由韦达定理得an +a(n+1)=bnan×a(n+1)=2^na1×a2=1×a2=a2=2a(n+2)×a(n+1)=2^(n+1)[a(n+2)×a(n+1)]/[an×a(n+1)]=a(n+2)/an=2^(n+1)/2^n=2,为定值.数列奇数项是以1为首项,2为公比的等比数列；数列偶数项是以2为首...