代码搜索:微分几何

找到约 3,133 项符合「微分几何」的源代码

代码结果 3,133
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www.eeworm.com/read/420310/10804475

m sh_ge_se_ex_so.m

% 编写求解自激过程微分方程的脚本函数 % 将该脚本函数定义为sh_ge_se_ex_so(shunt_generator_self_excited_solver) [t,iff]=ode23(@sh_ge_se_ex_ode,[0 10],[0]) % 指定全局变量(注意全局变量必须在同时使用的多个函数中同时指定) global a1 a2 a3 a4 Rf % 绘图(这里采用多子
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www.eeworm.com/read/273093/10927369

m quadeg6.m

%微积分例6:刚性微分方程组(ode15s) %需用模型函数quadeg6fun.m clear;close; [t,y]=ode45('quadeg6fun',[0,10],[2,1]'); plot(t,y); text(1,1.1,'y1'); text(1,0.1,'y2'); pause [t,y]=ode45('quadeg6fun',0,400,[2,1]')
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www.eeworm.com/read/417350/10993460

txt 07-27.txt

例7-27 使用diff函数进行符号微分和求导。 解:在命令窗口中输入如下命令,并按Enter键确认。 >> syms x >> diff(x^3+2*x^2+4*x+6) ans = 3*x^2+4*x+4 >> diff(sin(x^3),4) ans = 81*sin(x^3)*x^8-324*cos(x^3)*x^5-180*sin(x^3)*x^2 >>
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www.eeworm.com/read/469622/6972059

m sh_ge_se_ex_so.m

% 编写求解自激过程微分方程的脚本函数 % 将该脚本函数定义为sh_ge_se_ex_so(shunt_generator_self_excited_solver) [t,iff]=ode23(@sh_ge_se_ex_ode,[0 10],[0]) % 指定全局变量(注意全局变量必须在同时使用的多个函数中同时指定) global a1 a2 a3 a4 Rf % 绘图(这里采用多子
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www.eeworm.com/read/172061/7074743

m quadeg6.m

%微积分例6:刚性微分方程组(ode15s) %需用模型函数quadeg6fun.m clear;close; [t,y]=ode45('quadeg6fun',[0,10],[2,1]'); plot(t,y); text(1,1.1,'y1'); text(1,0.1,'y2'); pause [t,y]=ode45('quadeg6fun',0,400,[2,1]')
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www.eeworm.com/read/460861/7239087

m fouthorder.m

%求解四阶偏微分方程 %%%%%%%%%%%%%%%%%% %准备工作: %1.时间tao和空间h的划分 clear all h=1.2; tao=0.2; h2=1.0/(h*h); n=0;%记录循环次数 p=3;q=3;%矩阵的大小 %2.差分格式的乘积矩阵 A=[0 1 0;1 -4 1;0 1 0]; B=zeros(3); C=[1 1 1;1 1 1;1 1
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www.eeworm.com/read/197958/7960494

m quadeg6.m

%微积分例6:刚性微分方程组(ode15s) %需用模型函数quadeg6fun.m clear;close; [t,y]=ode45('quadeg6fun',[0,10],[2,1]'); plot(t,y); text(1,1.1,'y1'); text(1,0.1,'y2'); pause [t,y]=ode45('quadeg6fun',0,400,[2,1]')
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www.eeworm.com/read/196814/8058548

m quadeg6.m

%微积分例6:刚性微分方程组(ode15s) %需用模型函数quadeg6fun.m clear;close; [t,y]=ode45('quadeg6fun',[0,10],[2,1]'); plot(t,y); text(1,1.1,'y1'); text(1,0.1,'y2'); pause [t,y]=ode45('quadeg6fun',0,400,[2,1]')
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www.eeworm.com/read/395985/8138381

m rk_4.m

function RK_4(h,N) %%%%%%%%%%%%%% 经典的四阶 Runge-Kutta方法求时滞微分方程 %%%%%%%%%%%%%% 经典的四阶 Runge-Kutta方法的系数 A=[0 0 0 0;1/2 0 0 0;0 1/2 0 0;0 0 1 0]; B=[1/6 1/3 1/3 1/6]; c=[0 1/2 1/2 1]; e=[1,1,1,1]'; t
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www.eeworm.com/read/244945/12829410

m quadeg6.m

%微积分例6:刚性微分方程组(ode15s) %需用模型函数quadeg6fun.m clear;close; [t,y]=ode45('quadeg6fun',[0,10],[2,1]'); plot(t,y); text(1,1.1,'y1'); text(1,0.1,'y2'); pause [t,y]=ode45('quadeg6fun',0,400,[2,1]')
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