如图,在平面直角坐标系中,点P是直线y=-0.5x+3在第一象限内的一点,点A在x轴的正半轴上.连接OP,pA.(1)若点P的横坐标为√3m,点A的坐标为(2m,0),试用含m的式子表示△OPA的面积S.(2)对于(2)中,当S=2时.试求(√m³+6m²+m)/m-2√3(m+2)(m-2)-8√3的值.(3)若点A的坐标为(4,0),问:在直线y=-0.5x+3上是否存在一
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(1) △OPA底为OA(=2m; m>0),高为P的纵坐标h= -0.5√3m +3
S = (1/2)*2m* (-0.5√3m +3) = m(3 - √3m/2)
(2) S = 2,可解出m,带入即可(原题不太清楚).
(3) a:|OA| = |OP|,|OA|^2 = |OP|^2
|OA|^2 = 16
|OP|^2 = x^2 + (3-x/2)^2 = 16
x = (6+4√11)/5 ((6-4√11)/5 y = (12-2√11)/5
b:|OP| = |PA|,|OP|^2 = |PA|^2
x^2 + (3-x/2)^2 = (x-4)^2 + (3-x/2)^2
x = 2,y = 2
c:|OA| = |PA|,|OA|^2 = |PA|^2
16 = (x-4)^2 + (3-x/2)^2
x = (22-4√19)/5 ( (22-4√19)/5使yy = 4(1+√19)/5