不定方程式

前半: C1; 12 x^2+7 x y+5 x+y^2+y-9=0 y=(-7x-1+sqrt((x-3)^2+28)/2 y=(-7x-1-sqrt((x-3)^2+28)/2 双曲線なので漸近線: y=(-7x-1+(x-3))/2, y= -3x -2 ...(Ans1.) y=(-7x-1-(x-3))/2, y= -4x -1 ....(Ans2.) >C1∩Z^2 漸近線交点座標 (3,-11) C1; 12 (x-3)^2+7 (x-3)(y+11)+5(x-3)+(y+11)^2+(y+11)-9=0 12(x-3)^2+7(x-3)(y+11)+(y+11)^2=7 (3(x-3)+y+11)(4(x-3)+y+11)=7 (3x+y+2)(4x+y-1)=1*7 {3x+y+2=1,4x+y-1=7} or {3x+y+2=-1,4x+y-1=-7} or {3x+y+2=7,4x+y-1=1} or {3x+y+2=-7,4x+y-1=-1} (x,y)=(-3,6),(-3,14),(9,-28),(9,-36) ...(Ans.) 後半: C2; 37 x^2-262 x y+6 x+457 y^2-22 y+1=0 双曲線. 漸近線:y=(3(1316sqrt(7)-131)x+33-5sqrt(7))/1371, y=(3(6sqrt(7)+131)x+33+5sqrt(7))/1371 >C2∩Z^2 漸近線交点座標:(x,y)=(-5/18,-1/18) ......