中考压轴题6 抛物线与圆2答案
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15.解:作点B 关于MN 的对称点B′,连接OA 、OB 、OB′、AB′, 则AB′与MN 的交点即为PA+PB 的最小时的点,PA+PB 的最小值=AB′, ∵∠AMN=30°,∴∠AON=2∠AMN=2×30°=60°,∵点B 为劣弧AN 的中点,∴∠BON=∠AON=×60°=30°,由对称性,∠B′ON=∠BON=30°,∴∠AOB′=∠AON+∠B′ON=60°+30°=90°,∴△AOB′是等腰直角三角形,∴AB′=OA=×1=, 即PA+PB 的最小值=. 故选A .16.解:(1)∵DE ∥BC , ∴∠ADE=∠B=60°在△ADE 中,∵∠A=90°∵AD=1×t=t ,∴AE=又∵四边形ADFE 是矩形,∴S △DEF=S △ADE=(0≤t<3)∴S=(0≤t<3);(2)过点O 作OG ⊥BC 于G ,过点D 作DH ⊥BC 于H ,∵DE ∥BC , ∴OG=DH ,∠DHB=90°在△DBH 中,∵∠B=60°,BD=,AD=t ,AB=3, ∴DH=, ∴OG= 当OG=时,⊙O 与BC 相切, 在△ADE 中,∵∠A=90°,∠ADE=60°,∵AD=t ,∴DE=2AD=2t , ∴, ∴∴当时,⊙O 与直线BC 相切。
17.解:(1)因为抛物线与x 轴交于点()()1030A B -,、,两点,设抛物线的函数关系式为:()()13y a x x =+-,∵抛物线与y 轴交于点()03C -,,∴()()30103a -=+-,∴ 1.a =所以,抛物线的函数关系式为:223y x x =--, ································································ 2分 又()214y x =--,因此,抛物线的顶点坐标为()14-,. ····················································································· 3分(2)连结EM ,∵EA ED 、是M ⊙,的两条切线,∴EA ED EA AM ED MN =⊥⊥,,,∴EAM EDM △≌△又四边形EAMD 的面积为43,∴23EAM S =△,∴1232AM AE =·, 又2AM =,∴2 3.AE = 因此,点E 的坐标为()1123E -,或()2123.E --, ························································· 5分当E 点在第二象限时,切点D 在第一象限.在直角三角形EAM 中,23tan 32EA EMA AM ∠===, ∴60EMA ∠=°,∴60DMB ∠=°过切点D 作DF AB ⊥,垂足为点F , ∴13MF DF ==,因此,切点D 的坐标为()23,. ··························································································· 6分 设直线PD 的函数关系式为y kx b =+,将()()12323E D -,、,的坐标代入得 3223k b k b⎧=+⎪⎨=-+⎪⎩解之,得33533k b ⎧=-⎪⎪⎨⎪=⎪⎩所以,直线PD 的函数关系式为353.33y x =-+ ··························································· 7分 当E 点在第三象限时,切点D 在第四象限.同理可求:切点D 的坐标为()23,-,直线PD 的函数关系式为353.33y x =- 因此,直线PD 的函数关系式为 35333y x =-+或353.33y x =- ················································································ 8分 (3)若四边形EAMD 的面积等于DAN △的面积又22EAM DAN AMD EAMD S S S S ==△△△四边形,∴AMD EAM S S =△△∴E D 、两点到x 轴的距离相等,∵PD 与M ⊙相切,∴点D 与点E 在x 轴同侧,∴切线PD 与x 轴平行,此时切线PD 的函数关系式为2y =或 2.y =-······················································································· 9分当2y =时,由223y x x =--得,16x =±;当2y =-时,由223y x x =--得,12x =±. ····························································· 11分故满足条件的点P 的位置有4个,分别是()()()123162162122P P P +-+-,、,、,、 ()4122.P --, ··················································································································· 12分。