求解具有两个未知数的两个方程的系统
use*_*251 10 c++ math equation equation-solving
求解下面两个未知数的两个方程组的系统:
a1,b1,c1,a2,b2和c2由用户自己输入.
我一直试图找到问题的数学解决方案,我似乎无法走远...
到目前为止我尝试过的是:
- 从第一个方程找到y.(b1y = c1-a1x,y =(c1-a1x)/ b1)
- 然后我在第二个等式中替换y,得到一个方程式,其中1个未知数,在这种情况下为x.但是,我无法解决这个等式,我得到了一些奇数/方程式并停在这里.
这是正确的还是有更简单的方法来做到这一点?
当前代码:
#include <iostream>
using namespace std;
int main()
{
int a1, b1, c1, a2, b2, c2;
cout << "Enter the values for the first equation." << endl;
cout << "Enter the value for a1" << endl;
cin >> a1;
cout << "Enter the value for b1" << endl;
cin >> b1;
cout << "Enter the value for c1" << endl;
cin >> c1;
cout << "Enter the values for the second equation." << endl;
cout << "Enter the value for a2" << endl;
cin >> a2;
cout << "Enter the value for b2" << endl;
cin >> b2;
cout << "Enter the value for c2" << endl;
cin >> c2;
cout << "Your system of equations is the following:" << endl;
cout << a1 << "x+" << b1 << "y=" << c1 << endl;
cout << a2 << "x+" << b2 << "y=" << c2 << endl;
if ((a1 * b2) - (b1 * a2) == 0){
cout << "The system has no solution." << endl;
}
else{
res_x = ((c1*b2) - (b1*c2))/((a1*b2)-(b1*a2));
res_y = ((a1*c2) - (c1*a2)) / ((a1*b2) - (b1*a2));
cout << "x=" << res_x << " y=" << res_y << endl;
}
return 0;
}
4pi*_*ie0 14
我们使用Cramer的规则解决线性系统:
int main(int argc, char** argv) {
/* we solve the linear system
* ax+by=e
* cx+dy=f
*/
if(argc != 7) {
cerr<<"Cramer equations system: error,"
" we need a,b,c,d,e,f parameters.\n";
return -1;
}
double a,b,e;
double c,d,f;
sscanf(argv[1],"%lf",&a);
sscanf(argv[2],"%lf",&b);
sscanf(argv[3],"%lf",&e);
sscanf(argv[4],"%lf",&c);
sscanf(argv[5],"%lf",&d);
sscanf(argv[6],"%lf",&f);
double determinant = a*d - b*c;
if(determinant != 0) {
double x = (e*d - b*f)/determinant;
double y = (a*f - e*c)/determinant;
printf("Cramer equations system: result, x = %f, y = %f\n", x, y);
} else {
printf("Cramer equations system: determinant is zero\n"
"there are either no solutions or many solutions exist.\n");
}
return 0;
}
./cramer_equation_system 1 2 5 1 -1 -1
Cramer方程组:结果,x = 1.000000,y = 2.000000