证明：∵S[n]=n(a[1]＋a[n])/2∴2S[n]=na[1]＋na[n]∵2S[n+1]=(n+1)a[1]＋(n+1)a[n+1]∴2S[n+1]-2S[n]=a[1]+(n+1)a[n+1]-na[n]2a[n+1]=a[1]+(n+1)a[n+1]-na[n](n-1)a[n+1]=na[n]-a[1]即：a[n+1]/n-a[n]/(n-1)=a[1]*{...