题目内容
4.(1)求C${\;}_{n+1}^{m}$÷(C${\;}_{n}^{m}$+C${\;}_{n}^{m-1}$)(m,n∈N*)的值.(2)用数学归纳法证明二项式定理:(a+b)n=C${\;}_{n}^{0}$an+C${\;}_{n}^{1}$an-1b+…+C${\;}_{n}^{r}$an-rbr+…+C${\;}_{n}^{n}$bn(n∈N*,r∈N,0≤r≤n).
分析 (1)利用组合数公式化简即可得出 C${\;}_{n+1}^{m}$=C${\;}_{n}^{m}$+C${\;}_{n}^{m-1}$;
(2)利用(1)的结论证明.
解答 解:(1)${C}_{n}^{m}$+${C}_{n}^{m-1}$=$\frac{n!}{m!(n-m)!}$+$\frac{n!}{(m-1)!(n-m+1)!}$=$\frac{n!(n-m+1)}{m!(n-m+1)!}$+$\frac{n!m}{m!(n-m+1)!}$
=$\frac{n!(n+1)}{m!(n-m+1)!}$=$\frac{(n+1)!}{m!(n+1-m)!}$=${C}_{n+1}^{m}$.
∴C${\;}_{n+1}^{m}$÷(C${\;}_{n}^{m}$+C${\;}_{n}^{m-1}$)=1.
(2)证明:①n=1时,左边=a+b,右边=${C}_{1}^{0}$a+${C}_{1}^{1}$b=a+b,
∴n=1时,等式成立.
②设n=k(k≥1,k∈N)时,(a+b)k=${C}_{k}^{0}$ak+C${\;}_{k}^{1}$ak-1b+…+C${\;}_{k}^{r}$ak-rbr+…+C${\;}_{k}^{k}$bk.
∴(a+b)k+1=(${C}_{k}^{0}$ak+C${\;}_{k}^{1}$ak-1b+…+C${\;}_{k}^{r}$ak-rbr+…+C${\;}_{k}^{k}$bk)(a+b)
=${C}_{k}^{0}$ak+1+(${C}_{k}^{1}$+${C}_{k}^{0}$)akb+…+(${C}_{k}^{r}$+${C}_{k}^{r-1}$)ak+1-rbr+…+C${\;}_{k}^{k}$bk+1
∵${C}_{k}^{0}$=${C}_{k+1}^{0}$,${C}_{k}^{1}$+${C}_{k}^{0}$=${C}_{k+1}^{1}$,${C}_{k}^{r}$+${C}_{k}^{r-1}$=${C}_{k+1}^{r}$,C${\;}_{k}^{k}$=${C}_{k+1}^{k+1}$,
∴(a+b)k+1=${C}_{k+1}^{0}$ak+1+${C}_{k+1}^{1}$akb+…+${C}_{k+1}^{r}$ak+1-rbr+…+C${\;}_{k+1}^{k+1}$bk+1.
∴当n=k+1时,等式成立.
综合①②可得对任意n∈N*,等式成立.
点评 本题考查了组合数公式,数学归纳法证明,属于中档题.
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