代码搜索:accurate
找到约 951 项符合「accurate」的源代码
代码结果 951
www.eeworm.com/read/168763/5436725
h jffs2.h
/*
* JFFS2 -- Journalling Flash File System, Version 2.
*
* Copyright (C) 2001 Red Hat, Inc.
*
* Created by David Woodhouse
*
* The original JFFS, from which the de
www.eeworm.com/read/162614/5516530
c args-2.c
/* Check the _MIPSEB and _MIPSEL macros are accurate. */
/* { dg-do run } */
extern void abort (void);
extern void exit (int);
short foo = 1;
int main ()
{
char *p = (char *) &foo;
#ifdef _MIPSEB
www.eeworm.com/read/155374/5624218
h jffs2.h
/*
* JFFS2 -- Journalling Flash File System, Version 2.
*
* Copyright (C) 2001 Red Hat, Inc.
*
* Created by David Woodhouse
*
* The original JFFS, from which the de
www.eeworm.com/read/266379/11229071
cpp fig06_27.cpp
/**
* Internal method to merge two roots.
* Assumes trees are not empty, and h1's root contains smallest item.
*/
LeftistNode * merge1( LeftistNode *h1, LeftistNode *h2 )
www.eeworm.com/read/356723/10222157
m factorial.m
function p = factorial(n)
%FACTORIAL Factorial function.
% FACTORIAL(N) is the product of all the integers from 1 to N,
% i.e. prod(1:N). Since double precision numbers only have about
% 15
www.eeworm.com/read/297942/7984986
m factorial.m
function p = factorial(n)
%FACTORIAL Factorial function.
% FACTORIAL(N) is the product of all the integers from 1 to N,
% i.e. prod(1:N). Since double precision numbers only have about
% 15
www.eeworm.com/read/246805/12703960
m factorial.m
function p = factorial(n)
%FACTORIAL Factorial function.
% FACTORIAL(N) is the product of all the integers from 1 to N,
% i.e. prod(1:N). Since double precision numbers only have about
% 15
www.eeworm.com/read/135153/5888859
h jffs2.h
/*
* JFFS2 -- Journalling Flash File System, Version 2.
*
* Copyright (C) 2001 Red Hat, Inc.
*
* Created by David Woodhouse
*
* The original JFFS, from which the de
www.eeworm.com/read/251835/12317527
m crmap0.m
function wp = crmap0(zp,z,beta,aff,qdat)
%CRMAP Single-embedding map in crossratio formulation.
% CRMAP0(ZP,Z,BETA,AFF) computes the image of ZP under the map defined
% by the single prevertex