求证:(nC0)^2+(nC1)^2+...+(nCn)^2=(2n)!/n!*n!
人气:308 ℃ 时间:2020-10-02 07:48:12
解答
(1+x)^(2n)=(1+x)^n*(1+x)^n
=(nC0+nC1x+nC2x^2+…+nCnx^n)*(nC0+nC1x+nC2x^2+…+nCnx^n)
=……+(nC0*nC(n-1)+nC1*nC(n-2)+…nC(n-1)*nC0)x^(n-1)+……
=……+(nC0*nC1+nC1*nC2+…+nC(n-1)*nCn)x^(n-1)+……
比较等式两边x^(n-1)项的系数即可得
nC0*nC1+nC1*nC2+…+nC(n-1)*nCn=(2n)C(n-1)
即nC0*nC1+nC1*nC2+…+nC(n-1)*nCn==(2n)!/((n-1)!*(n+1)!)看花了==期待您的采纳
推荐
猜你喜欢
- I'm glad I ran into you today.
- △ABC的顶点为A(3,1),B(x,-1),C(2,y),重心G(5/3,1),求AB边上的中线和高的长
- iam generous with lots things but that is not one of them ,one of them bu dong
- 掌握多少英语单词才够流畅的看电影?
- (1)(a^2+4)^2-16a^2(2)(x+y)^2-14(x+y)+49(3)a^2b^2-0.01(4)x^2y-2xy^2+y^3(5)x^2-xy+1/4y^2
- 若二次型f(x,y,z)=x^2-y^2-z^2-4xy+4xz矩阵的行列式为多少?
- 下面的方阵中所有数的和是_ 1900 1901 1902 1903 …1949 1901 1902 1903 1904 …1950 1902 1903 1904 1905 …1951 … 1948 1949 1950 1951 …1997
- ATP大分子还是小分子?
