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上机作业参考答案\P270(6.2.6.1)(基于N加1点的差分求导)\Newton多项式插值 | 直接求导.doc |
................\.49(2.2.4.3)(二分法与试值法)\bisect.asv |
................\.160(4.2.2.1)(多项式计算算法)\derivation.asv |
................\.260(6.1.6.1)(使用极限的微分求解)\difflim.asv |
................\..70(6.2.6.1)(基于N加1点的差分求导)\diffnew.asv |
................\...................................\diffnewAll.asv |
................\...................................\diffnewI.asv |
................\.93(3.2.8.1)(矩阵乘法 | 立方体旋转)\DispCube.asv |
................\.171(4.3.5.2)(拉格朗日多项式)\lagran.asv |
................\.202(5.1.4.1)(最小二乘拟合曲线)\main.asv |
................\.31(1.3.10.1)(求二次根)\main.asv |
................\.69(2.4.8.4)(求立方根的近似值)\main.asv |
................\.270(6.2.6.1)(基于N加1点的差分求导)\main.asv |
................\.160(4.2.2.1)(多项式计算算法)\main.asv |
................\.260(6.1.6.1)(使用极限的微分求解)\main.asv |
................\.154(4.1.3.1)(绘制sin(x)的图形和表)\main.asv |
................\..71(4.3.5.2)(拉格朗日多项式)\main.asv |
................\.31(1.3.10.2)(求极限)\main.asv |
................\.49(2.2.4.3)(二分法与试值法)\main.asv |
................\.69(2.4.8.4)(求立方根的近似值)\newton.asv |
................\.160(4.2.2.1)(多项式计算算法)\polynomial.asv |
................\.49(2.2.4.3)(二分法与试值法)\bisect.m |
................\.160(4.2.2.1)(多项式计算算法)\derivation.m |
................\.............................\detGauss.m |
................\.260(6.1.6.1)(使用极限的微分求解)\difflim.m |
................\..70(6.2.6.1)(基于N加1点的差分求导)\diffnew.m |
................\...................................\diffnewAll.m |
................\...................................\diffnewI.m |
................\.93(3.2.8.1)(矩阵乘法 | 立方体旋转)\DispCube.m |
................\.40(2.1.5.1)(求不动点)\fixpt.m |
................\.160(4.2.2.1)(多项式计算算法)\integration.m |
................\..71(4.3.5.2)(拉格朗日多项式)\lagran.m |
................\.202(5.1.4.1)(最小二乘拟合曲线)\lsline.m |
................\...............................\main.m |
................\.160(4.2.2.1)(多项式计算算法)\main.m |
................\.260(6.1.6.1)(使用极限的微分求解)\main.m |
................\..70(6.2.6.1)(基于N加1点的差分求导)\main.m |
................\.178(4.4.4.1)(牛顿插值多项式)\main.m |
................\.69(2.4.8.4)(求立方根的近似值)\main.m |
................\.154(4.1.3.1)(绘制sin(x)的图形和表)\main.m |
................\..71(4.3.5.2)(拉格朗日多项式)\main.m |
................\.93(3.2.8.1)(矩阵乘法 | 立方体旋转)\main.m |
................\.31(1.3.10.1)(求二次根)\main.m |
................\...........2)(求极限)\main.m |
................\.49(2.2.4.3)(二分法与试值法)\main.m |
................\..0(2.1.5.1)(求不动点)\main.m |
................\......................\main2.m |
................\.31(1.3.10.1)(求二次根)\mysqrt.m |
................\.178(4.4.4.1)(牛顿插值多项式)\newpoly.m |
................\.69(2.4.8.4)(求立方根的近似值)\newton.m |
................\.40(2.1.5.1)(求不动点)\plotfixpt.m |
................\.160(4.2.2.1)(多项式计算算法)\polynomial.m |
................\.49(2.2.4.3)(二分法与试值法)\regula.m |
................\..0(2.1.5.1)(求不动点)\sqrtm.m |
................\P160(4.2.2.1)(多项式计算算法) |
................\P154(4.1.3.1)(绘制sin(x)的图形和表) |
................\P270(6.2.6.1)(基于N加1点的差分求导) |
................\P93(3.2.8.1)(矩阵乘法 | 立方体旋转) |
................\P178(4.4.4.1)(牛顿插值多项式) |
................\P40(2.1.5.1)(求不动点) |
................\P31(1.3.10.1)(求二次根) |
................\P260(6.1.6.1)(使用极限的微分求解) |
................\P202(5.1.4.1)(最小二乘拟合曲线) |
................\P171(4.3.5.2)(拉格朗日多项式) |
................\P31(1.3.10.2)(求极限) |
................\P49(2.2.4.3)(二分法与试值法) |
................\P69(2.4.8.4)(求立方根的近似值) |
上机作业参考答案 |