...+bn=7n+2/n+3,求a7/b7?急,
两个等差数列{an},{bn},a1+a2+...+an/b1+b2+...+bn=7n+2/n+2,则a5/b5=?
两个等差数列{an},{bn},a1+a2+a3+...+an/b1+b2+b3+...+bn=7n+2/n+3. 则a
有两个等差数列{an},{bn},满足a1+a2+…+an/(b1+b2+…+bn)=5n/(3n+6),则a7/b7=
有两个等差数列{an],{bn]满足(a1+a2+a3+…an)/(b1+b2+b3+…bn)=(7n+2)/(n+3)
若两个等差数列{an} {bn} 满足a1+a2+a3+.+an/b1+b2+b3+.+bn=7n+2/n+3 求a5/
急!等差数列{an}{bn}且b1+b2+.+bn分之a1+a2+.+an=3n-1分之2n+3,求a9比b9=?
已知两等差数列an.bn,且a1+a2+.+an/b1+b2+.+bn=3n+1/4n+3,对于任意正整数n都成立,求a
已知数列an bn都是等差数列(a1+a2+...+an)/(b1+b2+...+bn)=7n+2/n+3 求a5/b5
AN=3^(n-1),b1/a1+b2/a2+...+bn/an=n(n+2),求{bn}的前n项和TN.要过程啊.