分析:
奇数项:a2k+1=1+(-1)2k-1+a2k-1=a2k-1,偶数项:a2k+2=1+(-1)2k+a2k=2+a2k,所以奇数项相等,偶数项为等差数列,公差为2,由此能求出S奇数项:a2k+1=1+(-1)2k-1+a2k-1=a2k-1,故能求出S100.
奇数项:a2k+1=1+(-1)2k-1+a2k-1=a2k-1,
偶数项:a2k+2=1+(-1)2k+a2k=2+a2k
所以奇数项相等,偶数项为等差数列,公差为2
a100=a2+49×2=100
S100=50×a1+50×(a2+a100)×1/2
=50+50(2+100)x1/2=2600.
故答案为:2600.