In the plane rectangular coordinate system, P is the moving point on the curve C: y = x / 1 (x > 0) In the plane rectangular coordinate system, P is the moving point on the curve C: y = x / 1 (x > 0), and the intersection of the line L: y = x and the curve C is P0. If AP > = ap0 is constant for any point a on the line L, then the value range of abscissa of point a is 0___ Wrong type of curve C, should be y = 1 / X

In the plane rectangular coordinate system, P is the moving point on the curve C: y = x / 1 (x > 0) In the plane rectangular coordinate system, P is the moving point on the curve C: y = x / 1 (x > 0), and the intersection of the line L: y = x and the curve C is P0. If AP > = ap0 is constant for any point a on the line L, then the value range of abscissa of point a is 0___ Wrong type of curve C, should be y = 1 / X

(1,1) the P coordinate is (x0,1 / x0) (x0 > 0) and the a coordinate is (x, y) because a is on L, so x = y, for AP > = ap0, we get (x-x0) &\\\\\\\\\\\\\\\\\ (1,1 / x0) (x0,1 / x0) (x0) (x0) (1 / x0-1) \\\\\\\\\\\\\\\\\\\\inthis case, formula 1 becomes 0 * x ≤ 1 + 1, (2) when x0 ≠ 1, formula 1 becomes 0 ≤ 2x ≤ ((x0) &# 178; + (1 / x0) &# 178; - 2) / (x0 + 1 / x0-2), so only the minimum value on the right side is required, the right side is infinitely close to 4, but not equal to 4, because x0 is not equal to 1, so the value range of X is 0 ≤ x < 2, please answer me if you have any questions