x2+y2-2x+4y-20=0,
故:x2+y2 = 2x -4y +20 = 2(x - 2y) + 20
设函数f(x,y) = x - 2y,
只要求得:f(x,y)在圆x2+y2-2x+4y-20=0上有取值范围,
就可求得:x2 + y2的值了.
直线L1:x - 2y =0的斜率为:k1= 1/2
又圆的圆心为:(1, -2)
故:过圆心,且垂直于直线L1:x - 2y =0的直线L2方程为:y = -2x.
可求得直线L2:y = -2x与圆的交点为:(1 +√5, -2 -2√5),或(1 -√5, -2 +2√5).
故:函数f(x,y) = x - 2y的取值范围的两个最值点为:
f1(x,y)= x - 2y = 1 +√5 - 2( -2 -2√5)=5 + 5√5,
f2(x,y)= x - 2y = 1 -√5 - 2( -2 +2√5)=5 - 5√5,
故: 5 - 5√5≤f(x,y)≤5 + 5√5
又:x2+y2= 2f(x,y) +20
故: 30 - 10√5≤x2+y2 ≤ 30 + 10√5
故:当点P(a,b)是圆x2+y2-2x+4y-20=0上的点时,
30 - 10√5≤a2+b2 ≤ 30 + 10√5
