作业帮已知等差数列{an}与等比数列{bn}的前N项和分别为Sn,Tn,且a2=b3=12,a5=b4=181.求an,bn2.求T63.若Sn=190,求n
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已知等差数列{an}与等比数列{bn}的前N项和分别为Sn,Tn,且a2=b3=12,a5=b4=181.求an,bn2.求T63.若Sn=190,求n
已知等差数列{an}与等比数列{bn}的前N项和分别为Sn,Tn,且a2=b3=12,a5=b4=18
1.求an,bn
2.求T6
3.若Sn=190,求n
已知等差数列{an}与等比数列{bn}的前N项和分别为Sn,Tn,且a2=b3=12,a5=b4=181.求an,bn2.求T63.若Sn=190,求n
(1)设an公差为d
a5-a2=3d=18-12=6
d=2
a1=a2-d=10
所以an=a1+(n-1)d=2n+8
设bn公比为q
b4/b3=18/12=3/2
b1=b3/q=9
bn=b1q^(n-1)=6×(3/2)^n
(2)T6=b1(1-q^6)/(1-q)
=6×(1-729/64)/(1-3/2)
=6×665/32
=1995/16
(3)Sn=n[2a1+(n-1)d]/2
=n[20+2(n-1)]/2
=n(n+9)
=190
n1=-19(舍去)n2=10
1、a2=12,a5=18,an为等差数列,则3d=6,d=2。an=a1+(n-1)d=10+(n-1)×2=2n+8
b3=12,b4=18,bn为等比数列,则q=3/2,bn=b1×q﹙ⁿ﹣¹﹚=﹙16/3﹚×(3/2)﹙ⁿ﹣¹)
2、Tn=b1×[1-(q)ⁿ]/(1-q)=-32/3×[1-(3/2)ⁿ]...
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1、a2=12,a5=18,an为等差数列,则3d=6,d=2。an=a1+(n-1)d=10+(n-1)×2=2n+8
b3=12,b4=18,bn为等比数列,则q=3/2,bn=b1×q﹙ⁿ﹣¹﹚=﹙16/3﹚×(3/2)﹙ⁿ﹣¹)
2、Tn=b1×[1-(q)ⁿ]/(1-q)=-32/3×[1-(3/2)ⁿ]
当n=6时,T6=697/6
3、Sn=na1+1/2(n-1)×n×d=10n+n(n-1),∵sn=190∴n=10
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根据通项公式:(1) an=a1+(n-1)*d bn=b1*q^n-1
a2=a1+d=12 a5=a1+4d=18 b3=b1*q^2=12 b4=b1*q^3=18
两式相减a1=10 d=2 两式相除b1=16/3 q=6/5
...
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根据通项公式:(1) an=a1+(n-1)*d bn=b1*q^n-1
a2=a1+d=12 a5=a1+4d=18 b3=b1*q^2=12 b4=b1*q^3=18
两式相减a1=10 d=2 两式相除b1=16/3 q=6/5
an=10+(n-1)*2 bn=16/3*6/5^n-1
(2)Tn=b1(1-q^n)/(1-q) 代数得 16/3(1-6/5^6)/(1-6/5)=52.9595
(3) sn=a1*n+n*(n+1)/2=190 Tn=a1(1-q^n)/(1-q) 16/3(1-6/5^n)/(1-6/5)
n=10 或n=-19(舍) n=10
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