关于丢番图方程y^2=a^2(bx+c)~4+dx^2+ex+f

On the Diophantine Equation y^2=a^2(bx+c)~4+dx^2+ex+f

给出了用初等方法解决一类丢番图方程 y2 =a2 (bx +c ) 4+dx2 +ex +f 的求解问题的判别方法 ,并给出解的范围 ,在 z≠ 1且其取值范围较大时 ,可利用给出的 Pascal程序段 ,求出 z值 .

This paper Solves the Diophantine equation y2=a2(bx+c)4+dx2+ex+f by using fundamental method,and provides the range of the solution,When z≠1 and the range of its vale is wide,we can get the value of it by using the given Pascal programme segment,and get the solution of the equation.