题目:
数列{an}满足a1+a2+…+an=2n;则a12+a22+…+an2=______.
答案:
∵a1+a2+…+an=2n,
∴a1+a2+…+an-1=2n-1,
则an=(a1+a2+…+an)-(a1+a2+…+an-1)=2n-2n-1=2n-1,
∴an2=4n-1,
∴数列{an2}是以1为首项,公比为4的等比数列,
则a12+a22+…+an2=
=1-4n 1-4
.4n-1 3
故答案为:4n-1 3
数列{an}满足a1+a2+…+an=2n;则a12+a22+…+an2=______.
∵a1+a2+…+an=2n,
∴a1+a2+…+an-1=2n-1,
则an=(a1+a2+…+an)-(a1+a2+…+an-1)=2n-2n-1=2n-1,
∴an2=4n-1,
∴数列{an2}是以1为首项,公比为4的等比数列,
则a12+a22+…+an2=
=1-4n 1-4
.4n-1 3
故答案为:4n-1 3
