高中数学 数列题帮我解答一下,谢谢,题目如下
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an= 2-1/a(n-1)
an-1 = 1- 1/a(n-1)
= [a(n-1) -1]/ a(n-1)
1/(an-1) = a(n-1) /[a(n-1) -1]
= 1+ 1/[a(n-1) -1]
1/(an-1) - 1/[a(n-1) -1] =1
1/(an-1) -1/(a1-1) = n-1
1/(an-1) =(2n- 7)/2
an-1 = 2/(2n-7)
an = (2n-5)/(2n-7)
an-1 = 1- 1/a(n-1)
= [a(n-1) -1]/ a(n-1)
1/(an-1) = a(n-1) /[a(n-1) -1]
= 1+ 1/[a(n-1) -1]
1/(an-1) - 1/[a(n-1) -1] =1
1/(an-1) -1/(a1-1) = n-1
1/(an-1) =(2n- 7)/2
an-1 = 2/(2n-7)
an = (2n-5)/(2n-7)
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证明:令bn=1/(an-1)(n∈N*)
an*a(n-1)+1=2a(n-1)
an=[2a(n-1)-1]/a(n-1)
an -1= [2a(n-1)-1]/a(n-1) -1= [a(n-1)-1]/a(n-1)
1/(an -1) = a(n-1)/[a(n-1)-1] = {[a(n-1)-1]+1} /[a(n-1)-1]
=1+ 1/[a(n-1) -1]
1/(an -1) -1/[a(n-1) -1] =1
即 bn - b(n-1)= 1
所以bn 是等差数列。
bn =b1 +1*(n-1)= 1/(a1 -1) +n-1=1/(-2/5) +n-1= n-7/2, n>=2
an =1/bn +1
=1/(n-7/2) +1
= 1+ 2/(2n-7)
an*a(n-1)+1=2a(n-1)
an=[2a(n-1)-1]/a(n-1)
an -1= [2a(n-1)-1]/a(n-1) -1= [a(n-1)-1]/a(n-1)
1/(an -1) = a(n-1)/[a(n-1)-1] = {[a(n-1)-1]+1} /[a(n-1)-1]
=1+ 1/[a(n-1) -1]
1/(an -1) -1/[a(n-1) -1] =1
即 bn - b(n-1)= 1
所以bn 是等差数列。
bn =b1 +1*(n-1)= 1/(a1 -1) +n-1=1/(-2/5) +n-1= n-7/2, n>=2
an =1/bn +1
=1/(n-7/2) +1
= 1+ 2/(2n-7)
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an-1=1-1/(a(n-1)=(a(n-1)-1)/(a(n-1) )两边倒数得到
1/(an-1)=(a(n-1))/(a(n-1)-1)=1+1/(a(n-1)-1)
把1/(an-1)当做一整体1/(an-1)是个等差数列又1/(a1-1)=-5/2
所以1/(an-1)=n-7/2
an=1+2/(2n-7)=(2n-5)/(2n-7)
1/(an-1)=(a(n-1))/(a(n-1)-1)=1+1/(a(n-1)-1)
把1/(an-1)当做一整体1/(an-1)是个等差数列又1/(a1-1)=-5/2
所以1/(an-1)=n-7/2
an=1+2/(2n-7)=(2n-5)/(2n-7)
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