代码搜索:查表法

找到约 10,000 项符合「查表法」的源代码

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www.eeworm.com/read/374387/9407759

m ep3_p1.m

% Ep3_p1: > Euler法 (降阶式) % Designed by FGH n= 266; H= 120; Vw= 450; Ve= 90; lanmuda= Ve/Vw; h= H/n; clear x p; y= 0:h:H; % (3.17) x(1)= 0; p(1)= 0; for k= 1:n % (3.15)
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www.eeworm.com/read/372538/9504845

txt vhdl.txt

半加器 [3-15]------------(1)半加器描述:布尔方程描述法 LIBRARY IEEE; USE IEEE.STD_LOGIC_1164.ALL; ENTITY h_adder IS PORT (a,b: IN STD_LOGIC; co,so: OUT STD_LOGIC); END ENTITY h_adder; ARCHITECTURE f
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www.eeworm.com/read/364985/9884492

m gauss10.m

function g = gauss10(fun,a,b) %GAUSS10(fun,a,b) 利用10参数Gauss求积法近似计算a
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www.eeworm.com/read/364985/9884698

m exm0371_1.m

%exm0371_1.m clear; A=zeros(2,3); A(:)=1:6; %全元素赋值法 A=A*(1+i) %运用标量与数组乘产生复数矩阵 A_A=A.' %数组转置,即非共轭转置 A_M=A' %矩阵转置,即共轭转置
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www.eeworm.com/read/364985/9884775

m exm05812_1.m

%exm05812_1.m 比较解析积分和近似积分 %(1)用符号法求解: syms x; F=int('cos(x)','x',-1,1) vpa(F) %(2)用式(5.8.1.2-4)近似计算: aF=cos(1/sqrt(3))+cos(-1/sqrt(3))
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www.eeworm.com/read/364978/9885060

cpp rootnewtonhilldown.cpp

//RootNewtonHillDown.cpp //牛顿下山法求解代数方程全部根(实根和复根) #include //输入输出流头文件 #include "NonLinearEquation.h" //非线性方程(组)求解头文件 using namespace std; //名字空间 void main(void) { int i, i
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www.eeworm.com/read/364978/9885226

cpp approximationremez.cpp

//ApproximationRemez.cpp //最佳一致逼近多项式里米兹法 #include //模板类输入输出流标准头文件 #include "FittingApproximation.h" //拟合与逼近头文件 using namespace std; //名字空间 void main(void) { valarray
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www.eeworm.com/read/364978/9885330

cpp extremumbrentnonderivative1d.cpp

//ExtremumBrentNonDerivative1D.CPP //不用导数的布伦特法求一维函数极小值 #include //模板类iostream输入输出流标准头文件 #include "Extremum.h" //极值头文件 using namespace std; //名字空间 void main() { double fext
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www.eeworm.com/read/362558/9992570

c 7.16.c

typedef SeqList VertexSet; ShortestPath_Floyd(AdjMatrix g, WeightType dist[MAX_VERTEX_NUM][MAX_VERTEX_NUM], VertexSet path[MAX_VERTEX_NUM][MAX_VERTEX_NUM]) /* g为带权有向图的邻接矩阵表示法, path [i][j]为v
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www.eeworm.com/read/362558/9992696

txt 8_2.txt

int SeqSearch(RecordList l, KeyType k) /*不用"监视哨"法,在顺序表中查找关键字等于k的元素*/ { int i; i=l.length; while (i>=1&&l.r[i].key!=k) i--; if (i>=1) return(i); else return (0); }
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