填空题用数学归纳法证明“(n+1)(n+2)…(n+n)=2n?1?2?…?(2n-1)”(n∈N+)时,从“n=k到n=k+1”时,左边应增添的式子是________.
网友回答
2(2k+1)解析分析:分别求出n=k时左边的式子,n=k+1时左边的式子,用n=k+1时左边的式子,除以n=k时左边的式子,即得所求.解答:当n=k时,左边等于 (k+1)(k+2)…(k+k)=(k+1)(k+2)…(2k),当n=k+1时,左边等于 (k+2)(k+3)…(k+k)(2k+1)(2k+2),故从“k”到“k+1”的证明,左边需增添的代数式是 =2(2k+1),故