(1)a0=2n Sn=3n-2n.(2)當(dāng)n=1時(shí),Sn>(n-2)2n+2n2���;當(dāng)n=2,3時(shí)���,Sn<(n-2)2n+2n2;當(dāng)n≥4����,n∈N*時(shí),Sn>(n-2)2n+2n2.
【解析】(1)取x=1���,則a0=2n�����;
取x=2�,則a0+a1+a2+a3+…+an=3n�,
所以Sn=a1+a2+a3+…+an=3n-2n.
(2)要比較Sn與(n-2)2n+2n2的大小,
即比較:3n與(n-1)2n+2n2的大�。
當(dāng)n=1時(shí),3n>(n-1)2n+2n2�����;
當(dāng)n=2,3時(shí)�,3n<(n-1)2n+2n2;
當(dāng)n=4,5時(shí)����,3n>(n-1)2n+2n2.
猜想:當(dāng)n≥4時(shí),3n>(n-1)2n+2n2��,
下面用數(shù)學(xué)歸納法證明:
由上述過(guò)程可知�����,n=4時(shí)結(jié)論成立.
假設(shè)當(dāng)n=k(k≥4)時(shí)結(jié)論成立�,即3k>(k-1)2k+2k2,
兩邊同乘以3��,得3k+1>3[(k-1)2k+2k2]=k2k+1+2(k+1)2+[(k-3)2k+4k2-4k-2].
而(k-3)2k+4k2-4k-2=(k-3)2k+4(k2-k-2)+6=(k-3)2k+4(k-2)(k+1)+6>0.
所以3k+1>[(k+1)-1]2k+1+2(k+1)2.
即n=k+1時(shí)結(jié)論也成立.
所以當(dāng)n≥4時(shí)�,3n>(n-1)2n+2n2成立.
綜上得,
當(dāng)n=1時(shí)��,Sn>(n-2)2n+2n2���;當(dāng)n=2,3時(shí)��,Sn<(n-2)2n+2n2��;
當(dāng)n≥4��,n∈N*時(shí)��,Sn>(n-2)2n+2n2.
