|
|
136455英镑 |
| 基于β反函数的矩阵作为整数系数三角形的特征多项式:n*IM(i,j)=n*inverse(1/Gamma(i、j));i、 j>=n。 |
|
1
|
|
|
1, 0, 1, -1, 1, 1, -48, 28, 25, -1, 233280, -91368, -60993, 2305, 1, 222953472000, -65503641600, -33198846720, 985867696, 446161, -1, -69132994560000000000, 16249035196800000000, 6593300559405000000, -157196644177875000, -59060479175425, 144069601, 1
(列表;桌子;图表;参考;听;历史;文本;内部格式)
|
|
|
抵消
|
1,7
|
|
链接
|
|
|
配方奶粉
|
M(i,j)=1/伽马[i+j];i、 j<=n IM(i,j)=逆(M(i,j))
|
|
例子
|
{1},
{0, 1},
{-1, 1, 1},
{-48, 28, 25, -1},
{233280,-91368,-609932305,1},
{222953472000, -65503641600, -33198846720, 985867696, 446161, -1}
|
|
数学
|
M[w_]:=表[表[1/Gamma[n+M],{n,0,w}],{M,0,w}]
IM[w_]:=逆[M[w]]连接[{1,x},表[CharacteristicPolynomial[n*IM[n],x],{n,1,10}]]
a=连接[{{1},{0,1}},表[CoefficientList[CharacteristicPolynomial[n*IM[n],x],{n,1,10}]];
压扁[a]
连接[{1,1},表[Apply[Plus,CoefficientList[CharacteristicPolynomial[n*IM[n],x],x]],{n,1,10}]]
|
|
交叉参考
|
|
|
关键词
|
|
|
作者
|
|
|
状态
|
经核准的
|
|
|
|