数列{an}中,若a1,a2-a1,a3-a2,...,an-an-1,...是首项为1,公比为1/3的等比数列,则an等于多少?
热心网友
解:由题意,设b1=a1=1b2=a2-a1=1/3b3=a3-a2=(1/3)**2……bn=an-a(n-1)=(1/3)**(n-1)q=1/3则,b1+b2+b3+…+bn=a1+(a2-a1)+(a3-a2)+…+(an-a(n-1))=an且,b1+b2+b3+…+bn=1+1/3+(1/3)**2+(1/3)**(n-1)=1/(1-q)=1/(1-1/3)=1/(2/3)=3/2所以,an=3/2
热心网友
解:(a2 - a1)/a1 = 1/3,a2 = (4/3)^1(a3 - a2)/a2 = 1/3,a3 = (4/3)^2(a4 - a3)/a3 = 1/3,a4 = (4/3)^3……(ak - a(k - 1))/a(k - 1) = 1/3,ak = (4/3)^(k - 1)……(an - a(n - 1))/a(n - 1) = 1/3,an = (4/3)^(n - 1)
热心网友
解:由提议:a1=1a2-a1=(1/3)^1a3-a2=(1/3)^2...a(n-1)-a(n-2)=(1/3)^(n-2)an-a(n-1)=(1/3)^(n-1)以上各式相加:an=[(1/3)^n-1]/(1/3-1)=3/2-(1/3)^(n-1)/2
热心网友
解:由已知可以得到an-a(n-1)=(1/3)^(n-1)a(n-1)-a(n-2)=(1/3)^(n-2)a(n-2)-a(n-3)=(1/3)^(n-4).....................a2-a1=(1/3)^(2-1)a1=1把这n个等式的两边分别相加,得到an=(1/3)^(n-1)+(1/3)^(n-2)+(1/3^(n-3)+......+1/3+1=[[(1/3)^n-1]/(1/3-1)=2-2(1/3)^n, (n=2)an=1 (n=1)