代码搜索:binomial
找到约 467 项符合「binomial」的源代码
代码结果 467
www.eeworm.com/read/438780/7727101
m binomial.m
function b = binomial(n,k)
%BINOMIAL compute binomial coefficient
%
% Usage: b = binomial(n,k)
%
% Parameters: ( n )
% b = ( )
% ( k )
%
% Author: Steve Gunn (sr
www.eeworm.com/read/436837/7761963
m binomial.m
function b = binomial(n,k)
%BINOMIAL compute binomial coefficient
%
% Usage: b = binomial(n,k)
%
% Parameters: ( n )
% b = ( )
% ( k )
%
% Author: Steve Gunn (sr
www.eeworm.com/read/399081/7895701
m binomial.m
function b = binomial(m,n)
% BINOMIAL -- binomial coefficient
%
% b = binomial(m,n)
%
% Calculates the binomial coefficient
%
% (m) m!
% (n) = ---------
%
www.eeworm.com/read/143745/12847749
m binomial.m
function b = binomial(n,k)
%BINOMIAL compute binomial coefficient
%
% Usage: b = binomial(n,k)
%
% Parameters: ( n )
% b = ( )
% ( k )
%
% Author: Steve Gunn (sr
www.eeworm.com/read/143441/12874914
m binomial.m
function b = binomial(n,k)
%BINOMIAL compute binomial coefficient
%
% Usage: b = binomial(n,k)
%
% Parameters: ( n )
% b = ( )
% ( k )
%
% Author: Steve Gunn (sr
www.eeworm.com/read/142539/12940945
h binomial.h
typedef long ElementType;
#define Infinity (30000L)
#ifndef _BinHeap_H
#define _BinHeap_H
#define MaxTrees (14) /* Stores 2^14 -1 items */
#define
www.eeworm.com/read/142539/12941029
c binomial.c
#include "binomial.h"
#include "fatal.h"
/* START: fig6_52.txt */
typedef struct BinNode *Position;
struct BinNode
{
ElementType Element;
www.eeworm.com/read/329420/12955649
m binomial.m
function b = binomial(n,k)
%BINOMIAL compute binomial coefficient
%
% Usage: b = binomial(n,k)
%
% Parameters: ( n )
% b = ( )
% ( k )
%
% Author: Steve Gunn (sr
www.eeworm.com/read/326313/13148537
m binomial.m
function b = binomial(m,n)
% BINOMIAL -- binomial coefficient
%
% b = binomial(m,n)
%
% Calculates the binomial coefficient
%
% (m) m!
% (n) = ---------
%
www.eeworm.com/read/324304/13273562
m binomial.m
function b = binomial(n,k)
%BINOMIAL compute binomial coefficient
%
% Usage: b = binomial(n,k)
%
% Parameters: ( n )
% b = ( )
% ( k )
%
% Author: Steve Gunn (sr