问题
解答题
已知数列{an}(n为正整数)是首项是a1,公比为q的等比数列.
(1)求和:a1C20-a2C21+a3C22,a1C30-a2C31+a3C32-a4C33;
(2)由(1)的结果归纳概括出关于正整数n的一个结论,并加以证明.
答案
(1)a1C20-a2C21+a3C22
=a1-2a1q+a1q2
=a1(1-q)2
a1C30-a2C31+a3C32-a4C33
=a1-3a1q+3a1q2-a1q3
=a1(1-q)3;
(2)归纳概括的结论为:
若数列{an}是首项为a1,
公比为q的等比数列,
则a1Cn0-a2Cn1+a3Cn2-a4Cn3+…+(-1)nan+1Cnn=a1(1-q)n,
n为正整数.
证明:a1Cn0-a2Cn1+a3Cn2-a4Cn3+…+(-1)nan+1Cnn
=a1Cn0-a1qCn1+a1q2Cn2-a1q3Cn3+…+(-1)na1qnCnn
=a1[Cn0-qCn1+q2Cn2-q3Cn3+…+(-1)nqnCnn]
=a1(1-q)n.