2.已知($\sqrt{x}-\root{3}{x}$)n的展開式中所有項的二項式系數之和為1024.
(1)求展開式的所有有理數(指數為整數)�����;
(2)求(1-x)6+(1-x)7+…+(1-x)n展開式中x2項的系數.
分析 (1)通過2n=1024可得n=10��,化簡Tr+1=(-1)r${C}_{10}^{r}$${x}^{5-\frac{r}{6}}$(r=0��,1����,2,…�����,10)��,進而可得r=0���,6���,計算即得結論;
(2)利用${C}_{n}^{r-1}$=${C}_{n+1}^{r}$-${C}_{n}^{r}$���,并項相加即得結論.
解答 解:(1)依題意得����,由二項式系數和2n=1024����,解得n=10.
Tr+1=${C}_{10}^{r}(\sqrt{x})^{10-r}(-\root{3}{x})^{r}$=(-1)r${C}_{10}^{r}$${x}^{5-\frac{r}{6}}$(r=0�����,1����,2���,…,10)�,
∵$5-\frac{r}{6}$∈Z,∴r=0��,6�,
∴有理項為T1=${C}_{10}^{0}{x}^{5}$=x5,T7=${C}_{10}^{6}$x4=210x4�����;
(2)x2項的系數為:${C}_{6}^{2}$+${C}_{7}^{2}$+…+${C}_{10}^{2}$�,
∵${C}_{n}^{r}$+${C}_{n}^{r-1}$=${C}_{n+1}^{r}$,∴${C}_{n}^{r-1}$=${C}_{n+1}^{r}$-${C}_{n}^{r}$����,
∴${C}_{6}^{2}$=${C}_{7}^{3}$-${C}_{6}^{3}$�����,${C}_{7}^{2}$=${C}_{8}^{3}$-${C}_{7}^{3}$�,…�����,${C}_{10}^{2}$=${C}_{11}^{3}$-${C}_{10}^{3}$�����,
相加得:${C}_{6}^{2}$+${C}_{7}^{2}$+…+${C}_{10}^{2}$=${C}_{11}^{3}$-${C}_{6}^{3}$=145�����,
∴x2項的系數為145.
點評 本題考查二項式定理等有關問題�,注意解題方法的積累,屬于中檔題.
