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(1)求抛物线的解析式;
(2)已知抛物线的对称轴l交x轴于点F,交线段CD于点K,点M、N分别是直线l和x轴上的动点,连结MN,当线段MN恰好被BC垂直平分时,求点N的坐标;
(3)在满足(2)的条件下,过点M作一条直线,使之将四边形AECD的面积分为3:4的两部分,求出该直线的解析式.
同类型试题
y = sin x, x∈R, y∈[–1,1],周期为2π,函数图像以 x = (π/2) + kπ 为对称轴
y = arcsin x, x∈[–1,1], y∈[–π/2,π/2]
sin x = 0 ←→ arcsin x = 0
sin x = 1/2 ←→ arcsin x = π/6
sin x = √2/2 ←→ arcsin x = π/4
sin x = 1 ←→ arcsin x = π/2
y = sin x, x∈R, y∈[–1,1],周期为2π,函数图像以 x = (π/2) + kπ 为对称轴
y = arcsin x, x∈[–1,1], y∈[–π/2,π/2]
sin x = 0 ←→ arcsin x = 0
sin x = 1/2 ←→ arcsin x = π/6
sin x = √2/2 ←→ arcsin x = π/4
sin x = 1 ←→ arcsin x = π/2
