代码搜索:recursion
找到约 958 项符合「recursion」的源代码
代码结果 958
www.eeworm.com/read/160819/10496394
cpp recdepth.cpp
#include
using namespace std;
// Owen Astrachan
// illustrates problems with "infinite" recursion
void
Recur(int depth)
{
cout
www.eeworm.com/read/278058/10577825
cpp recur.cpp
// recur.cpp -- use recursion
#include
void countdown(int n);
int main()
{
countdown(4); // call the recursive function
return 0;
}
void countdown(int n)
{
www.eeworm.com/read/421785/10698760
c factor.c
// factor.c -- uses loops and recursion to calculate factorials
#include
long fact(int n);
long rfact(int n);
int main(void)
{
int num;
printf("This program calculates facto
www.eeworm.com/read/470800/6908634
cpp recur.cpp
// recur.cpp -- use recursion
#include
void countdown(int n);
int main()
{
countdown(4); // call the recursive function
return 0;
}
void countdown(int n)
{
www.eeworm.com/read/470800/6908922
cpp recur.cpp
// recur.cpp -- use recursion
#include
void countdown(int n);
int main()
{
countdown(4); // call the recursive function
return 0;
}
void countdown(int n)
{
www.eeworm.com/read/468329/6996658
cpp recur.cpp
// recur.cpp -- use recursion
#include
void countdown(int n);
int main()
{
countdown(4); // call the recursive function
return 0;
}
void countdown(int n)
{
www.eeworm.com/read/466944/7024124
java fig01_03.java
public class Fig01_03
{
/* START: Fig01_03.txt */
public static int bad( int n )
{
/* 1*/ if( n == 0 )
/* 2*/ return 0;
else
/* 3*/
www.eeworm.com/read/332978/7142172
java infiniterecursion.java
//: strings/InfiniteRecursion.java
// Accidental recursion.
// {RunByHand}
import java.util.*;
public class InfiniteRecursion {
public String toString() {
return " InfiniteRecursion addr
www.eeworm.com/read/458493/7295809
m adaptsimpson.m
function I = adaptSimpson(fun,a,b,tol,maxLevel,level)
% adaptSimpson Adaptive numerical integration based on Simpson's rule
%
% Synopsis: I = adaptSimpson(fun,a,b)
% I = adaptSimpson(
www.eeworm.com/read/458493/7295822
m adaptsimpsontrace.m
function [I,x] = adaptSimpsonTrace(fun,a,b,tol,maxLevel,level)
% adaptSimpsonTrace Adaptive numerical integration based on Simpson's rule
%
% Synopsis: [I,x] = adaptSimpson(fun,a,b)
%